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+*** START OF THE PROJECT GUTENBERG EBOOK 76891 ***
+
+
+
+
+
+ THE ACCOMPLISHMENT RATIO
+
+ A Treatment of the Inherited Determinants
+ of Disparity in School Product
+
+ _By_
+ RAYMOND FRANZEN
+ A.B. (Harvard), M.A. (Columbia)
+ Ph.D. (Columbia)
+
+ Teachers College, Columbia University
+ Contributions to Education, No. 125
+
+ Published by
+ Teachers College, Columbia University
+ New York City
+ 1922
+
+ _Copyright, 1922, by RAYMOND FRANZEN_
+
+
+
+
+PREFACE
+
+
+The results of the experiment reported here have become so much a
+portion of my process of reasoning that duplication of material
+presented elsewhere is unavoidable. I wish in particular to recognize my
+indebtedness to the TEACHERS COLLEGE RECORD for permission to reprint
+here revised portions of an article which appeared in the November,
+1920, number of that journal. I will warn here any reader to whom the
+intricacies of a full statistical account are irksome that the logic and
+conclusions presented in this study are incorporated in a more palatable
+and abbreviated form in Chapter IV of _Intelligence Tests and School
+Reorganization_ (World Book Company).
+
+The work presented here has been made possible by the cooperation
+and interest of the two principals of the Garden City public school
+during the period of my work there, Miss Gladys Locke and Mrs. Edna
+Maule. I also owe any success that this experiment may have had to the
+teachers who did the real work of “pushing” abilities to their limit.
+My indebtedness to Gladys Locke Franzen for help in expression and
+correction is surpassed only by what I credit to her encouragement and
+cooperation at its inception.
+
+During the period in which this experiment was planned and executed it
+grew into a real problem through the advice of two of my teachers to whom
+I owe all such inspiration and knowledge as I possess—Edward L. Thorndike
+and Truman L. Kelley.
+
+ RAYMOND H. FRANZEN
+
+_Des Moines, Iowa, 1922._
+
+
+
+
+CONTENTS
+
+
+ I. AN OUTLINE OF THE EXPERIMENT 1
+
+ The Use of Quotients and Ratios
+ The Derivation of Age Norms
+ A Method of Survey of Reading, Language and Arithmetic
+
+ II. STATISTICAL TREATMENT OF THE EXPERIMENT 17
+
+ The Quotients
+ The Ratios
+ Summary
+
+ III. THE PSYCHOLOGICAL CONCLUSIONS OF THE EXPERIMENT 43
+
+ The Neglect of Genius
+ Is Genius Specialized?
+ Current Psychological Opinion
+ Conclusions
+
+
+
+
+PART I[1]
+
+AN OUTLINE OF THE EXPERIMENT
+
+
+THE USE OF QUOTIENTS AND RATIOS
+
+Standardized measurement of educational product has won its way to a
+recognized place in the school life of this country. Many of our larger
+cities have research bureaus of tests and measurements, and advanced
+private schools have departments of measurement. The logic of the use of
+statistically derived evaluations versus the use of opinion, swayed as it
+is by the haphazard captions of emotion and condition, has become widely
+recognized. The case of scientific measurement in education has been
+argued and won. The objections to older forms of measurement have become
+the criteria of the value of the new.
+
+Still administrators, although they have been convinced theoretically of
+its importance, find it hard to see just what measurement does for their
+schools. They often object that measurements are made, the tests are
+carried away by the examiner, and some time later they are presented with
+a neat series of distributions and are told where their school stands
+in relation to certain other schools or to schools in general. This is
+undoubtedly a very important piece of information; since a determination
+of the extent to which a goal has been attained forms the basis of the
+commendation or condemnation of the methods, curricula, and text-books
+employed in the process. But administrators want to know which of the
+various elements of school procedure are to be praised and which are to
+be blamed.
+
+We cannot condemn or support a whole school system on the basis of
+composite results (unless all possible educational objectives have been
+measured, and show one common drift; or unless it is necessary that the
+system fall or stand as a whole) since then we should be throwing good
+and bad into a common discard. We must measure each thing separately. We
+must build our ideal system of education synthetically, taking the best
+methods from each of the prevalent groups of theories. There has been
+too much absolutism in education, too little of a realism that sees the
+good and bad in all and diminishes the bad and augments the good. If
+we adopt this point of view we become really empirical in our method,
+living through each educational experiment to incorporate it into a
+growing treasury of tested theory, not deducing success or failure from
+metaphysical or doctrinaire prejudice. In this administrators have been
+more scientific than those who measure. They have always objected that
+they wanted differential diagnoses. Here the answer to their needs must
+come through experimentation and it is only through nation-wide study and
+careful comparison and integration of results that methods of teaching
+can be scientifically established.
+
+Three uses of measurement commonly stressed are: (1) Diagnosis of degree
+of attainment of goal; (2) selection of method of attainment of goal;
+(3) definitive outline of goals. We have seen that the first two are
+of little immediate value to the administrator. The first only gives
+him an accurate notion of where he stands in any one subject without
+pretending to tell him why; the second is a promissory note. Some day
+we shall be able to tell him the best methods for the attainment of his
+goal. The third has slightly more immediate value. Measurement splits up
+the goals of education, gives them concrete formulation, allows teachers
+to see an advance in the class in one function as separate from the
+rest; allows them, for instance, to distinguish more clearly than they
+otherwise would between oral reading and silent reading, or between
+addition and division. But this, too, is rather too general to appeal to
+administrative economy. One would find it very difficult to sell one’s
+services as a measurer to a school board or a superintendent on the basis
+of these three values. They answer that universities and scientific
+research give them as much as they want of these values. What an expert
+on measurement could add in interpretation of results would seem of small
+additional value to them.
+
+Still there is a very marked function that such an expert can perform;
+but he must serve a fourth and fifth use of measurement while he serves
+a particular school. When he serves the first three he is serving the
+science of education and, unfortunately, no one school will pay him to do
+that. The uses of measurement that directly benefit any one school are:
+(4) Classification by information and intelligence and (5) diagnosis
+of individual disability. For the proper prosecution of these aims
+individual measurements and age norms are essential. Only with such
+equipment can we make the prognoses of future school behavior which the
+administrator so urgently needs.
+
+Grade norms cannot be used to make individual diagnoses. Though we can
+see by them which children are below and which above the level that in
+their grade they should attain, we cannot see just what administrators
+most need to know; namely, whether the retardation and acceleration are
+justified or not—how many children are working at maximum. More than
+that, computations based on grade norms are very inaccurate in individual
+cases because the variability within any grade is so great. As it becomes
+necessary to use new norms for such purposes it is important to have them
+in terms that are directly comparable to intelligence mensuration.[2]
+
+First in importance is an interpretation of the meaning of an
+Intelligence Quotient. Too often it is stated as a number and left as a
+number with the belief that somehow or other that is a tag which carries
+its own divine implication. Its importance lies in its diagnosis of power
+of adaptation, and it has a high correlation with the maximum possible
+rate of school progress. Just as a pure information test diagnoses the
+neural bonds that have been formed in any one field, so an intelligence
+test diagnoses the ability to form bonds, to meet a new situation and
+form satisfactory habits—power to learn. It may be thought of as a
+diagnosis of the neural chemistry of the individual. As such it is not
+concerned with the connections or quantity, but rather with the quality
+of the neural tissue.
+
+As an intelligence quotient is actual mental age divided by chronological
+age—which is the normal mental level of the child’s age-group—so it is
+the rate at which the child has progressed to mental maturity. It is his
+potential rate of progress. It is a division of what is by what normally
+would be. Then, when we use IQ we express the various degrees of power
+of adaptation due to various degrees of fitness of neural equipment to
+form bonds, by means of a diagnosis of the rate of formation of bonds
+which everyone forms sooner or later in an environment such as ours. It
+is conceivable that we might test this same power without testing the
+presence of such bonds at all. Such a test would detect directly the
+quality of the neural equipment irrespective of quantity or conformation.
+
+A ten-year-old child whose mental age is ten has progressed at the rate
+which is normal, and his IQ is 1.00. A very exceptional ten-year-old
+child whose mental age is fifteen has progressed just one and one half
+times as fast as the former, and his IQ is 1.50. Another exceptional
+ten-year-old child whose mental age is five has progressed at just
+one-half the rate of the first, and his IQ is .50. What we mean, then, by
+an Intelligence Quotient is the rate at which a child grows to the mental
+maturity of human beings in the world as it is.
+
+For purposes of presentation of a problem one can here assume (an
+hypothesis the value of which will here be determined) that each child
+can attain this rate of progress in each of the elementary school
+subjects. The degree to which this is true is the degree to which the
+IQ is a valid index of power to deal with school subjects. This assumes
+that inherited special disabilities in the school subjects are uncommon,
+that school progress is determined by the interplay of intelligence and
+environment, and that so-called interest characteristics which aid in
+development are the result of an earlier interplay of intelligence and
+environment. The degree to which educational product of children can be
+made to approach this intelligence will allow us to judge how far these
+factors are inherited, since differences that are removable must be
+learned, not innate.
+
+We can the more readily see the significance of viewing a child’s
+equipment in terms of educational and mental age, when we conceive of
+a Subject Quotient. This is a quotient resulting from the division of
+the age level reached in the test in question by the chronological age
+of the pupil. It is a measure of the rate of progress of the child in
+the school subject under consideration. Thus a ten-year-old child with
+ten-year-old ability in Thorndike Reading Scale Alpha 2 would have as
+his reading age divided by chronological age, 1.00. This may be called
+his Subject Quotient in Reading or his Reading Quotient. The division of
+what is by what would be if the child were normal gives the percentage
+of normality, the actual rate of progress. Since the IQ is the potential
+rate of progress and the SQ the actual rate of progress, the ratio of
+SQ to IQ gives the percentage of what that child could do, that he has
+actually done. Thus a child with an IQ of 1.32 whose reading quotient
+(his RQ) is 1.10, though he is doing work which is above normal, is not
+doing work which is above normal for him. His RQ⁄IQ is 1.10⁄1.32, whereas
+if he were progressing at his optimum rate it would equal 1.32⁄1.32. This
+RQ⁄IQ is the same quantity as RA⁄MA. We may call this a Subject Ratio and
+the average of Subject Ratios an Accomplishment Ratio. We could, if the
+absolute association between reading age and mental age were perfect,
+measure the approximation to ideal educational performance of any one
+child in any one elementary school subject through the approximation
+of this Subject Ratio to 1.00. As we will see later, Subject Quotients
+approach the Intelligence Quotients when special treatment is given; that
+is, the correlation of SQ and IQ becomes nearer 1.00 and the difference
+between the average IQ and the average SQ approaches zero. It is safe
+then to expect these Subject Ratios to be at least 1.00 before we
+pronounce satisfaction with the school product.
+
+There is certainly a significant relation between IQ and SQ, and the
+more perfect the educational procedure has been, the more it has called
+forth all that the child is capable of, the higher it will be. To
+determine whether the quotient in any school subject can be greater than
+the Intelligence Quotient in any significant amount, it will only be
+necessary after we have perfect age norms by months to get that quotient
+amongst enough pupils whom we know to be working at maximum. What is
+significant here is that the more nearly any such quotient reaches or
+exceeds the Intelligence Quotient the more nearly has the child been
+brought up to what he is able to do under the best conditions. The
+Accomplishment Ratio is the degree to which his actual progress has
+attained to his potential progress by the best possible measures of both.
+
+This would be a mark of the child’s effort, a mark of the concentration
+and interest that the child has in the school work, and as far as no
+inherited traits or capacities other than intelligence affect school
+work it is a measure of the efficiency of a child’s education thus
+far. If there are such other innate bases, it is also a measure of
+those inherited traits and capacities or their predisposition, such
+as concentration, effort, written expression, etc. At any rate it is
+a measure of the child’s accomplishment, and so of the effort and
+concentration as they really are at present working under those school
+conditions. It is an index of achievement irrespective of intelligence.
+
+A very convenient graph representing the same facts and easily
+interpreted by the teacher may be constructed thus:
+
+[Illustration:
+
+ Age Scale +------------------------------------------------ Mental Age
+ | _Reading Age_
+ +----------------------------------------- Chronological Age
+ | _Spelling Age_
+ | _Arithmetic Age_
+ +----------------------------------------------------------
+]
+
+Here it can be easily shown that Spelling Age, Reading Age, Arithmetic
+Age, etc., are in some definite relation to both Chronological Age and
+Mental Age. Using the Mental Age line as a goal, these records may be
+kept constantly up to date. Another use of the Accomplishment Ratio is
+as the medium in which the children may keep records of their own work.
+As it is a mark in terms of intelligence, dull and brilliant children
+may compete on a parity to bring their Accomplishment Ratios as high as
+possible.
+
+Mainly we have advanced formal education. We have in many ways promoted
+the abilities to read, write, spell and figure. But our philosophy of
+education has advanced far beyond that. We have other aims in education,
+and consequently other methods and modes, which also must be measured and
+judged. We wish to promote such qualities as stability, self-reliance,
+concentration, and ambition. It does not necessarily follow that we must
+measure these things directly, although every one vitally interested
+in measurement cherishes the hope that we may some day measure their
+behavioristic correlates,—“For the quality of anything exists in some
+quantity, and that quantity can be measured.”
+
+“Some of us might be entirely willing to rest the case after asking
+whether in practical school life anyone ever saw a teacher thoroughly
+confident of teaching ideals but neglectful of reading and arithmetic.
+The fact is that the conscientious teacher always gives attention to both
+and the successful teacher is able, without omitting one, to cultivate
+the other. The theoretical possibility of thinking of the two results
+separately has little significance in dealing with real teachers and
+real schools. Good reading is a school virtue; and when one has measured
+good reading he has measured more than the trivial or formal side of
+education.”[3]
+
+This I believe to be true, but I also believe that through measurement
+we can actually promote those other more ethical ideals in education.
+Through classification by information and by intelligence we gain
+a marked increase of attention, concentration, ambition, and other
+objectives, measured in part by Accomplishment Ratios. More discussion
+due to a greater homogeneity promotes powers of inference and insight;
+being only with equals promotes self-confidence and honor, and in many
+cases prevents a regrettable conceit among supernormals; having work to
+do which is hard enough prevents habits of indolence and carelessness so
+commonly found among intelligent children.[4]
+
+It is a well-known fact that much work must be done in classification to
+get homogeneity or real conditions of teaching. As it is, most teachers
+are talking to the middle of their classes. When they do they mystify the
+lower quarter and bore the upper quarter; they talk to the upper quarter
+and mystify the lower three quarters; or they talk to the lower quarter
+and bore the upper three quarters. When a child is bored or mystified his
+Subject Quotients become less while his Intelligence Quotient remains
+constant. Then his Accomplishment Ratios become less as long as he
+remains in a position where he is being mistreated educationally. This,
+then, is the proper measure to see whether a child is classified properly
+or not. At the Garden City public school I changed as far as I was
+able the conditions of education of each child in that subject wherein
+his Accomplishment Ratio was markedly below 1.00. The concentration
+and effort of the child were obviously low and my attempt was to
+change conditions and to promote habits of consistent work. When the
+Accomplishment Ratio increased I knew that the child was profiting, that
+he was working. Our objective was to increase Ratios of all children, not
+to attain any set standard.
+
+This Accomplishment Ratio would, to my mind, be an ideal school mark.
+Besides the inaccuracy of marks to-day, which are accurate marks only of
+the teacher’s opinion, biased as it is by the personal equation of her
+character with that of the pupil, there is another fault of prevalent
+school marking. It is based on average work. The mark is the link between
+education in the school and education in the home. It gives the parents
+an index of the child’s work and allows them to encourage or discourage
+the child’s attitudes. Such indices have no real significance when they
+are based upon average development, as the parent is generally mistaken
+about the ability of the child.
+
+Marks given by a teacher are satisfactory only for a normal child with
+normal age for the grade. Brilliant children are over-praised for work
+which, though over the ability for the group, is under their own ability.
+Marks given to stupid children are misinterpreted by parents so as
+greatly to prejudice the effort of the child. Though his work may be such
+as to merit encouragement his mark may be very low. Teachers’ marks are,
+aside from their inaccuracy, just, only in a group that is perfectly
+classified; just, only when the children are all of the same ability and
+all possess the same initial information. So far as they are unjust they
+are subversive of our aims, as they then transmit a faulty message to
+the home and disrupt the continuity of school and home education.[5]
+
+Such marks as are here advocated would correct this feature of our
+present system, as well as the inaccuracy of our present marks. It is a
+mark which evaluates the accomplishment of the child in terms of his own
+ability. A brilliant child would no longer be praised for work which in
+terms of his own effort is 70 per cent perfect, in terms of the maximum
+of the group 90 per cent. The teacher gives him a mark of 90 while we
+mark him 70. A stupid child who does work which is marked 70 in terms of
+the maximum of the class but 90 in terms of his own, a limited ability,
+is no longer discouraged. His effort is evaluated, and the praise which
+he receives from home is merited and consequently economical, since the
+resultant satisfaction cements the bonds of concentration and attention.
+Such a mark is an actual index of the effort that child is making and
+consequently forms the proper link between the school and the home.
+
+Parents would need no great instruction in the interpretation of these
+marks, since they have always acted as though the other marks were these,
+and since these also are in percentage form. The only kind of mark they
+can understand is an Accomplishment Ratio. I found that the parents of
+the children at Garden City were more attentive to such marks than to
+others, and acted upon them more readily. Of course the parents of the
+very intelligent children, who are used to marks above 90, are surprised
+at first when you tell them that your mark of the child is 80; but upon
+explanation, which should in all cases precede the first report to the
+parents, they immediately see the value of such grading. It is fortunate
+in this connection that the greatest amount of explanation is necessary
+about intelligent children, as one usually deals then with intelligent
+parents.
+
+
+THE DERIVATION OF AGE NORMS
+
+In this study age norms were derived empirically, both regression lines
+being taken into consideration. From the point of view of statistics
+it becomes imperative, in order to use the technique here advised, to
+have the average age of a score—since we are going to predict age from
+score—to translate crude scores into indices of maturity in each subject
+under consideration. We are in error in the use of grade norms, if we
+find the average score of a grade and then, when we obtain that score
+in practice, say that the work is of that grade. To be able to say this
+we must know the average grade of a score. This takes in an entirely
+different cross-section of data. If we get the average score of all
+children in grade 6, then we can predict what a 6th grade child is likely
+to get, but we can say nothing about a child who is not in grade 6. In
+order to decide that a 4th grade child has 6th grade ability, we must
+know that he has such ability that all children who share this score make
+an average grade of 6.[6] It would be wise then to get the regression
+of score on age as well as the regression of age on score, since they
+are not identical, the correlation between score and age being less than
+unity.
+
+We will note in passing that the data to establish these norms, except
+those of reading, are not as complete as may be desired, inasmuch as
+it was difficult to get test scores where the age in months also was
+available. However, the general data behind the grade norms could be
+used to keep the results from any crude error; and the averages were
+obtained for every month from 8 years to 14 years, with a corresponding
+refinement in intervals of score, which made still more improbable an
+error in the general tendency of the regression lines. Then all the
+distributions, when grouped by years, were corrected for truncation; that
+is, the tendency for the brighter children of the older group to be in
+high school (the data were from elementary schools only) and the duller
+children of the younger group to be in the lower grades where they could
+not be reached was recognized and corrected by finding the average,
+standard deviation, and number of cases which would have existed if these
+forces of truncation were not operating. This was done by the use of the
+other one half of the figures comprising Table XI of Pearson’s _Tables
+for Statisticians and Biometricians_. Dr. Truman L. Kelley pointed the
+way to its derivation.
+
+These norms differ somewhat from those derived from the grade norms by
+translation of grade into average age for the grade. This is because the
+norm for a grade is the average score for a grade. Hence the norm of age
+10 obtained in this way is the average score obtained by a grade whose
+average age is 10. Then the data used to obtain this average are made up
+of diverse ages, all of one grade, instead of all of one age and diverse
+grades. Even then, we would have only an average score of an age which
+approximates what we want, but is not as reliable to use as average age
+for a score.
+
+
+A METHOD OF SURVEY OF READING, LANGUAGE, AND ARITHMETIC
+
+The following procedure was employed in the experiment. The experiment
+was carried out in the public school at Garden City. Two hundred children
+were given the tests. The instructions, shown below, were followed in
+November, 1919, and in November, 1918; in June, 1919, and in June, 1920,
+with the exception that no arithmetic test was used in November, 1918,
+and June, 1919. The Binet tests were given by the author; all of the
+others were given either by the author or the principal who was careful
+not to deviate from the directions in any way. In June of both years
+the author gave instructions for a test in one room, and then left the
+teacher in charge and went on to the next. This could be done in June of
+each year as the teachers were then fully acquainted with the experiment
+and their coöperation was assured.
+
+ DIRECTIONS
+
+ I. Administer and score the following tests according to
+ standard instructions. Give all tests to grades 3 and above.
+
+ Woody-McCall Mixed Fundamentals in Arithmetic
+ Thorndike Reading Scale Alpha 2
+ Thorndike Visual Vocabulary Scale, A2
+ Kelley-Trabue Completion Exercises in Language
+ Stanford-Binet Tests (given by the author)
+
+ II. Translate the scores into year-month indices of maturity by
+ means of the following table. (Use Mental Age for the Binet.)
+ Assume rectilinear development, that is, that the amount of
+ score which equals the development of one month is the same as
+ the amount of score which equals the development of any other
+ month. Then interpolation and extension are allowable. Use the
+ table in this way: Find in the table the score made by a child
+ (for instance in the Woody-McCall); find the age to which it
+ corresponds, then call this age the Arithmetic Age of the
+ child. For instance, if the score in Woody-McCall is 20, his
+ Arithmetic Age is about halfway between 10 and 11 or 10 years 6
+ months.
+
+ =====+============+=======+=============+=============
+ Age |Woody-McCall|Alpha 2|Visual Vocab.|Kelley-Trabue
+ -----+------------+-------+-------------+-------------
+ 8—0 | 12.00 | 4.50 | 3.60 | 4.30
+ 9—0 | 15.16⅔ | 4.98 | 4.32 | 5.00
+ 10—0 | 18.33⅓ | 5.46 | 5.04 | 5.65
+ 11—0 | 21.50 | 5.94 | 5.76 | 6.35
+ 12—0 | 24.66⅔ | 6.42 | 6.48 | 7.05
+ 13—0 | 27.83⅓ | 6.90 | 7.20 | 7.70
+ -----+------------+-------+-------------+-------------
+
+ III. Arrange these Arithmetic Ages of all the children of your
+ school in order from high to low with the names opposite the
+ scores in the extreme left-hand column of the paper. At the
+ right have parallel columns of the grades. Check the grade of
+ each child in these columns. You will then have a sheet like
+ this:
+
+ ================+======+===================
+ | | Grade
+ | +---+---+---+---+---
+ Name |Arith.| 4 | 5 | 6 | 7 | 8
+ | Age +-+-+-+-+-+-+-+-+-+-
+ | |B|A|B|A|B|A|B|A|B|A
+ ----------------+------+-+-+-+-+-+-+-+-+-+-
+ Gertrude Smith | 180 | | | | | | | | |#|
+ | +-+-+-+-+-+-+-+-+-+-
+ Saul Sampson | 176 | | | | |#| | | | |
+ | +-+-+-+-+-+-+-+-+-+-
+ Ed Jones | 176 | | | | | | | | |#|
+ | +-+-+-+-+-+-+-+-+-+-
+ George Calut | 172 | | | | | | | | | |#
+ | +-+-+-+-+-+-+-+-+-+-
+ Ida Henry | 172 | | | | | | | | | |#
+ | +-+-+-+-+-+-+-+-+-+-
+ Raymond Teller | 172 | | | | | | | | | |#
+ | +-+-+-+-+-+-+-+-+-+-
+ Ed Hoard | 172 | | | | | | |#| | |
+
+ _Etc._
+
+ Do the same with each of the tests. It is clear that,
+ independent of the unreliability of the test, if your school
+ were perfectly classified all the 8th grade children would come
+ first on each relation sheet and then the 7th grade children,
+ etc. You have now a picture of the overlapping of your grades.
+ Regrade in reading and arithmetic. Draw horizontal lines across
+ these relation sheets at the points of delineation. Divide your
+ total number of children by the number of teachers available
+ and then make a class division by the number of pupils, that
+ is, call the upper one-sixth of the total number of pupils
+ grade 8 in this subject, the next one-sixth, grade 7, etc.
+ Teach all grades of arithmetic at the same time and all grades
+ of reading at the same time. You can now send each pupil to the
+ grade in which he belongs in each subject.
+
+ IV. Call each derived age a Subject Age (SA). Divide each
+ subject age by the chronological age of the child. This will
+ yield what may be called a Subject Quotient (SQ), previously
+ called an Educational Quotient (EQ).[7] Dividing the Reading
+ Age by the Chronological Age, you arrive at a Reading Quotient.
+ This RQ is the rate at which the child has progressed in
+ reading. We have the same kind of quotient for intelligence
+ (Stanford-Binet IQ). This IQ is the potential rate of progress
+ of the child.
+
+ V. The ratio of any Subject Age to Mental Age[8] may be called
+ a Subject Ratio (SR), previously called an Accomplishment
+ Quotient (AccQ).[7] This Subject Ratio gives the proportion
+ that the child has done in that subject of what he actually
+ could have done, and is a mark of the efficiency of the
+ education of the child in that subject to date. The goal is
+ to bring up these Subject Ratios as high as possible. When
+ they are above .90, the child may be considered as receiving
+ satisfactory treatment, providing norms for subject ages
+ are reasonably accurate. (This figure, .90, applies to a
+ Subject Ratio obtained by using a Stanford-Binet Mental Age.)
+ An Arithmetic Ratio based on one arithmetic test and one
+ intelligence test only is not as good as one based on three
+ arithmetic tests and three intelligence tests. If Subject
+ Ratios go far over 1.00 the chances are that the Mental Age
+ diagnosis is too low. The average of the Subject Ratios of a
+ child may be called his Accomplishment Ratio.
+
+ In the application of the above instructions, whenever
+ opportunity offers for classification of both subject matter
+ and intelligence (which means many teachers or a large school),
+ use a Relation Sheet (for instance for Arithmetic) and then
+ have additional columns at the extreme right for intelligence
+ headed _A_, _B_, _C_, and _D_. If a child’s IQ is in the upper
+ quarter of the IQ’s of your school, check in the column A
+ opposite his name; if it is in the upper half but not in the
+ upper quarter check in _B_, and so on with _C_ and _D_. Then
+ you will be able to split each group; for instance, the one
+ which is defined as 8th grade in arithmetic ability, into four
+ sections, each of which progresses at a rate differing from the
+ others. The _A_ section will progress most rapidly, _B_ next,
+ _C_ more slowly, and _D_ most slowly.
+
+As Garden City was a small school, adjustment of procedure to individual
+differences in intelligence, besides the grouping for subject matter,
+was done mostly by pushing children. Children were advanced whole years
+(the grade they “belonged to” was the one in which geography and history
+were taught; this was their home grade) besides the readjustment made
+by the special regrading in reading and arithmetic. A special treatment
+class was formed where pronounced negative deviates were given special
+attention. Regrading was also instituted for spelling. Children were
+promoted whenever it was considered advisable; teachers were switched
+from subject to subject whenever that was considered advisable by the
+principal and the author. The Thorndike _Arithmetics_ and other new texts
+were introduced to some extent. _Any change possible was made in order
+to bring EQ⁄IQ as high as possible._ That was the goal. The purpose
+was not to prove that any certain educational procedure would tend to
+promote abilities more rapidly than others, but that abilities could be
+promoted to the level of intelligence—that intelligence is substantially
+the exclusive inherited determinant of variety of product among school
+children. (It is to be understood that intelligence may be, and probably
+is, the summation of thousands of inherited factors,—neutral elements,
+here merged in the broader behavioristic concept of intelligence.)
+
+
+SCIENTIFIC QUESTIONS INVOLVED IN CLASSIFICATION
+
+If we were able to negate other influences upon disparity of product,
+we could conclude that these were not inherited. Hence it would be our
+burden as educators so to manipulate education as to prevent their
+operation. We will attempt to analyze the determinants of individual
+differences in product in these children, to see which influences besides
+intelligence are part of the inborn equipment which is not the province
+of education, but of eugenics, to correct. No absolute validity is held
+for any of the conclusions stated here. The subject is, at best, vague
+and complicated; but our conclusions can be used as the basis for a
+good guess in school procedure. We can judge general tendencies from the
+educational experiences of the two hundred children whose abilities for
+two years are here charted.
+
+The importance to educators of the subject in hand is excuse enough
+for its treatment. All educational procedure points a prophetic finger
+toward the classification of pupils and a reduction of the individual
+differences of product to the inherited bases of these differences.
+
+Classification, however, needs some more accurate psychological
+foundation than the mere awareness of individual variance. We must know:
+
+1. What tests to use.
+
+2. How to use them.
+
+3. Whether abilities in reading, spelling, and arithmetic or their
+predispositions exist as special abilities, or whether children differ in
+these simply because of their innate differences of intelligence.
+
+4. Whether individual differences in ambition, interest, and industry, in
+so far as they influence accomplishment, are due to special tendencies,
+or whether they are learned manifestations of a more general heritage.
+
+5. How these proclivities, specific or general, are related to
+intelligence.
+
+Points 1 and 2 are problems of procedure which must be evolved from our
+existent knowledge of measurements and statistics. Points 3, 4, and
+5 are problems which must be solved from the evidence resulting from
+an experiment in classification using these methods. Points 4 and 5
+introduce the vexed question of whether there is a “general factor” or
+some general inherited cause of disparity in school product other than
+intelligence. Should reading ability prove to be the result of certain
+inherited abilities, or predisposition to abilities, we could not use
+a measure of mental ability alone as the guide to what a child could
+attain in reading. If intelligence, however, were the only inherited
+prognostic factor of school achievement, we could mark the education
+which had functioned in the child’s life by the percentage which the
+actual accomplishment of the child was of the maximum accomplishment
+of which he was capable at that stage of his mental development. So,
+too, if interest in particular subjects and ambition are not mainly the
+result of rewards and punishments of early life, but are themselves
+significantly rooted in the nature of the child, we could not condemn
+or commend curricula and methods upon a basis of the ratio of resultant
+accomplishment to mental ability, but must include a measure of this
+potentiality. The practical queries whether or not a child can do reading
+as well as he does arithmetic, whether his ambition and his honesty have
+their origin in the same strength or weakness, can be answered only when
+these problems are fully solved. The immediate consequences of knowing
+that a child can usually be taught to read if he does other tasks well
+is of obvious import. It would be of great service, too, to know whether
+lack of application can be corrected so as to bring concentration to the
+level of the other traits. If a child is normal in other ways and not in
+his tendency to respond to the approval of others by satisfaction, can
+this “drive” be increased or reduced to the average, or are individual
+differences in specific original tendencies basic to development of
+character, and if they are, how much influence do these differences
+exert upon school accomplishment? In order to classify children and
+comprehendingly watch and control their progress we must know the
+relation of achievement to the inherited bases upon which it depends. We
+must be able to state a child’s progress in any one school subject in
+terms of the potential capacity of the child to progress. We must know
+the inherited determinants of disparity in school product.
+
+
+
+
+PART II
+
+STATISTICAL TREATMENT OF THE EXPERIMENT
+
+
+In the discussion and tables which follow:
+
+Q stands for Quotient, which will mean a Subject Age divided by a
+Chronological Age. R stands for Ratio, which will mean a Subject Age
+divided by a Mental Age.
+
+AQ means Woody-McCall Arithmetic Age divided by Chronological Age, and AR
+means this AA divided by Mental Age.
+
+VQ means Thorndike Vocabulary Age divided by Chronological Age, and VR
+means this VA divided by Mental Age.
+
+RQ means Alpha 2 Reading Age divided by Chronological Age, and RR means
+this RA divided by Mental Age.
+
+CQ means Kelley-Trabue Completion Age divided by Chronological Age, and
+CR means this CA divided by Mental Age.
+
+SQ means any Subject Quotient, that is, any Subject Age divided by
+Chronological Age, and SR means any Subject Ratio, that is, any SA
+divided by Mental Age.
+
+EQ means the average of all Subject Quotients and AccR, the
+Accomplishment Ratio, means the average of all Subject Ratios.
+
+All _r_’s are product-moment correlation coefficients, uncorrected. As
+the reliabilities (Table 4) are almost what the other coefficients are
+in June, 1920 (Table 5), it is apparent that the corrected coefficients,
+when Grade III is excluded, would all be very near unity at that time.
+
+
+THE QUOTIENTS
+
+In Table 1 are presented all the quotients for all periods of testing,
+grouped by children. The table, a sample of which is included here,[9]
+shows clearly how all SQ’s approach IQ as special treatment continues.
+The grades indicated in this grouping are as of June, 1920. Inasmuch as
+many double and triple promotions were made in an effort to get maximum
+product for intelligence invested, no conclusion can here be formed of
+the grade to which these children belonged at any time except June, 1920.
+The correspondence between IQ and the SQ’s in June, 1920 is further
+shown in Table 2. In this table the 48 children who took all tests at
+all periods are ranked from high to low IQ and their SQ’s are listed
+opposite. The high correspondence is readily apparent.
+
+
+TABLE 1[10]
+
+INTELLIGENCE QUOTIENTS FOR ALL PERIODS GROUPED BY CHILDREN
+
+The children are arranged by grade as they were in June, 1920, and
+alphabetically within the grade. The periods of testing are lettered in
+their chronological sequence; _a_ is November, 1918, _b_ is June, 1919,
+_c_ is November, 1919 and _d_ is June, 1920. * = Zero Score
+
+ GRADE 3
+
+ =============+======+==========+==========+========+==========
+ Intelligence| Test |Arithmetic|Vocabulary|Reading |Completion
+ Quotient |Period| Quotient | Quotient |Quotient| Quotient
+ -------------+------+----------+----------+--------+----------
+ | _a_ | | | |
+ 101 | _b_ | | | |
+ | _c_ | 64 | 58 | | 43
+ | _d_ | 106 | 88 | | 93
+ | | | | |
+ | _a_ | | | |
+ 128 | _b_ | | | |
+ | _c_ | 80 | 102 | | 81
+ | _d_ | | 152 | 124 | 153
+ | | | | |
+ | _a_ | | | |
+ 116 | _b_ | | | |
+ | _c_ | 56 | 90 | * | 49
+ | _d_ | 94 | 95 | 77 | 89
+ | | | | |
+ | _a_ | | | |
+ 87 | _b_ | | | |
+ | _c_ | 90 | 40 | 35 | 54
+ | _d_ | 72 | 74 | 61 | 52
+ | | | | |
+ | _a_ | | | |
+ 112 | _b_ | | | |
+ | _c_ | 90 | 137 | 133 | 112
+ | _d_ | 112 | 113 | 121 | 131
+ -------------+------+----------+----------+--------+----------
+
+
+TABLE 2[11]
+
+GROUP TAKING ALL TESTS AT ALL PERIODS ARRANGED IN ORDER OF MAGNITUDE OF
+INTELLIGENCE QUOTIENTS
+
+ =============+============+==========+==========+===========
+ Intelligence | Arithmetic |Vocabulary| Reading |Completion
+ Quotients | Quotients |Quotients |Quotients |Quotients
+ -------------+------------+----------+----------+-----------
+ 146 | 111 | 154 | 164 | 150
+ 142 | 129 | 135 | 137 | 136
+ 141 | 109 | 118 | 107 | 121
+ 139 | 124 | 141 | 124 | 134
+ 138 | 101 | 112 | 105 | 106
+ | | | |
+ 138 | 121 | 130 | 110 | 109
+ 130 | 107 | 139 | 135 | 136
+ 122 | 127 | 130 | 124 | 121
+ 122 | 113 | 121 | 117 | 124
+ 122 | 112 | 102 | 114 | 129
+ | | | |
+ 121 | 128 | 125 | 128 | 128
+ 120 | 100 | 116 | 102 | 119
+ 118 | 117 | 123 | 114 | 125
+ 117 | 131 | 111 | 118 | 124
+ 117 | 106 | 122 | 112 | 111
+ | | | |
+ 114 | 105 | 126 | 110 | 114
+ 109 | 83 | 113 | 117 | 103
+ 107 | 103 | 112 | 95 | 103
+ 107 | 94 | 126 | 94 | 123
+ 104 | 99 | 117 | 96 | 104
+ | | | |
+ 104 | 103 | 110 | 94 | 116
+ 103 | 108 | 113 | 112 | 106
+ 101 | 100 | 114 | 109 | 106
+ 100 | 90 | 103 | 92 | 92
+ 100 | 109 | 118 | 108 | 113
+ | | | |
+ 99 | 114 | 104 | 106 | 110
+ 99 | 114 | 119 | 117 | 115
+ 98 | 102 | 101 | 108 | 104
+ 98 | 99 | 106 | 107 | 106
+ 97 | 95 | 109 | 107 | 105
+ | | | |
+ 97 | 108 | 101 | 102 | 105
+ 97 | 95 | 104 | 89 | 110
+ 96 | 90 | 104 | 91 | 91
+ 95 | 84 | 99 | 93 | 100
+ 95 | 90 | 107 | 99 | 105
+ | | | |
+ 95 | 85 | 117 | 114 | 103
+ 94 | 106 | 57 | 89 | 108
+ 94 | 103 | 103 | 106 | 104
+ 92 | 96 | 86 | 94 | 85
+ 87 | 83 | 88 | 92 | 87
+ | | | |
+ 87 | 95 | 96 | 94 | 102
+ 84 | 85 | 87 | 93 | 87
+ 83 | 106 | 91 | 87 | 104
+ 80 | 77 | 91 | 80 | 84
+ 80 | 84 | 75 | 79 | 84
+ | | | |
+ 80 | 89 | 107 | 88 | 86
+ 78 | 87 | 90 | 93 | 85
+ 60 | 69 | 56 | 71 | 77
+ -------------+------------+----------+----------+-----------
+
+The intercorrelations of the quotients of these 48 cases for all periods
+may be seen in Table 3 (page 21). The correlations with IQ and the
+intercorrelations of the SQ’s have increased toward positive unity or
+rather toward the limits of a correlation with tools of measurement such
+as we have used. This limit is a function of the reliability of the tests
+employed. It is customary to use a formula to correct for attenuation in
+order to find the percentage which the correlation is of the geometric
+mean of the two reliability coefficients. This is tantamount to saying
+that any correlation can go no higher than the geometric mean of the
+reliability coefficients of the tests used. It is better to assume that
+an _r_ can go as high as the ∜(_r_₁₁⋅_r_₂₂) since an _r_ can go as high
+as the square root of its reliability coefficient. Dr. Truman L. Kelley
+has shown that the correlation of a test with an infinite number of forms
+of the same test would be as the square root of its correlation with any
+one other form.
+
+The reliabilities and limits defining a limit as the fourth root of the
+multiplied reliability coefficients are in Table 4.
+
+Correction for attenuation is often ridiculously high because the
+reliability coefficient of one of the measures used is so low. If an
+element is included in the two tests which are correlated, but not in
+the other forms of each test used to get reliability, the “corrected
+coefficient” is corrected for an element which is not chance. Whenever
+the geometric mean of the reliabilities is less than the obtained _r_,
+the corrected _r_ is over 1.00 and hence absurd.[12]
+
+Therefore we use here instead, a comparison to the maximum possibility in
+a true sense. Since a test correlates with the “true ability” √(_r_₁₁),
+∜(_r_₁₁⋅_r_₂₂) is the limit of an _r_, its optimum with those tools.
+Although these limits apply, strictly speaking, only to the total
+correlations, since the reliability correlations are with all the data;
+we may assume that the same facts hold with regard to the correlations of
+each of the grades, that is, the reliability is a function of the test
+not of the data selected.
+
+
+TABLE 3
+
+INTERCORRELATION OF ALL QUOTIENTS FOR ALL PERIODS OF THE 48 CHILDREN WHO
+TOOK ALL TESTS
+
+ NOVEMBER, 1918
+
+ IQ VQ RQ S.D. M
+
+ IQ 19.12 105.15
+ ±1.32 ±1.86
+
+ VQ .72 20.54 102.52
+ ±.05 ±1.41 ±2.00
+
+ RQ .64 .64 19.09 95.90
+ ±.06 ±.06 ±1.31 ±1.86
+
+ CQ .63 .71 .77 19.34 99.44
+ ±.06 ±.05 ±.04 ±1.33 ±1.88
+
+ JUNE, 1919
+
+ IQ VQ RQ S.D. M
+
+ IQ 19.12 105.15
+ ±1.32 ±1.86
+
+ VQ .73 20.80 113.54
+ ±.05 ±1.43 ±2.02
+
+ RQ .65 .58 14.73 101.31
+ ±.06 ±.06 ±1.01 ±1.43
+
+ CQ .62 .68 .77 19.76 101.04
+ ±.06 ±.05 +.04 ±1.36 ±1.92
+
+ NOVEMBER, 1919
+
+ IQ AQ VQ RQ S.D. M
+
+ IQ 19.12 105.15
+ ±1.32 ±1.86
+
+ AQ .46 14.08 102.90
+ ±.08 ±0.97 ±1.37
+
+ VQ .86 .23 17.07 109.17
+ ±.03 ±.09 ±1.18 ±1.66
+
+ RQ .65 .56 .71 13.91 101.42
+ ±.06 ±.07 ±.05 ±0.96 ±1.35
+
+ CQ .79 .47 .83 .82 17.53 105.21
+ ±.04 ±.08 ±.03 ±.03 ±1.21 ±1.71
+
+ JUNE, 1920
+
+ IQ AQ VQ RQ S.D. M
+
+ IQ 19.12 105.15
+ ±1.32 ±1.86
+
+ AQ .73 14.10 101.79
+ ±.05 ±0.97 ±1.37
+
+ VQ .81 .60 18.89 108.94
+ ±.03 ±.06 ±1.30 ±1.84
+
+ RQ .79 .68 .87 16.43 104.94
+ ±.04 ±.05 ±.02 ±1.13 ±1.60
+
+ CQ .84 .77 .78 .84 15.87 108.08
+ ±.03 ±.04 ±.04 ±.03 ±1.09 ±1.54
+
+
+TABLE 4
+
+RELIABILITY COEFFICIENTS
+
+ One Form Two Forms One Form Two Forms
+ of Each of Each with an with an
+ Test Test (by Infinite Infinite
+ Brown’s Number Number
+ Formula) of Forms of Forms
+
+ _r_₁₁ _r_₁₁ √_r_₁₁ √_r_₁₁
+
+ Intelligence Quotient .888 .942
+ (by Brown’s Formula)[13]
+
+ Arithmetic Quotient .824 .904 .908 .951
+
+ Vocabulary Quotient .820 .901 .906 .949
+
+ Reading Quotient .866 .928 .931 .963
+
+ Completion Quotient .883 .938 .940 .968
+
+ Limits of the _r_’s = ∜(_r_₁₁ × _r_₂₂)
+
+ Nov. 1918,
+ June and Nov. 1919 June 1920
+ IQ and AQ .925 .946
+ IQ and VQ .924 .946
+ IQ and RQ .936 .953
+ IQ and CQ .941 .955
+
+ The limits of the June, 1920 _r_’s are naturally somewhat larger than
+ the others since two forms of tests (except the Binet) were used; the
+ unreliability of the quantitative indices is therefore lower and hence
+ the correlation with IQ may be larger.
+
+The correlations in 1920 of another group—the whole school except Grade
+III—are reproduced in Table 5. Grade III was excluded since here there
+had as yet been little chance to push the _r_’s. Partials were obtained
+with these data (Table 6). Little faith may be placed in the relative
+sizes of these partials, much because the _r__{VQ.RQ} is here only .73
+and, in the data presented in Table 3, it is .87. This is due to the
+fact that the data in Table 3 cover all periods (2 years) while those
+in Table 5 cover only one. This difference has comparatively slight
+influence on our general conclusions; but it makes a huge difference
+in the correlation of RQ and VQ when IQ is rendered constant, whether
+the one or the other set of data is used. Moreover, the whole logic of
+arguing for general factors by reduction of partial correlations from
+the original _r_ has been called gravely into question in Godfrey H.
+Thomson’s recent work on this subject: “The Proof or Disproof of the
+Existence of General Ability.” Thomson shows that partial correlation
+gives one possible interpretation of the facts, but not an inevitable
+one. Thus we cannot say that because RQ and IQ and RQ and AQ are highly
+correlated, correlation of IQ and AQ is dependent upon RQ. We can say,
+however, that it is likely to be. IQ and AQ may be correlated by reason
+of inclusion of some element not included at all in RQ. The higher the
+correlations which we deal with the less we need worry about this, and of
+course correlations of unity exclude any such consideration.
+
+
+TABLE 5
+
+INTERCORRELATION OF ALL QUOTIENTS IN JUNE, 1920. ALL CHILDREN EXCLUSIVE
+OF GRADE 3 ARE HERE REPRESENTED
+
+ The P.E.’s are all less than .05
+ _N_ = 81
+
+ Arithmetic Vocabulary Reading
+ IQ Quotient Quotient Quotient
+
+ Arithmetic Quotient .733
+
+ Vocabulary Quotient .837 .628
+
+ Reading Quotient .758 .694 .734
+
+ Completion Quotient .821 .770 .825 .801
+
+I therefore draw no conclusions from the comparative size of these
+partials, nor do I get partials with any of the other data, and rest the
+case mainly on the high _r_’s between IQ and SQ’s in 1920; increase in
+correspondence of the central tendencies and range of the SQ’s by grade
+with the central tendency and range of the IQ’s of the same data; small
+intercorrelation of SR’s and negative correlation of AccR with IQ.
+
+The general lowness of the partials (Table 6) does, however, indicate
+the great causative relation between IQ and disparity of product.
+The elements still in here are common elements in the tests and the
+mistreatment of intelligence.
+
+
+TABLE 6
+
+PARTIAL CORRELATIONS OF QUOTIENTS IRRESPECTIVE OF INTELLIGENCE QUOTIENTS
+
+ _N_ = 81
+
+ Arithmetic Vocabulary Reading
+ Quotient Quotient Quotient
+
+ Vocabulary Quotient .04
+ ±.07
+
+ Reading Quotient .31 .28
+ ±.07 ±.07
+
+ Completion Quotient .43 .44 .47
+ ±.08 ±.06 ±.06
+
+What happened by grade in 1918-1919 is summarized in Table 7. What
+happened by grade in 1919-1920 is summarized in Table 8. Since there were
+many changes in personnel from 1918-1919 to 1919-1920, we need expect no
+continuity from Table 7 to Table 8. For the continuous influence of the
+two years, see Table 3, which includes 48 children taking all tests at
+all periods.
+
+
+TABLE 7
+
+ALL CORRELATIONS, MEANS, AND STANDARD DEVIATIONS BY GRADE, SHOWING
+PROGRESS FROM NOVEMBER, 1918 TO JUNE, 1919
+
+ I stands for Intelligence Quotient
+ V stands for Vocabulary Quotient
+ R stands for Reading Quotient
+ C stands for Completion Quotient
+
+ GRADE _r_ M S.D.
+
+ Nov. June Nov. June Nov. June
+
+ I V .467 .633 I 109.89 113.20 I 12.83 15.49
+ ±.12 ±.07 ±1.98 ±1.91 ±1.40 ±1.35
+
+ III I R .541 .492 V 96.11 109.90 V 21.21 18.69
+ ±.11 ±.09 ±3.28 ±2.30 ±2.32 ±1.63
+
+ I C .641 .386 R 82.26 101.40 R 22.58 15.85
+ ±.09 ±.11 ±3.49 ±1.95 ±2.47 ±1.38
+
+ C 86.89 108.40 C 22.76 15.79
+ ±3.52 ±1.94 ±2.49 ±1.37
+
+ _N_ = 19 30
+ -----------------------------------------------------------------
+
+ I V .724 .819 I 105.90 104.82 I 18.08 18.21
+ ±.07 ±.05 ±2.73 ±2.98 ±1.93 ±2.11
+
+ IV I R .665 .845 V 97.20 108.53 V 17.26 24.92
+ ±.08 ±.05 ±2.60 ±4.08 ±1.84 ±2.88
+
+ I C .596 .717 R 91.06 107.82 R 27.85 10.35
+ ±.10 ±.08 ±4.20 ±1.69 ±2.97 ±1.20
+
+ C 101.45 108.12 C 21.53 17.75
+ ±3.25 ±2.90 ±2.30 ±2.05
+
+ _N_ = 20 17
+ -----------------------------------------------------------------
+
+ I V .887 .822 I 101.64 99.42 I 24.76 17.63
+ ±.04 ±.05 ±3.56 ±2.73 ±2.52 ±1.93
+
+ V I R .799 .832 V 100.59 111.58 V 26.71 19.78
+ ±.05 ±.05 ±3.84 ±3.06 ±2.72 ±2.16
+
+ I C .818 .890 R 94.59 101.42 R 22.10 12.56
+ ±.05 ±.03 ±3.18 ±1.94 ±2.25 ±1.37
+
+ C 97.00 102.68 C 22.52 17.71
+ ±3.24 ±2.74 ±2.29 ±1.94
+
+ _N_ = 22 19
+ -----------------------------------------------------------------
+ I V .793 .772 I 109.90 115.90 I 23.45 24.38
+ ±.08 ±.09 ±5.00 ±5.20 ±3.54 ±3.68
+
+ VI I R .497 .726 V 108.00 126.80 V 30.20 25.25
+ ±.16 ±.10 ±6.44 ±5.39 ±4.55 ±3.81
+
+ I C .798 .891 R 103.10 107.20 R 13.77 20.62
+ ±.08 ±.04 ±2.94 ±4.40 ±2.08 ±3.11
+
+ C 108.90 117.10 C 15.23 18.81
+ ±3.25 ±4.01 ±2.30 ±2.84
+
+ _N_ = 10 10
+ -----------------------------------------------------------------
+ I V .625 .504 I 99.29 98.92 I 11.11 11.45
+ ±.11 ±.14 ±2.00 ±2.14 ±1.42 ±1.51
+
+ VII I R .622 .709 V 109.43 115.23 V 14.07 17.43
+ and ±.11 ±.09 ±2.54 ±2.95 ±1.79 ±2.31
+ VIII
+ I C .782 .730 R 97.00 98.85 R 12.59 15.77
+ ±.07 ±.09 ±2.27 ±3.26 ±1.61 ±2.09
+
+ C 102.43 95.85 C 13.49 17.72
+ ±2.43 ±3.31 ±1.72 ±2.34
+
+ _N_ = 14 13
+ -----------------------------------------------------------------
+ I V .685 .680 I 105.07 106.88 I 19.34 18.45
+ ±.04 ±.04 ±1.41 ±1.32 ±1.00 ±0.93
+
+ I R .568 .626 V 101.12 112.67 V 22.83 21.58
+ TOTAL ±.05 ±.04 ±1.67 ±1.54 ±1.18 ±1.09
+
+ I C .639 .702 R 92.40 102.91 R 22.65 15.27
+ ±.04 ±.04 ±1.66 ±1.09 ±1.17 ±0.77
+
+ C 98.08 106.27 C 21.48 18.19
+ ±1.57 ±1.30 ±1.11 ±0.92
+
+ _N_ = 85 89
+ -----------------------------------------------------------------
+
+
+TABLE 8
+
+ALL CORRELATIONS, MEANS, AND STANDARD DEVIATIONS OF QUOTIENTS BY GRADE,
+SHOWING PROGRESS FROM NOVEMBER, 1919 TO JUNE, 1920
+
+ I stands for Intelligence Quotient
+ V stands for Vocabulary Quotient
+ R stands for Reading Quotient
+ C stands for Completion Quotient
+ A stands for Arithmetic Quotient
+
+ _r_ M S.D.
+
+ Nov. June Nov. June Nov. June
+
+ I A .413 .709 I 102.00 105.53 I 9.60 10.89
+ ±.16 ±.08 ±1.87 ±1.68 ±1.32 ±1.19
+
+ III I V .649 .667 A 82.75 97.84 A 15.88 18.62
+ ±.11 ±.09 ±3.09 ±2.88 ±2.19 ±2.04
+
+ I R .651 .609 V 94.00 103.47 V 33.44 27.66
+ ±.11 ±.10 ±6.51 ±4.28 ±4.60 ±3.03
+ I C .612 .719 R 87.59 93.88 R 32.06 19.02
+ ±.12 ±.07 ±6.24 ±3.21 ±4.41 ±2.27
+
+ C 90.17 96.84 C 28.82 25.59
+ ±5.58 ±3.96 ±3.95 ±2.80
+
+ _N_ = 12 19
+ -----------------------------------------------------------------
+ I A .426 .725 I 111.48 113.00 I 14.73 15.04
+ ±.10 ±.06 ±1.85 ±1.93 ±1.30 ±1.36
+
+ IV I V .635 .772 A 94.07 111.08 A 12.34 15.02
+ ±.075 ±.05 ±1.55 ±1.99 ±1.09 ±1.40
+
+ I R .316 .569 V 109.79 115.61 V 16.97 18.39
+ ±.11 ±.09 ±2.13 ±2.34 ±1.50 ±1.66
+
+ I C .594 .837 R 99.31 110.11 R 17.89 14.67
+ ±.08 ±.04 ±3.24 ±1.67 ±1.58 ±1.32
+
+ C 108.14 118.14 C 15.51 12.70
+ ±1.94 ±1.62 ±1.37 ±1.15
+
+ _N_ = 29 28
+ -----------------------------------------------------------------
+ I A .698 .713 I 103.72 98.83 I 19.57 18.84
+ ±.07 ±.07 ±2.69 ±2.65 ±1.91 ±1.87
+
+ V I V .881 .908 A 87.58 99.71 A 12.43 16.47
+ ±.03 ±.02 ±1.71 ±2.27 ±1.21 ±1.60
+
+ I R .773 .891 V 109.00 105.17 V 15.58 19.97
+ ±.06 ±.03 ±2.14 ±2.81 ±1.52 ±1.99
+
+ I C .786 .923 R 104.46 103.00 R 16.99 17.07
+ ±.05 ±.02 ±2.34 ±2.40 ±1.65 ±1.70
+
+ C 107.00 103.48 C 16.12 14.51
+ ±2.22 ±2.04 ±1.57 ±1.44
+
+ _N_ = 24 23
+ -----------------------------------------------------------------
+ I A .533 .805 I 102.43 105.39 I 11.61 13.56
+ ±.13 ±.06 ±2.09 ±2.16 ±1.48 ±1.52
+
+ VI I V .774 .858 A 91.43 104.53 A 11.43 11.31
+ ±.07 ±.04 ±2.06 ±1.75 ±1.46 ±1.24
+ I R .420 .661 V 106.07 112.94 V 11.93 10.94
+ ±.15 ±.09 ±2.15 ±1.74 ±1.52 ±1.23
+
+ I C .739 .620 R 96.64 106.20 R 12.38 11.88
+ ±.08 ±.10 ±2.23 ±1.79 ±1.58 ±1.27
+
+ C 100.36 107.61 C 13.95 10.55
+ ±2.51 ±1.68 ±1.78 ±1.19
+
+ _N_ = 14 18
+ -----------------------------------------------------------------
+ I A .740 .795 I 107.27 100.58 I 23.29 19.78
+ ±.09 ±.07 ±4.74 ±2.85 ±3.35 ±2.72
+
+ VII I V .867 .718 A 100.00 99.31 A 9.26 11.00
+ ±.05 ±.09 ±1.86 ±2.06 ±1.33 ±1.45
+
+ I R .862 .799 V 114.36 108.75 V 19.15 14.42
+ ±.05 ±.07 ±3.89 ±2.81 ±2.75 ±1.98
+
+ I C .833 .677 R 101.73 98.58 R 12.28 11.56
+ ±.06 ±.11 ±2.50 ±2.25 ±1.77 ±1.59
+
+ C 105.82 101.42 C 17.41 16.02
+ ±3.54 ±3.12 ±2.50 ±2.21
+
+ _N_ = 11 12
+ -----------------------------------------------------------------
+ I A .663 .796 I 104.83 108.79 I 15.46 18.25
+ ±.11 ±.07 ±3.01 ±3.29 ±2.13 ±2.33
+
+ VIII I V .828 .750 A 92.92 93.86 A 10.20 9.74
+ ±.06 ±.08 ±1.99 ±1.76 ±1.40 ±1.24
+
+ I R .775 .722 V 111.67 117.21 V 16.44 14.02
+ ±.08 ±.08 ±3.20 ±2.53 ±2.26 ±1.79
+
+ I C .838 .868 R 100.83 104.38 R 11.52 20.62
+ ±.06 ±.04 ±2.24 ±3.72 ±1.59 ±2.63
+
+ C 104.92 109.64 C 18.11 17.41
+ ±3.53 ±3.14 ±2.49 ±2.22
+
+ _N_ = 12 14
+ -----------------------------------------------------------------
+
+ I A .576 .686 I 106.02 105.87 I 16.73 16.87
+ ±.05 ±.03 ±1.12 ±1.07 ±0.79 ±0.75
+
+ TOTAL I V .679 .727 A 91.35 102.01 A 13.22 15.61
+ ±.04 ±.03 ±0.88 ±0.98 ±0.62 ±0.69
+
+ I R .529 .609 V 107.95 110.54 V 19.76 19.57
+ ±.05 ±.04 ±1.32 ±1.24 ±0.93 ±0.87
+
+ I C .678 .731 R 99.22 103.65 R 18.85 17.12
+ ±.04 ±.03 ±1.26 ±1.08 ±0.89 ±0.76
+
+ C 104.06 108.00 C 18.87 18.11
+ ±1.26 ±1.14 ±0.89 ±0.81
+
+ _N_ = 102 114
+ -----------------------------------------------------------------
+
+ NOTE—Totals without Grade III are much higher than these (Table 5).
+ Grade III has many children in it who have not been long enough in an
+ academic situation to allow their SQ’s to go as high as they may.
+
+It is proper to note here that not much can be expected from Grades III
+and VIII and from totals including Grade III, since children in Grade III
+have not been there long enough to be pushed, and children in Grade VIII
+have been pushed beyond the limits which the tests used will register.
+Our logic is one of _pushed_ correlations. If the association of IQ and
+the SQ’s is what we are attempting to establish, it is necessary to show:
+
+1. That the _r_ comes near unity;
+
+2. That the central tendencies come near coincidence;
+
+3. That the S.D.’s come near coincidence.
+
+The value of the _r_ is obvious; the value of coincidence of means
+becomes clearer if we think of Σ(IQ-EQ)⁄_n_, the average difference of
+potential rate of progress and actual rate of progress. This average of
+differences is the same as the difference of the averages, which is more
+readily calculated. Obviously, if we wish to use an AccR, it is necessary
+to show more than correspondence when differences in average and
+spread are equated as they are by the correlation coefficient. Besides,
+coincidence of M’s, correspondence of S.D.’s is also necessary since a
+correlation might be positive unity, the M’s might be equal, and still
+the spread of one measure might be more than the spread of the other. If
+the spreads are the same and the M’s are the same, and the correlation is
+positive unity, each _x_ must equal its corresponding _y_. Then _b_₁₂ =
+_b_₂₁ = 1.00; and the M’s being equal, the deviations are from the same
+point. Therefore, we will attempt to measure similarity of M’s and S.D.’s
+as well as _r_.
+
+It will be observed that both Tables 7 and 8 give evidence of each
+of these tendencies in all grades. In Table 8 marked progress in
+arithmetic is apparent. This is due to re-classification in terms of
+the Woody-McCall test, which was not done in 1918-1919. In 1918-1919
+no arithmetic test was given and all re-classification was in terms
+of reading, being done on the basis of both reading tests. Spelling
+re-classification was done each year, but the data were not treated in
+this manner. It can be said that wherever re-classification in terms of
+intelligence and pedagogical need was undertaken the desired result of
+pushing the SQ’s up to IQ was hastened. Of all the remedial procedure,
+such as changing teachers and time allotment and books and method,
+all of which were employed to some extent, it is my opinion that the
+re-classification was more important than everything else combined.
+
+It is noticeable that when _r_’s approach the limit which the
+unreliability of the test allows them, they drop down again. This is
+probably due to continued increase of SQ’s over IQ. Of course, for some
+SQ’s to be greater than IQ out of proportion to the general amount lowers
+the correlation as much as for some to lag behind. When the SQ’s of the
+children of lower intelligence reach their IQ they continue above. This,
+of course, is due to errors in establishment of the age norms. The norms
+are not limits of pushing, though an attempt was made by correction for
+truncation to get them as nearly so as possible. It is to be noted,
+however, that these norms are up the growth curve, that is, reading
+age of 10 means a score such that the average age of those getting it
+is 10, not the average score of children whose mental age is 10. The
+average reading achievement of children all ten years old chronologically
+is _higher_ than that of a group all mentally ten, since many of the
+mentally advanced have not been pushed in product. The group used here
+to establish norms gives more nearly pushed norms than the others would.
+
+The tendency of the low IQ’s to go over unity in their SR’s is apparent
+in Table 1 and in Table 12 and also in the negative correlation between
+AccR and IQ.
+
+In both years some second grade children were advanced to Grade III
+during the year. This accounts for the low _r_’s in June, 1919, but in
+1919-1920 the Grade III correlations are raised and the means raised
+toward the M_{IQ}, even though some second grade children were put in
+this group during the year.
+
+
+TABLE 9
+
+SUMMARY OF PROGRESS IN ARITHMETIC BY INCREASE IN _r_, DECREASE IN
+M_{IQ}-M_{AQ} AND DECREASE IN DIFFERENCE OF STANDARD DEVIATIONS
+IRRESPECTIVE OF DIRECTION
+
+ Average Intelligence Difference of
+ GRADE _r_ Quotient Minus Standard Deviations
+ Average Arithmetic Irrespective of
+ Quotient Sign (of IQ and
+ Arith. Q)
+
+ Nov. June Nov. June Nov. June
+
+ III .413 .709 19.25 8.16 6.27 6.63
+ ±.16 ±.08 ±2.87 ±2.05 ±2.04 ±1.45
+
+ IV .426 .725 7.41 0.46 2.39 0.47
+ ±.10 ±.06 ±1.84 ±1.50 ±1.29 ±1.02
+
+ V .698 .713 16.14 0.54 7.14 2.06
+ ±.07 ±.07 ±1.93 ±1.84 ±1.37 ±1.30
+
+ VI 5.33 .805 11.00 3.00 0.19 1.63
+ ±.13 ±.06 ±2.01 ±1.19 ±1.42 ±0.85
+
+ VII .740 .795 7.27 0.62 14.03 8.15
+ ±.09 ±.07 ±3.58 ±2.33 ±2.53 ±1.63
+
+ VIII .663 .796 11.92 [14]14.93 5.26 [14]8.53
+ ±.11 ±.07 ±2.25 ±2.69 ±1.59 ±1.54
+
+ Total .576 .686 14.67 3.72 3.51 1.16
+ ±.05 ±.03 ±0.94 ±0.81 ±0.67 ±0.57
+
+
+TABLE 10
+
+SUMMARY OF PROGRESS IN READING, NOVEMBER, 1918 TO JUNE, 1919, BY INCREASE
+IN _r_, DECREASE IN M_{IQ}-M_{RQ}, AND DECREASE IN DIFFERENCE OF STANDARD
+DEVIATIONS IRRESPECTIVE OF SIGN
+
+ Average Intelligence Difference of
+ GRADE _r_ Quotient Minus Standard Deviations
+ Average Reading Irrespective of
+ Quotient Sign (of IQ and RQ)
+
+ Nov. June Nov. June Nov. June
+
+ III .541 .492 27.63 11.80 9.75 0.36
+ ±.11 ±.09
+
+ IV .665 .845 14.84 -3.00 9.77 7.86
+ ±.08 ±.05
+
+ V .799 .832 7.05 -2.00 2.66 5.07
+ ±.05 ±.05
+
+ VI .497 .726 6.80 8.70 9.68 3.76
+ ±.16 ±.10
+
+ VII .622 .709 2.28 0.07 1.48 5.98
+ 3 of VIII ±.11 ±.09
+
+ Total .568 .626 12.67 3.97 3.31 3.18
+ ±.05 ±.04
+
+
+TABLE 11
+
+SUMMARY OF PROGRESS IN READING, NOVEMBER, 1919 TO JUNE, 1920, BY INCREASE
+IN _r_, DECREASE IN M_{IQ}-M_{RQ}, AND DECREASE IN DIFFERENCE OF STANDARD
+DEVIATIONS IRRESPECTIVE OF SIGN
+
+ Average Intelligence Difference of
+ GRADE _r_ Quotient Minus Standard Deviations
+ Average Reading Irrespective of
+ Quotient Sign (of IQ and RQ)
+
+ Nov. June Nov. June Nov. June
+
+ III .651 .609 14.41 11.57 22.46 8.62
+ ±.11 ±.10 ±5.22 ±2.55 ±3.69 ±1.81
+
+ IV .316 .569 12.17 2.43 3.16 0.76
+ ±.11 ±.09 ±2.41 ±1.78 ±1.70 ±1.26
+
+ V .773 .891 -0.74 -4.17 2.58 1.77
+ ±.06 ±.03 ±1.72 ±1.20 ±1.22 ±0.85
+
+ VI .420 .661 5.79 0.90 0.77 0.87
+ ±.15 ±.09 ±2.33 ±1.53 ±1.65 ±1.09
+
+ VII .862 .799 5.54 0.92 11.00 8.31
+ ±.05 ±.07 ±2.88 ±2.54 ±2.03 ±1.80
+
+ VIII .775 .722 4.00 4.43 3.94 2.41
+ ±.08 ±.09 ±1.90 ±2.64 ±1.92 ±1.87
+
+ Total .529 .609 6.80 2.86 2.12 0.06
+ ±.05 ±.04 ±1.16 ±0.30 ±0.82 ±0.67
+
+The changes in rates of progress are expressed in summaries by subject
+matter in Tables 9, 10, and 11. Approach of Arithmetic Quotient to
+Intelligence Quotient is measured in Table 9 by:
+
+1. Comparison of _r_ in June with _r_ in November.
+
+2. Comparison of M_{IQ}-M_{AQ} in June and M_{IQ}-M_{AQ} in November.
+
+3. Comparison of S.D.’s of Arithmetic and Intelligence Quotients in June
+and November.
+
+The P.E.’s of each of these differences were obtained by
+
+ P.E._{diff}² = P.E.₁² + P.E.₂² - 2 _r_₁₂ P.E.₁ P.E.₂
+
+The only M_{IQ}-M_{SQ} in Table 9 which does not show a decrease at
+least two times as large as the P.E. of either of the elements involved,
+is the 8th grade; and this is due to the limits of the test used. As
+mentioned before, the 8th grade did not register its true abilities in
+June since a perfect, or nearly perfect, score in the test was too easy
+to obtain. The small arithmetic S.D.’s in Grade 8 and consequent great
+S.D._{IQ}-S.D._{SQ} is due to the same cause.
+
+Tables 10 and 11 present the summary of facts with regard to Thorndike
+Reading Quotients, the first and second years respectively.
+
+
+THE RATIOS
+
+The discussion which follows concerns _Ratios_, not _Quotients_.
+
+
+TABLE 12
+
+INTELLIGENCE QUOTIENTS AND SUBJECT RATIOS FOR ALL PERIODS GROUPED BY
+CHILD. THE ORDER OF ENTRIES IS JUST AS IN TABLE 1
+
+GRADE III
+
+ Intelligence Arithmetic Vocabulary Reading Completion
+ Quotient Ratio Ratio Ratio Ratio
+
+ _a_
+ 101 _b_
+ _c_ 63 57 43
+ _d_ 105 87 92
+
+ _a_
+ 128 _b_
+ _c_ 62 80 63
+ _d_ 119 97 120
+
+ _a_
+ 116 _b_
+ _c_ 48 78 * 42
+ _d_ 81 82 66 77
+
+ _a_
+ 87 _b_
+ _c_ 103 46 40 62
+ _d_ 83 85 70 60
+
+ _a_
+ 112 _b_
+ _c_ 80 122 119 100
+ _d_ 100 101 108 117
+
+ _a_
+ 101 _b_
+ _c_ 84 93 37 55
+ _d_ 90 110 98 92
+
+ _a_
+ 90 _b_
+ _c_ 76 58 72 89
+ _d_ 68 121 77 102
+
+ _a_
+ 105 _b_
+ _c_ 60 43 * 57
+ _d_ 104 95 83 66
+
+The remainder of this table is filed in Teachers College Library,
+Columbia University.
+
+
+TABLE 13
+
+ Nov., 1918 June, 1919 Nov., 1919 June, 1920
+
+ MEANS
+
+ Arithmetic Ratio 89.02 97.16
+ ±1.05 ±1.07
+
+ Vocabulary Ratio 98.96 111.44 106.20 107.61
+ ±1.48 ±1.61 ±0.90 ±0.93
+
+ Reading Ratio 96.47 101.96 98.98 100.60
+ ±1.19 ±1.18 ±1.03 ±0.97
+
+ Completion Ratio 99.76 101.83 101.67 103.10
+ ±1.11 ±1.23 ±0.93 ±0.85
+
+ STANDARD DEVIATIONS
+
+ Arithmetic Ratio 12.03 12.53
+ ±0.74 ±0.76
+
+ Vocabulary Ratio 15.71 16.58 10.34 10.84
+ ±1.05 ±1.14 ±0.64 ±0.66
+
+ Reading Ratio 12.63 12.14 11.82 11.36
+ ±0.84 ±0.84 ±0.73 ±0.69
+
+ Completion Ratio 12.34 12.63 10.85 9.90
+ ±0.82 ±0.87 ±0.67 ±0.60
+
+ CORRELATIONS OF RATIOS
+
+ Arithmetic and Vocabulary .60 .30
+ ±.06 ±.08
+
+ Arithmetic and Reading .70 .64
+ ±.04 ±.05
+
+ Arithmetic and Completion .48 .61
+ ±.07 ±.05
+
+ Vocabulary and Reading .34 .32 .57 .47
+ ±.08 ±.09 ±.06 ±.07
+
+ Vocabulary and Completion .45 .36 .53 .54
+ ±.07 ±.08 ±.06 ±.06
+
+ Reading and Completion .61 .65 .67 .67
+ ±.06 ±.06 ±.05 ±.05
+
+In Table 12 are presented the Subject Ratios in the same order as the
+Quotients appear in Table 1.[15] There plainly is a rapid rise of SQ⁄IQ
+from period to period, excluding all pupils who did not take all tests
+and excluding Grade III; which includes all children taking all tests who
+were in school in June, 1920, and were Grade IV and above in November,
+1918. The average AccR is 98.24 in November, 1918, and 102.78 in June,
+1920. The average IQ for these children is 105.22. The S.D_{AccR₁₉₁₈} is
+11.17; the S.D._{AccR₁₉₂₀} is 9.09; the S.D._{IQ} is 19.24. It is obvious
+that the average amount of product per intelligence has increased, that
+the range of AccR’s has decreased (which means that factors causing
+disparities, other than intelligence, have been removed), and that the
+S.D. of the AccR’s is about one half the S.D. of the IQ’s. M’s are about
+equal so it is not necessary to use coefficients of variability. The
+variability of children, intelligence aside, is only one half what the
+variability is otherwise. The correlations when IQ = _X_, AccR₁₉₁₈ = _Y_
+and AccR₁₉₂₀ = _S_ and when AccR = average of Vocabulary, Reading and
+Completion Ratios, are:[16]
+
+ _r__{X.Y.} = -.602
+ _r__{X.S.} = -.493
+ _r__{Y.S.} = +.549
+
+The remaining disparity is then due to something which is in negative
+correlation with intelligence.
+
+The number of cases here is only 48.
+
+The P.E.’s are then as follows:
+
+ P.E._{M} P.E._{S.D.}
+ _X_ 1.91 1.35
+ _Y_ 1.11 0.79
+ _S_ 0.90 0.64
+ P.E._r__{X.Y.} = .06
+ P.E._r__{X.S.} = .08
+ P.E._r__{Y.S.} = .07
+
+The differences between the M’s and between the S.D.’s of our 1918 and
+our 1920 AccQ’s; namely, 102.78 - 98.24 = 4.54 and 11.17 - 9.09 = 2.08,
+have formed a step in the argument. We must have the P.E.’s of these
+amounts in order to establish the reliability of the quantitative indices
+we employ:
+
+ P.E._{diff} = √P.E._{X}² + P.E._{Y}² - 2 _r__{XY} P.E._{X} P.E._{Y}
+
+ P.E._{M₂₀-M₁₈} = 0.94
+
+ P.E._{S.D.₁₈-S.D.₂₀} = 0.47
+
+These differences are then reliable. If the same data were accumulated
+again in the same way with only 48 cases, the chances are even that the
+4.54 would be between 3.50 and 5.48 and the 2.08 between 1.61 and 2.55.
+That there would be positive differences is practically certain, since
+the difference between the means is over four times as large as its P.E.,
+and the difference between the S.D.’s over four times as large as its P.E.
+
+To make still more certain this observation of positive amount in M of
+second testing minus M of first testing and in S.D. of first testing
+minus S.D. of second testing (AccR), which means an increase in central
+tendency of AccR’s and a decrease in spread of AccR’s under special
+treatment, we have listed in Table 13 the means and standard deviations
+of Subject Ratios of each test for each period and the intercorrelations
+of these Subject Ratios. These do not include exactly the same children
+in each period but are inclusive of all grades for all periods. They
+are a measurement of increased efficiency of the school as a whole,
+rather than of any one group of children; though, of course, the bulk
+of the children have representation in each of these indices. Too much
+continuity is not to be expected from June, 1919, to November, 1919, as
+the children are different. Comparison should always be from November to
+June.
+
+These tables bear out the fact presented by AccR. It is clear that
+there is a marked development in the S.R.’s, both by increase of M.
+and decrease of S.D. The decrease of correlation between S.R.’s is not
+so marked, but neither is the negative correlation between AccR and
+IQ much less in June, 1920, than in November, 1918. The association
+of achievements in terms of intelligence is very probably due to
+mistreatment, since it is in negative correlation with IQ, as a general
+inherited ethical factor could not be.
+
+We will note that the Arithmetic Ratios are in as high positive
+association with the Reading Ratios as the Vocabulary Ratios are with the
+Reading Ratios. This makes it highly improbable that the intercorrelation
+of these remnants is due, to any large extent, to common elements in
+the test or to specific abilities. The common interassociation of all
+Ratios seems to point to the operation of some common factor other than
+intelligence as a determinant of disparity in school progress. It would
+be easy to identify this as the part of Burt’s “General Educational
+Factor” which is not intelligence—that is, industry, general perseverance
+and initiative—were it not for the fact that this same influence _stands
+in negative association to intelligence_. It is our belief that it is the
+influence of a maladjusted system of curricula and methods which accounts
+for these rather high interassociations of achievements, irrespective of
+intelligence.
+
+
+SUMMARY
+
+The association of abilities in arithmetic, reading, and completion with
+intelligence is markedly raised by special treatment. Disparities of
+educational product are therefore to a great extent due to intelligence.
+(Tables 2, 3, 5, 7, 8, 9, 10 and 11.)
+
+The remnants (intelligence being rendered constant by division of each
+SQ by IQ) intercorrelate about .5. If there were specialized inherited
+abilities, these intercorrelations would not all be positive nor would
+they be as uniform. (Tables 6 and 13.)
+
+The averages of these remnants, for reading, vocabulary, and completion,
+correlate -.61 in 1918 and -.49 in 1920 with IQ. These remnants are in
+negative association to intelligence. If the intercorrelations of these
+remnants were due to a “General Factor,” this correlation would not be
+negative.
+
+Therefore intelligence is far and away the most important determinant of
+individual differences in product.
+
+As part of the relation between tests, irrespective of intelligence, is
+due to common elements in the tests, this reasoning becomes still more
+probable.
+
+General factor in education, as distinct from intelligence, has not
+been separated here from inherited bases of ambition, concentration,
+and industry. It seems out of our province to conjure up some inherited
+complex of abilities other than intelligence, specialized inherited
+abilities, or proclivities and interests tending to thorough prosecution
+of school work. I have therefore meant this last by the general factor.
+
+McCall has correlations varying continually in size from -.63 to +.98
+between various measurements of a group of 6B children.[17] The abilities
+involved were not pushed as are those considered here. Some of the low
+correlations are no doubt indications of low association because of the
+way children _are_, not the way they _might be_ by heritage; still
+others, such as handwriting and cancellation (unless bright children
+do badly in cancellation tests because they are _more bored_ than the
+others), are correlated low or negatively with intelligence when the
+correlation is at its maximum. Such results as those of McCall serve as a
+guide not to argue about other tests by analogy. It is necessary to find
+which traits and abilities can be pushed to unity in their relation to
+intelligence and which, like handwriting, are practically unrelated to
+general mental power.
+
+It is well to know about music tests and such tests as Stenquist’s
+mechanical ability test _when the correlation with intelligence is
+pushed_, before we decide whether the quality measured is a manifestation
+of specific talent or general intelligence.
+
+Cyril Burt obtained data much like that presented here except that
+instead of getting rid of the influence of intelligence and finding
+determinants for the remnants of disparity, he built up a hierarchy of
+coefficients as they would be if they were due entirely to a common
+factor and compared these with his obtained _r_’s. I will present his
+conclusions with regard to a general factor which are in substantial
+though not complete agreement with those advanced here.
+
+ “Evidence of a Single Common Factor.
+
+ “The correlations thus established between the several school
+ subjects may legitimately be attributed to the presence of
+ common factors. Thus, the fact that the test of Arithmetic
+ (Problems) correlates highly with the test of Arithmetic
+ (Rules) is most naturally explained by assuming that the same
+ ability is common to both subjects; similarly, the correlation
+ of Composition with Arithmetic (Problems) may be regarded as
+ evidence of a common factor underlying this second pair; and
+ so with each of the seventy-eight pairs. But is the common
+ factor one and the same in each case? Or have we to recognise a
+ multiplicity of common factors, each limited to small groups of
+ school subjects?
+
+ “To answer this question a simple criterion may be devised.
+ It is a matter of simple arithmetic to reconstruct a table
+ of seventy-eight coefficients so calculated that all the
+ correlations are due to one factor and one only, common to
+ all subjects, but shared by each in different degrees. Such
+ a theoretical construction is given in Table XIX. In this
+ table theoretical values have been calculated so as to give
+ the best possible fit to the values actually obtained in the
+ investigation, and printed in Table XVIII. It will be seen that
+ the theoretical coefficients exhibit a very characteristic
+ arrangement. The values diminish progressively from above
+ downwards and from right to left. Such an arrangement is termed
+ a ‘hierarchy.’ Its presence forms a rough and useful criterion
+ of the presence of a single general factor.
+
+ “On turning to the values originally obtained (Table XVIII.)
+ it will be seen that they do, to some extent, conform to this
+ criterion. In certain cases, however, the correlations are far
+ too high—for instance, those between Arithmetic (Rules) and
+ Arithmetic (Problems), and again Drawing and both Handwork and
+ Writing (Quality). Now these instances are precisely those
+ where we might anticipate special factors—general arithmetical
+ ability, general manual dexterity—operating over and above
+ the universal factor common to all subjects. These apparent
+ exceptions, therefore, are not inconsistent with the general
+ rule. Since, then, the chief deviations from the hierarchical
+ arrangement occur precisely where, on other grounds, we
+ should expect them to occur, we may accordingly conclude that
+ performances in all the subjects tested appear to be determined
+ in varying degrees by a single common factor.
+
+ “Nature of the Common Factor.
+
+ “What, then, is this common factor? The most obvious
+ suggestions are that it is either (1) General Educational
+ Ability or (2) General Intelligence. For both these qualities,
+ marks have been allotted by teachers, quite independently of
+ the results of the tests. The correlations of these marks with
+ performances in the tests are given in the last two lines of
+ Table XVIII.
+
+ “Upon certain assumptions, the correlation of each test with
+ the Hypothetical Common Factor can readily be deduced from the
+ coefficients originally observed. These estimates are given in
+ the last line but two of the table. They agree more closely
+ with the observed correlations for General Educational Ability,
+ especially if the latter are first corrected for unreliability.
+ (Correlations: Hypothetical General Factor coefficients and
+ General Educational Ability coefficients .86; after correction
+ .84. Hypothetical General Factor coefficients and General
+ Intelligence coefficients .84; after correction .77.) We may,
+ therefore, identify this hypothetical general factor with
+ General Educational Ability, and conclude provisionally that
+ this capacity more or less determines prowess in all school
+ subjects.
+
+ “The high agreement of the estimated coefficients with the
+ intelligence correlations suggest that General Intelligence is
+ an important, though not the only factor in General Educational
+ Ability. Other important factors are probably long-distance
+ memory, interest and industry. It is doubtless not a pure
+ intellectual capacity; and, though single, is not simple, but
+ complex.”[18]
+
+
+
+
+PART III
+
+THE PSYCHOLOGICAL CONCLUSIONS OF THE EXPERIMENT
+
+
+THE NEGLECT OF GENIUS
+
+Schools of to-day are organized and administered so as to yield less
+chance to a child to obtain as much information as is possible for him
+to have in direct proportion to his mental ability. The correlation
+between accomplishment and intelligence (using AccR, the average of
+Reading, Vocabulary, and Completion Ratios with IQ) was -.61 in November,
+1918, and -.49 in June, 1920, in the Garden City public school. The
+regrading and special promotion work from November, 1918, to June,
+1920, reduced the handicap of brightness, but could not obliterate the
+sparsity of returns per increment of capacity in the upper reaches of the
+intelligence. Further, work along this same line done by A. J. Hamilton
+in the Washington School, Berkeley, California, indicates that this was
+not a peculiarity of the school at Garden City.
+
+The wide range of abilities which we know exists in pupils of any one age
+makes it impossible to adjust our formal education to the extremes. Much
+adjustment has been made in favor of the lower extreme, but little has
+been done for our genius. Of course the work with extreme subnormals is
+conceived and prosecuted more in the sense of clearing them away for the
+good of those remaining than of fitting education to their own needs. We
+are neglecting, however, our duty to those whom nature has endowed with
+the essentials of leadership. They do not interfere quite as much with
+ordinary classroom procedure, but they are greater social assets and need
+special treatment to develop _them_ rather than to let others develop
+better.
+
+Neither of the extreme groups is certain of getting the normal stamina
+necessary for good citizenship. Neither group forms good habits of
+study nor accumulates such information as it might. Being aware of this
+discrepancy between the gift and the recipient, we have made our lessons
+easier and we have segregated the lower percentile. There is much more
+to be done. We must adapt education to at least five varying classes
+in order to reduce the spread within each to a commodious span. But the
+genius is the most important and should have the greatest claim to our
+immediate attention.
+
+First, our social needs demand special attention for the genius in
+order that we may better exploit our best nervous resources. Second,
+our educational needs demand it since the very bright as well as the
+very stupid disrupt calm and cogent classroom procedure. Third, they
+themselves demand it in order that they may, even when they do function
+as leaders, be happier in that function, since now they often lose much
+in social contact by peculiarities which prevent an integration of their
+“drives” into a harmonious economy of tendency. These peculiarities come
+from their continuous maladjustment, since when they are with children
+of their own mental maturity they are physically and physiologically
+handicapped; when they are with children of their own size and muscular
+equipment they are so far mentally superior that they are unhappily
+adjusted. Only classification on a large scale will allow sufficient
+numbers of them to congregate to correct this.
+
+I am reminded of a boy ten years old whose IQ on the Terman test was 172.
+He defined a nerve as the “conduction center of sensation” and, when
+asked to explain, did so in terms of sensation of heat and motive to
+withdraw. He explained the difference between misery and poverty thus:
+“Misery is a lack of the things we want; poverty is a lack of the things
+we need.” How can we expect a boy like this to grow into a normal citizen
+if we do not provide the companionship of peers in mentality and in
+physique?
+
+Fourth, our eugenic needs demand it, since we are not conserving this,
+our chiefest asset, genius. Unless we conserve better these rare
+products, the standard deviation of the intelligence of humanity will
+keep shrinking as we select against imbeciles and against genius as well.
+The waste of a genius who becomes an intellectual dilettante, as many now
+in fact do, is double. We lose what he might do for society; he does not
+marry and we lose the potentiality of his highly endowed germ-plasm.
+
+And they do become dilettantes when special treatment is not given. I
+know of a young man who was first of his high-school class, who got all
+A’s his first year in College (at Wisconsin), and all A’s his second year
+(at Harvard); and then he began to read all manner of literature with
+no schema of expression, no vocation, because, as he said, all college
+courses are so stupidly easy. He attended no lectures and read none of
+the books in one course, and then two days before the examination he was
+taunted with not being able to pass this course. He spent two nights
+and two days studying, and he received B in the course. But now he is a
+failure because he has no organized, purposive schema of expression; he
+was always in classes with people less fortunately endowed than he, and
+so he never had a chance.
+
+On these four counts then we must segregate our genius: (1) Social
+exploitation of our resources. (2) Educational procedure for the sake of
+other children as well as for them. (3) Happiness for them, organization
+of their trends, and formation of social habits. (4) Biologic
+conservation of great positive deviation from average human intelligence.
+
+
+IS GENIUS SPECIALIZED?
+
+This genius is of various kinds, political and business leaders,
+scientists and artists. Have they then the same inherited nervous
+structure with regard to abilities and capacities as distinct from
+interests? We know that they must have something in common, something
+that we call intelligence, power of adaptation. Calling this the nervous
+chemistry, the way the nervous system acts its quality, we must still
+know whether we have also an inherited nervous physics to deal with,
+or a further inherited nervous chemistry which predisposes to specific
+ability. Are there inherited capacities or predispositions to ability? We
+are in a position to answer this question with regard to the elementary
+school subjects, and are tempted here into a more general discussion of
+the matter in hand.
+
+The need to clarify our view on what is inherited and what is due to
+environment can be clearly envisaged in terms of our teachers. Whatever
+psychologists may mean by “predisposition to ability” it is quite certain
+that teachers make no distinction between this and the inheritance
+of a capacity. They feel that some children figure better than they
+read, and others read better than they figure, “by nature,” and there
+their obligation ends. If it is a grave matter that we shoulder the
+burden of bringing a child to his optimum achievement, then it is an
+immediate duty that we find how much of the failure to produce product
+of one kind or another is due to unremovable factors, and how much is
+due to our inadequacy. So, too, we have much loose discussion about
+finding out what children can do and want to do in the way of vocational
+diagnosis,—loose because it assumes that children are born with definite
+vocational capacities. Certainly we can do much more in the way of
+development and much more in the way of preparation for social needs if
+we know just how much “predisposition to ability” means. The teacher
+interprets it to mean about what was meant by the turtle that held up
+Atlas who held up the world. She makes no real distinction between
+predisposition to ability and specific ability, just as there was no real
+causal distinction between the turtle and Atlas. She then gets at her
+conception of intelligence additively,—a summation of school abilities.
+
+The correlation of teachers’ judgment of “power of adaptation,” carefully
+explained, and marks given six months previously by the same teachers
+was .82. The correlation of this same average judgment with the average
+of thirteen intelligence tests was only .58. These teachers obviously
+reached their conclusions of the intelligence of a child in the same
+way as they reached their conclusions of what marks he earned in their
+subjects.
+
+The unit characteristics which make up what we describe in terms of gross
+behavior as intelligence must of course be many. No one denies that
+if we knew just what these units were we could describe two possible
+manifestations of what we now call intelligence, of which one person
+could do one only and another person could do the other only because of
+the particular combinations of the units inherited. This would constitute
+inheritance of predisposition to special capacities. But it is not the
+same to assume that the vocations and aptitudes desirable in a world such
+as ours have specialized inherited bases. It is far more probable that
+substantially the same inherited characteristics are necessary to success
+in all the gross cross-sections of behavior which we call vocations and
+abilities.
+
+As the unit characteristics are certainly not so closely allied to our
+social needs as “mechanical intelligence” and “social intelligence” or
+even “rote memory for numbers,” we may not even distinguish presence
+of any five hundred elements from presence of any other five hundred
+elements in terms of what we now measure as intelligence. It is just as
+likely that all the elements of intelligence are necessary for every
+vocation and that all contribute to success of any one kind as it is
+likely that some are necessary for one vocation and others for another.
+
+This is a question of more or less. I believe that the amount to which
+a person’s specific talents, his vocation as distinct from his general
+power, are shaped by the combinations of elements which make up his
+inheritance, is much less than believed by Francis Galton, who says:
+“There cannot then remain a doubt but that the peculiar type of ability
+that is necessary to a judge is often transmitted by descent.” And again:
+“In other words, the combination of high intellectual gifts, tact in
+dealing with men, power of expression in debate, and ability to endure
+exceedingly hard work, is hereditary.”[19]
+
+I believe that the amount of influence which inheritance has upon the
+_kind_ of thing a man does in life has been overestimated; that the
+inherited factors influence more the _way_ in which he shall do whatever
+the environment influences him to do. This leaves plenty of play for the
+close correlation between parents and children in both intelligence and
+vocation. The former is the result of inheritance, the latter is the
+result of environment. All competent psychologists would agree to-day to
+less specific inheritance than a basis, for instance, for the distinction
+in vocation of minister and orator; and more specific inheritance than
+for such a statement as “We inherit how well we will do, we learn what we
+will do.” There would be substantial agreement to the statement that the
+inherited nervous bases of a very intelligent plumber are more like those
+of a very intelligent statesman than like those of a stupid plumber. This
+question is, _how much_ inheritance we can conceive of as being made
+up of neuro-chemical elements determining us to do one kind of a thing
+rather than another.
+
+Interpretation statistically of one thousand possible elements, simply
+viewed as present or absent, and again simply viewed only as combinations
+and not permutations, would mean that the less the intelligence the
+more specific the inheritance. The most intelligent man alive could, by
+what he is born with, do anything since he has all of the one thousand
+factors, all of which help him in the prosecution of any venture. But
+the fewer elements he has the less well he does most things, and when
+lacking certain elements he has lost the capacity to do some things more
+completely than others. (I have neglected physiological characteristics
+necessary to an ability. A deaf man certainly is handicapped in music.
+I speak of _possible_ mental capacities.) Such a view leaves scope for
+some degree of special abilities. It accounts for the idiot-savants, it
+accounts for the cases where genius is diverse as well as where it is
+not though it would demand that specialized genius be very rare and that
+inherited specialization be much rarer in the upper than in the lower
+reaches of intelligence. It allows for such cases as Galileo, whose
+father was a composer, as well as the cases cited by Galton. Heredity
+need not imply the same kind of genius though it does suggest it, whereas
+the environment backs up this inherited implication. We further can here
+absolutely resent an inheritance of such things as ability in the common
+school subjects without being involved in a view to deny the inheritance
+of a predisposition to mechanical rather than musical successes.
+
+Observation of brilliant children would corroborate this view. They can
+do anything. Observation of the mentally deficient is equally encouraging
+to this view. It has always been puzzling that they seem to do a few
+things much better than others. According to this conception there
+would be a negative correlation between intelligence and specialized
+inheritance.
+
+We will then consider each inherited element, not as music or as science,
+but rather as an element of intelligence which will help in all lines of
+work, but which may be a little more necessary for some than others. This
+is a predisposition in a true sense. If a man had only one element out
+of one thousand, he could do only a few things. If he had all thousand
+he could do everything. Inheritance of ability is not in terms of units
+valuable to us socially, but only in terms of undefined nervous elements;
+and we may conceive of specialization, and still hold that there be less,
+the more intelligent a man is.
+
+To make the matter still more concrete, imagine two men each of whom have
+900 of the hypothetical 1000 elements, this being a value of +3 S.D. from
+the mean intelligence of the human race. One is a composer, the other
+financier. According to this view the greatest number of their inherited
+bases on which they could differ would be 100 of the 900 elements. The
+other 800 must be alike. Assuming that all of the elements contribute
+to all of the activities, but that some of them are more essential to
+some activities than to others, we could in this case say that the 100
+which are different decided in some measure the vocation of each man.
+But it is much more probable that they overlap in 850 and that each has
+only 50 distinct elements, and further that the 50 which are distinct in
+each would not all be such as to influence one kind of ability rather
+than another. Then these two men, had they interchanged environments,
+would probably have interchanged vocations in that transaction. For the
+purposes of this discussion we treat physiological inherited features
+(such as hearing), as environment, as we are considering the mental
+capacity of composer as distinct from the necessary conditions to its
+development. According to this view, then, we account easily for the
+versatility of genius, which is so apparent in such accounts as Terman’s
+_The Intelligence of School Children_.[20] Also, though very infrequent,
+we account for the genius who could not have done other things as well as
+those he did.
+
+Let us consider the case of negative deviates, say 3 S.D. from the
+mean intelligence of the human race. Two men each have 100 of the 1000
+hypothetical elements. It is much more probable here than not, that an
+appreciable amount of the 100 elements would be distinct in each person,
+though it is improbable that they would often be such as to form the
+basis of an “ability.” This then would account for specific abilities
+amongst morons and also for the presence but rarety of idiot-savants.
+Also since there are a limited number of such combinations possible and
+since many overlap for all practical purposes, we would account for
+the common likenesses as well as the relatively more uncommon extreme
+differences. This view is consistent with an examination of the data of
+this thesis which are contrary to the common belief in special abilities
+or to a view of inheritance of units which are actually the goals of
+education and the uses of a civilization too recent to leave its imprint
+on inheritance. We found no unremovable predispositions to one school
+subject more than to the others in any of the children. We would thus
+argue that such predispositions as to mathematics or to oratory are
+extremely rare and cannot be used as rules by which to interpret human
+nature.
+
+Woodworth says in a criticism of McDougall’s view of instincts: “What
+he here overlooks is the fact of native capacities or rather, the fact
+that each native capacity is at the same time a drive towards the sort
+of activity in question. The native capacity for mathematics is, at the
+same time, an interest in things mathematical and in dealing with such
+things. This is clearly true in individuals gifted with a great capacity
+for mathematics.”[21]
+
+I do not wish to become involved here in a discussion of the original
+nature of man on the instinctive side. I wish merely to rebel at
+the assumption of specific inheritance of abilities that are really
+sociological units. Mathematics is an ability which is useful to us,
+which we have come to encourage in education. But it is a man-made unit.
+There is no reason to believe that the inherited components of mentality
+are in any direct way related to such talents as mathematics or music.
+The units may vaguely predispose, but the units are not mathematics and
+music. We may say that the inherited physical and chemical units of
+the nervous system may be so distributed as to predispose one man to
+mathematics, and another to music, but we must not argue for inherited
+interests as correlates. The evidence is all that the inherited nervous
+chemistry of the individual is what on the side of behavior, we define
+as intelligence—power of adaptation. We may logically fall back on the
+inheritance of predisposition to ability, meaning thereby the inheritance
+of such nervous qualities as will better fit the individual to cope
+with mathematical than with musical situations; but if we adopt this
+cautious ground in disputation we cannot argue in another matter for
+an inherited interest in mathematics, innate because of the inborn
+mathematical talent. If the inherited qualities merely predispose they
+merely delimit; just as a man born without arms would probably not become
+a great baseball player, nor a deaf man a great musician, nor a man with
+poor motor control a skilled mechanic—so we are predisposed nervously
+for capacities. Hence can we argue that the inborn root of the interest
+is the capacity? Is it not safer to assume that interests in success,
+approval of fellowmen and general mental activity led to the development
+of the capacity by virtue of a favorable environment, and led by the same
+environment to interests centered about its activity?
+
+It is far from my intention to say that inheritance is not as specific
+nervously as it is in matters of blood pressure and texture of skin.
+As we, in our limited knowledge, still define abilities in terms
+of behaviour and not by nervous elements, my contention is that
+intelligence should be regarded as the sum total of this inheritance,
+much as general strength is, in terms of the body. We have still to
+find the component units of this intelligence. We can then define
+predisposition to ability. To split intelligence into inherited units of
+mathematics, reading, composition, mechanics, etc., is as unjustifiable
+as to split inherited vigor of body into baseball capacity, running
+capacity, climbing capacity, etc. Mathematics and music are what we do
+with intelligence, not what intelligence is made of. Of course everyone
+agrees to this. The lack of emphasis upon the chance that the inherited
+units are general in their application, that the same inherited elements
+are involved in many of the behavior complexes which we call traits and
+abilities, is what confuses the situation.
+
+
+CURRENT PSYCHOLOGICAL OPINION
+
+We must know what these elements are, and how many contribute to which
+capacities. Then we can decide the question of specialized inheritance.
+In all crude behavior data it is impossible to separate the influence of
+nature and nurture. A theory of specialized inheritance will inevitably
+infringe upon common sense in its claims. Of the following statements, it
+would be easier for most of us to endorse 1 and 2 than 3 and 4, whereas
+few would agree with 5 and 6.
+
+1. “Unless one is a blind devotee to the irrepressibility and
+unmodifiability of original nature, one cannot be contented with
+the hypothesis that a boy’s conscientiousness or self-consciousness
+is absolutely uninfluenced by the family training given to him. Of
+intelligence in the sense of ability to get knowledge rather than
+amount of knowledge got, this might be maintained. But to prove that
+conscientiousness is irrespective of training is to prove too much.”
+(Thorndike, _Educational Psychology_, III, pp. 242.)
+
+2. “Some attempts have been made to apply these laws to behavior
+complexes, but as yet psychology has provided little foundation for such
+studies. The most thorough-going attempts have been made with human
+mental traits and some evidence has been collected here in favor of the
+view that differences in the instinctive behavior of individuals are
+inherited according to Mendelian ratios. _But in the field of human
+psychology too little is known of the genesis of character, of the
+distinction between nature and acquired behaviour to provide a very firm
+foundation for the work of the geneticist._” (Watson, _Behaviour_, p.
+156. Italics are mine.)
+
+3. “Even, however, when we omit the trades as well as the cases in
+which the fathers were artists, we find a very notable predominance of
+craftsmen in the parentage of painters, to such an extent indeed that
+while craftsmen only constitute 9.2 per cent among the fathers of our
+eminent persons generally, they constitute nearly 35 per cent among the
+fathers of the painters and sculptors. It is difficult to avoid the
+conclusion that there is a real connection between the father’s aptitude
+for craftsmanship and the son’s aptitude for art.
+
+“To suppose that environment adequately accounts for this relationship
+is an inadmissible theory. The association between the craft of builder,
+carpenter, tanner, jeweller, watchmaker, wood-carver, rope-maker,
+etc., and the painter’s art is small at the best and in the most cases
+non-existent.” (Ellis, quoted in Thorndike, _Educational Psychology_,
+III, p. 257.)
+
+4. “—the statesman’s type of ability is largely transmitted or inherited.
+It would be tedious to count the instances in favor. Those to the
+contrary are Disraeli, Sir P. Francis (who was hardly a statesman, but
+rather bitter a controversialist) and Horner. In all the other 35 or 36
+cases in my Appendix, one or more statesmen will be found among their
+eminent relations. In other words, the combination of high intellectual
+gifts, tact in dealing with men, power of expression in debate and
+ability to endure exceedingly hard work, is hereditary.” (Galton,
+_Hereditary Genius_, pp. 103, 104.)
+
+Thorndike comments on this last quotation: “Of course there is, in the
+case of all of Galton’s facts the possibility that home surroundings
+decided the special direction which genius took, that really original
+nature is organized only along broad lines. Moreover, it is difficult to
+see just what in the nervous system could correspond to a specialized
+original capacity, say, to be a judge. Still the latter matter is a
+question of fact, and of the former issue Galton’s studies make him the
+best judge. We should note also that it is precisely in the traits the
+least amenable to environmental influence such as musical ability, that
+the specialization of family resemblance is most marked.”
+
+This cautious and sagacious commentary is in marked contrast to the
+following:
+
+5. “But no training and no external influence can entirely supersede
+the inborn tendencies. They are the product of _inheritance_. Not only
+unusual talents like musical or mathematical or linguistic powers can be
+traced through family histories, but the subtlest shades of temperament,
+character and intelligence can often be recognized as an ancestral gift.”
+(Munsterberg: _Psychology, General and Applied_, p. 230.)
+
+6. “Statistical studies which covered many characteristic opposites like
+industrious and lazy, emotional and cool, resolute and undecided, gay
+and depressed, fickle and constant, cautious and reckless, brilliant
+and stupid, independent and imitative, loquacious and silent, greedy
+and lavish, egoistic and altruistic and so on, have indicated clearly
+the influence of inheritance on every such mental trait.” (Munsterberg,
+_Psychology, General and Applied_, p. 237.)
+
+Undoubtedly Munsterberg here refers to the data accumulated by Heymans
+and Wiersma since they used such opposites as these, and also used what
+might be called statistical methods. Speaking of the same data Thorndike
+says:
+
+“In view of the insecurity of their original data it seems best not to
+enter upon an explanation of their somewhat awkward method of measuring
+the force of heredity, and not to repeat the figures which are got by
+this method. Also they do not attempt to estimate an allowance for the
+influence of similarity in home training, though they state that some
+such allowance must be made.” (_Educational Psychology_, III, p. 262.)
+
+Hollingworth and Poffenberger, commenting on the data of Galton and Ellis
+mentioned in the quotation above, say:
+
+“Francis Galton has made a statistical study of the inheritance of
+_specified_ mental abilities and found that the abilities required
+for success as a judge, statesman, minister, commander, poet, artist,
+and scientific man, are inherited. But the nature of his data makes
+him unable to make exact allowances for influences of training and
+environmental influences. Consequently, his figures might really show
+general intelligence to be inherited and the form of its expression to be
+dependent upon environment.
+
+“Other investigators, among them F. A. Woods and Havelock Ellis, have
+made similar statistical studies and conclude that there is inheritance
+of even such qualities as temper, common sense, and the like, but
+these reports are also subject to the same complicating influence of
+environment.” (_Applied Psychology_, p. 43.)
+
+It can readily be seen, from these quotations, that there is fundamental
+disagreement among psychologists with regard to the inheritance
+of specific ability,—fundamental disagreement in three ways: (1)
+Interpretation of Galton’s and Ellis’s data. (2) Opinion on the matter.
+(3) Degree of precision possible in giving judgment.
+
+We have noted that it is very difficult to understand what the neural
+bases for such special abilities as Galton speaks of could be; that
+they are social, not neural or psychological units. A view of a large
+number of inherited elements all of which contribute to what we call
+general intelligence and each of which is slightly more necessary to
+some vocation than others, would account for all the observed facts, is
+neurally imaginable, and does not need to view ability to be a “judge”
+or “artistic talents” as biological entities. It further explains the
+differences in their limited abilities of mentally deficient children.
+
+Burt says in this connection: “Among children of special (M.D.) schools,
+the evidence for a general factor underlying educational abilities and
+disabilities of every kind is not so clear. In administrative practice,
+‘mental deficiency’ implies among different children deficiencies in
+very different capacities, both general and specific.” (Cyril Burt: _The
+Distribution and Relation of Educational Abilities_, p. 83.)
+
+For these reasons it is justifiable to attempt to present evidence
+of the inheritance of school abilities with a view to showing that
+school abilities are not dependent upon special inherited aptitudes,
+as teachers so often assume, but that general intelligence is the only
+inherited cause of disparity in product. Investigations where the
+correlation between educational product and intelligence, irrespective
+of chronological age, was less than around .75, used data where many
+removable causes were not removed, and consequently measured results of
+the environment as well as heredity. A case such as this follows:
+
+“The influence of inheritance upon a _very specific_ mental quality,
+namely, spelling ability, has been tested experimentally, although here
+there is some difficulty in separating the influence of heredity from
+that of environment. Earle studied the spelling ability of 180 pairs
+of brothers and sisters who had uniform school training and found a
+correlation of .50. This means that if one child deviated by a certain
+amount from the average child in spelling ability, his brother or sister
+would deviate from the average child just half as much; that is, he
+would resemble his brother or sister to that extent.” (Hollingworth and
+Poffenberger: _Applied Psychology_, p. 44.)
+
+The data presented in this thesis indicate that that correlation could
+have been pushed as high as the _r_ between the intelligence of the
+pairs of brothers. In other words, a child could be made to resemble
+his brother as nearly in spelling ability as he did in intelligence.
+All disparity could be reduced to that of general intelligence. Then
+intelligence alone is inherited as far as the data here presented have
+any bearing on the matter in hand. The influence of environment is in
+this case a matter of no consequence, since the subjects all had the same
+schooling, and home influence does not as a rule teach children to spell;
+but the data are not irrespective of the influence of intelligence.
+
+
+INDICATIONS OF THE GARDEN CITY DATA
+
+Table 3 presents intercorrelations between IQ and quotients in the
+various subjects. The correlations are in each instance irrespective
+of chronological age since all quantitative indices are expressed as
+quotients. We have seen that they go up from September, 1918, to June,
+1920. Every possible means was used to push these correlations to their
+limit, to remove all removable factors. We have seen that the data show
+here, as in Tables 7 and 8, that there is little association between
+traits which is not a result of differences in intelligence. Table 3
+shows the same 48 children throughout. The _r_’s are not corrected
+for attenuation. Though the _r_’s are high throughout and go higher
+under special treatment, the association can still be more accurately
+registered by some attention to relation of the means and the S.D.’s. Two
+traits to be identical must have _r_ = 1.00 S.D._{_x_} = S.D._{_y_} and
+M_{_x_} = M_{_y_}. We have seen that the _r_ increases, M-M decreases and
+S.D.-S.D. regardless of sign decreases. (Tables 9, 10 and 11.)
+
+But as the S.D.’s of the Subject Quotients (though they do approach S.D.
+of IQ) sometimes go below the S.D. of IQ, we must know why. It is because
+the low IQ’s do better per their intelligence than the high IQ’s. We have
+seen above that the correlation between IQ and average of the Vocabulary,
+Reading, and Completion Subject Ratios is -.61 in November, 1918, and
+-.49 in June, 1920.
+
+Then the ratio of achievement to intelligence is in definite relation
+to intelligence—a negative relation. It is this same tendency to adapt
+our education to a low level which has prevented a perfect association
+between intelligence and the various subjects. The relation of one
+subject to another, irrespective of intelligence, would be zero if there
+were no other factors except intelligence responsible for the product.
+After two years of such attempts as an ordinary public school will
+allow, we have removed many of the causes of disparity and increased
+the association between potential progress and progress in arithmetic,
+reading and language. The correlations, correspondence of S.D.’s, and
+Σ(IQ-EQ)⁄_n_ registered in Tables 9, 10, and 11 give evidence of this
+as does also the increase in the AccR, an average of the Arithmetic,
+Reading, Vocabulary and Completion Ratios. (Table 13.)
+
+Are the unremoved causes other than intelligence unremovable? These
+causes might be, besides the unreliability of tests and the common
+elements in the tests, the specialized inheritance we have considered,
+ethical qualities of endurance, ambition, initiative and industry or a
+general factor. The correlations between Arithmetic Ratios and Reading
+Ratios and the other intercorrelations of Subject Ratios will yield us
+an index of how much of this remaining disparity is due to specialized
+inheritance. These intercorrelations for all years are embodied in Table
+13. The partial correlations of quotients when intelligence is rendered
+constant will be found in Table 6. These intercorrelations, and the
+partials as well, give an indication of some general factor other than
+intelligence since the _r_’s irrespective of intelligence are uniform and
+all are positive. Only the correlation of arithmetic with vocabulary,
+intelligence being rendered constant, goes to zero. Though this might be
+due in part to common elements in the tests, it is more likely that there
+is another factor in operation. Inheritance of specific abilities could
+not have this uniform effect on the correlations.
+
+These correlations all being positive and the _r_’s being very uniform,
+both correlation of ratios and the partials, makes the interpretation of
+specialized inheritance of ability extremely unlikely. The correlation
+of Arithmetic Ratios with Reading Ratios is higher in 1920 than that of
+Vocabulary Ratios with Reading Ratios. It leaves the possibility that
+the unremoved factors are inherited ethical differences or that they
+are a “general educational factor.” The negative correlation of AccR
+with intelligence, however, being as high as these positive remnants of
+interrelation, would tend to make more probable an interpretation of this
+as a remnant of disparity, intelligence accounted for, which is entirely
+due to the organization of our schools.
+
+All disparity not due to intelligence was worked on as far as it was
+possible. Thereupon the association of intelligence and educational
+product increased markedly and the negative association of intelligence
+with achievement in terms of intelligence decreased somewhat. However,
+some association of abilities not due to intelligence remains. Exactly
+as much negative association of achievement in terms of intelligence,
+with intelligence, remains. So, when some of the disparities due to the
+environment have been removed and therefore the correlation of Arithmetic
+Ratio with Vocabulary Ratio and Reading Ratio has been decreased, the
+causes which contributed to a correlation such as lack of interest having
+been removed, there still remains some relation of school qualities.
+But there also still remains a negative association between this
+accomplishment and intelligence which means that we still have a remnant
+of such removable influence as is due to badly adjusted curricula.
+
+This enables us to interpret our partials. The partials are not nearer
+zero because although we have partialed out the effect of intelligence,
+we have not partialed out the factor which controls the negative relation
+to intelligence of these very partial resultants, since that is the
+effect of the methods and curricula. Though we did advance bright pupils
+and give them more chance, we have not given them a chance proportionate
+to the stupid children. And that is true since we often wanted to advance
+pupils and were not allowed to; whereas we were never allowed to demote
+pupils except in particular subject matter. The stupid children were
+always at the frontier of their intelligence at the educational cost of
+the others.
+
+It is this remnant which has usually been interpreted as “general factor”
+or as inherited factors basic to initiative, ambition, and industry.
+The fact of importance is that these remnants, these marks of children
+independent of their intelligence, are associated negatively with
+intelligence to the same degree that they are associated positively to
+each other. Unless we wish to assume that the “general factor” or the
+inherited bases of initiative and industry are associated negatively
+with intelligence we must account for the remnant in some other way. It
+seems far more reasonable to attribute this remaining association to the
+educational handicaps of intelligence which we were unable to remove.
+
+The original tendencies of man, as distinct from his original
+equipment, have not been considered in this study. If the quantitative
+differences in endowment of this kind were added to the denominator of
+our accomplishment ratio formula, we would have a better measure and
+better results. We share in this investigation a general limitation of
+educational psychology—the requisite technique to measure individual
+differences of instincts and the ethical traits of which they are the
+predisposition. Industry, ambition, and initiative are not inherited
+units. They are, however, the rules of an economy of expression and as
+such are dependent upon individual differences in strength of instinct.
+
+
+CONCLUSIONS
+
+1. IQ can be used as a limit of school achievement expressed as SQ.
+
+ _a_ Progress in Σ(IQ-SQ)⁄_n_ may be used as a measure of school
+ efficiency.
+
+ _b_ SQ⁄IQ may be used as a measure of individual efficiency.
+
+2. Correlations between intelligence and achievement are very different
+before and after the abilities are pushed.
+
+ _a_ Many _r_’s are reported where conclusions are drawn as
+ though they had been pushed. These conclusions should be
+ restated.
+
+ _b_ Intelligence and achievement are far more closely
+ associated than has been assumed to date.
+
+3. Disparity of school product can be reduced to individual differences
+in intelligence.
+
+ _a_ Little specific inheritance of school abilities.
+
+ _b_ Little unremovable difference in industry,
+ conscientiousness and concentration.
+
+ _c_ Intelligence is the only inherited general factor.
+
+4. Negative association between AccR and IQ.
+
+ _a_ To-day’s educational procedure involves a handicap to
+ intelligence.
+
+ _b_ The genius has been neglected.
+
+[Illustration]
+
+
+
+
+FOOTNOTES
+
+
+[1] Part of this section is reprinted with revisions from TEACHERS
+COLLEGE RECORD, Vol. XXI, No. 5 (November, 1920).
+
+[2] For scientific purposes we want year-month means and standard
+deviations, that we may say that Charlie Jones is 2.1 S.D. above the mean
+for his age level, while Harold Smith is .1 S.D. below that mean. It is
+in terms such as these that we may be able to compare accomplishment
+in one function with accomplishment in another, progress in one
+with progress in another. For many of our problems we need a common
+denominator of measurement so that we may compare progress between tests
+and age-groups. The best common denominator is, I believe, S.D. in an
+age-group. Thus we may locate a child in any age-group in any test and
+compare that location with the position of any other child in any other
+test in his age-group.
+
+For practical purposes, however, it is for many reasons more convenient
+to use quotients in elementary schools. Principals would rather deal with
+quotients since it is easier to explain them in terms of attainment and
+capacity. It is the use of such quotients that this thesis discusses.
+
+[3] Judd, C. H., “A Look Forward,” in _Seventeenth Yearbook_, Pt. II, of
+the N.S.S.E., 1918.
+
+[4] When the disadvantages of “pushing” children are discussed, the
+disadvantages of keeping children at their chronological age levels
+should be considered as well. Although it is true that a supernormal
+child placed in that grade for which he is mentally equipped loses
+much in social contact, it is also true that he loses a great deal
+by remaining in the grade where he physiologically belongs. There he
+develops habits of conceit, indolence, and carelessness. It is in all
+cases much better to group intelligent children and enrich the curriculum
+than to “push” them; but pushing may be better than leaving them where
+they belong by age. It is a possibility worth considering that the
+explanation of the “peculiarities” of genius lies in the fact that he has
+never associated with equals. When his fellows are mentally his equals
+they are physically far older and when they are physically his equals
+they are mentally inferior.
+
+[5] Whether only the Accomplishment Ratio as a percentage should be given
+the parents, or whether they should know both the IQ and all the SQ’s,
+is a question on which I am not prepared to give an opinion. I incline
+to believe that the parents should know only the final marks and am sure
+that I advise telling the children these only.
+
+[6] There will be reported elsewhere a fuller consideration of this
+aspect of the technique of derivation of norms, together with a complete
+presentation of the data used to obtain the age norms herein used.
+
+[7] “The Accomplishment Quotient,” _Teachers College Record_, November,
+1920.
+
+[8] Or the ratio of the Subject Quotient to the Intelligence Quotient,
+which is the same as the ratio of the Subject Age to the Mental Age.
+
+[9] This table is too bulky for complete publication but may be found on
+file in Teachers College Library, Columbia University.
+
+[10] The remainder of this table is filed in Teachers College Library,
+Columbia University. Decimals are dropped in this table.
+
+[11] Decimals are dropped in this table.
+
+[12] Truman L. Kelley: _Statistics_, The Macmillan Co.
+
+[13] This correlation was obtained by correlating one half of the Binet
+against the other one half and then using Brown’s Formula to determine
+the correlation of a whole Binet against another whole Binet.
+
+[14] These quantities do not decrease because a perfect score on the
+arithmetic test was too easy to obtain at this time. The children had
+reached the limits of this test.
+
+[15] Table 12 is too bulky for complete publication. The first page is
+reproduced here and the complete table is filed at the library, Teachers
+College, Columbia University.
+
+[16] No arithmetic was given in 1918, therefore arithmetic was not used
+in these averages.
+
+[17] William Anderson McCall: _Correlations of Some Psychological and
+Educational Measurements_, Teachers College Contributions to Education,
+No. 79.
+
+[18] Cyril Burt: _The Distribution and Relations of Educational
+Abilities_, pp. 53-56.
+
+[19] Quotations from Galton: _Hereditary Genius_, ’92, pp. 61-62 and pp.
+103-104.
+
+[20] Terman, Lewis: _The Intelligence of School Children_. Boston:
+Houghton Mifflin, 1919.
+
+[21] Woodworth, R. S.: _Dynamic Psychology_, p. 200. New York: Columbia
+University Press, 1918.
+
+
+
+
+*** END OF THE PROJECT GUTENBERG EBOOK 76891 ***
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+<div style='text-align:center'>*** START OF THE PROJECT GUTENBERG EBOOK 76891 ***</div>
+
+<h1>THE ACCOMPLISHMENT RATIO</h1>
+
+<p class="titlepage">A Treatment of the Inherited Determinants<br>
+of Disparity in School Product</p>
+
+<p class="titlepage"><i>By</i><br>
+RAYMOND FRANZEN<br>
+<span class="smaller">A.B. (Harvard), M.A. (Columbia)<br>
+Ph.D. (Columbia)</span></p>
+
+<p class="titlepage">Teachers College, Columbia University<br>
+Contributions to Education, No. 125</p>
+
+<p class="titlepage">Published by<br>
+<span class="gothic">Teachers College, Columbia University</span><br>
+<span class="smaller">New York City<br>
+1922</span></p>
+
+<p class="titlepage smaller"><span class="u"><i>Copyright, 1922, by <span class="smcap">Raymond Franzen</span></i></span></p>
+
+<hr class="chap x-ebookmaker-drop">
+
+<div class="chapter">
+
+<h2 class="nobreak" id="PREFACE">PREFACE</h2>
+
+</div>
+
+<p>The results of the experiment reported here have become so
+much a portion of my process of reasoning that duplication of
+material presented elsewhere is unavoidable. I wish in particular
+to recognize my indebtedness to the <span class="smcap">Teachers College Record</span>
+for permission to reprint here revised portions of an article which
+appeared in the November, 1920, number of that journal. I will
+warn here any reader to whom the intricacies of a full statistical
+account are irksome that the logic and conclusions presented in
+this study are incorporated in a more palatable and abbreviated
+form in Chapter IV of <i>Intelligence Tests and School Reorganization</i>
+(World Book Company).</p>
+
+<p>The work presented here has been made possible by the cooperation
+and interest of the two principals of the Garden City
+public school during the period of my work there, Miss Gladys
+Locke and Mrs. Edna Maule. I also owe any success that this
+experiment may have had to the teachers who did the real work
+of “pushing” abilities to their limit. My indebtedness to Gladys
+Locke Franzen for help in expression and correction is surpassed
+only by what I credit to her encouragement and cooperation at its
+inception.</p>
+
+<p>During the period in which this experiment was planned and
+executed it grew into a real problem through the advice of two of
+my teachers to whom I owe all such inspiration and knowledge as
+I possess—Edward L. Thorndike and Truman L. Kelley.</p>
+
+<p class="right"><span class="smcap">Raymond H. Franzen</span></p>
+
+<p><i>Des Moines, Iowa, 1922.</i></p>
+
+<hr class="chap x-ebookmaker-drop">
+
+<div class="chapter">
+
+<h2 class="nobreak" id="CONTENTS">CONTENTS</h2>
+
+</div>
+
+<table class="contents">
+ <tr>
+ <td class="tdr">I.</td>
+ <td><span class="smcap">An Outline of the Experiment</span></td>
+ <td class="tdpg"><a href="#PART_I">1</a></td>
+ </tr>
+ <tr>
+ <td class="tdr"></td>
+ <td class="sub">The Use of Quotients and Ratios</td>
+ <td class="tdpg"></td>
+ </tr>
+ <tr>
+ <td class="tdr"></td>
+ <td class="sub">The Derivation of Age Norms</td>
+ <td class="tdpg"></td>
+ </tr>
+ <tr>
+ <td class="tdr"></td>
+ <td class="sub">A Method of Survey of Reading, Language and Arithmetic</td>
+ <td class="tdpg"></td>
+ </tr>
+ <tr>
+ <td class="tdr">II.</td>
+ <td><span class="smcap">Statistical Treatment of the Experiment</span></td>
+ <td class="tdpg"><a href="#PART_II">17</a></td>
+ </tr>
+ <tr>
+ <td class="tdr"></td>
+ <td class="sub">The Quotients</td>
+ <td class="tdpg"></td>
+ </tr>
+ <tr>
+ <td class="tdr"></td>
+ <td class="sub">The Ratios</td>
+ <td class="tdpg"></td>
+ </tr>
+ <tr>
+ <td class="tdr"></td>
+ <td class="sub">Summary</td>
+ <td class="tdpg"></td>
+ </tr>
+ <tr>
+ <td class="tdr">III.</td>
+ <td><span class="smcap">The Psychological Conclusions of the Experiment</span></td>
+ <td class="tdpg"><a href="#PART_III">43</a></td>
+ </tr>
+ <tr>
+ <td class="tdr"></td>
+ <td class="sub">The Neglect of Genius</td>
+ <td class="tdpg"></td>
+ </tr>
+ <tr>
+ <td class="tdr"></td>
+ <td class="sub">Is Genius Specialized?</td>
+ <td class="tdpg"></td>
+ </tr>
+ <tr>
+ <td class="tdr"></td>
+ <td class="sub">Current Psychological Opinion</td>
+ <td class="tdpg"></td>
+ </tr>
+ <tr>
+ <td class="tdr"></td>
+ <td class="sub">Conclusions</td>
+ <td class="tdpg"></td>
+ </tr>
+</table>
+
+<hr class="chap x-ebookmaker-drop">
+
+<div class="chapter">
+
+<p><span class="pagenum" id="Page_1">[1]</span></p>
+
+<h2 class="nobreak" id="PART_I">PART I&#x2060;<a id="FNanchor_1" href="#Footnote_1" class="fnanchor">[1]</a><br>
+AN OUTLINE OF THE EXPERIMENT</h2>
+
+</div>
+
+<h3>THE USE OF QUOTIENTS AND RATIOS</h3>
+
+<p>Standardized measurement of educational product has won its
+way to a recognized place in the school life of this country. Many
+of our larger cities have research bureaus of tests and measurements,
+and advanced private schools have departments of measurement.
+The logic of the use of statistically derived evaluations
+versus the use of opinion, swayed as it is by the haphazard captions
+of emotion and condition, has become widely recognized. The case
+of scientific measurement in education has been argued and won.
+The objections to older forms of measurement have become the
+criteria of the value of the new.</p>
+
+<p>Still administrators, although they have been convinced theoretically
+of its importance, find it hard to see just what measurement
+does for their schools. They often object that measurements
+are made, the tests are carried away by the examiner, and some
+time later they are presented with a neat series of distributions
+and are told where their school stands in relation to certain other
+schools or to schools in general. This is undoubtedly a very important
+piece of information; since a determination of the extent
+to which a goal has been attained forms the basis of the commendation
+or condemnation of the methods, curricula, and text-books
+employed in the process. But administrators want to know
+which of the various elements of school procedure are to be praised
+and which are to be blamed.</p>
+
+<p>We cannot condemn or support a whole school system on the basis
+of composite results (unless all possible educational objectives have
+been measured, and show one common drift; or unless it is necessary
+that the system fall or stand as a whole) since then we should
+be throwing good and bad into a common discard. We must
+measure each thing separately. We must build our ideal system of
+education synthetically, taking the best methods from each of the
+<span class="pagenum" id="Page_2">[2]</span>prevalent groups of theories. There has been too much absolutism
+in education, too little of a realism that sees the good and bad in
+all and diminishes the bad and augments the good. If we adopt
+this point of view we become really empirical in our method,
+living through each educational experiment to incorporate it into a
+growing treasury of tested theory, not deducing success or failure
+from metaphysical or doctrinaire prejudice. In this administrators
+have been more scientific than those who measure. They have
+always objected that they wanted differential diagnoses. Here
+the answer to their needs must come through experimentation
+and it is only through nation-wide study and careful comparison
+and integration of results that methods of teaching can be scientifically
+established.</p>
+
+<p>Three uses of measurement commonly stressed are: (1) Diagnosis
+of degree of attainment of goal; (2) selection of method of
+attainment of goal; (3) definitive outline of goals. We have seen
+that the first two are of little immediate value to the administrator.
+The first only gives him an accurate notion of where he stands in
+any one subject without pretending to tell him why; the second
+is a promissory note. Some day we shall be able to tell him the
+best methods for the attainment of his goal. The third has slightly
+more immediate value. Measurement splits up the goals of education,
+gives them concrete formulation, allows teachers to see an
+advance in the class in one function as separate from the rest;
+allows them, for instance, to distinguish more clearly than they
+otherwise would between oral reading and silent reading, or between
+addition and division. But this, too, is rather too general
+to appeal to administrative economy. One would find it very
+difficult to sell one’s services as a measurer to a school board or
+a superintendent on the basis of these three values. They answer
+that universities and scientific research give them as much as they
+want of these values. What an expert on measurement could add
+in interpretation of results would seem of small additional value
+to them.</p>
+
+<p>Still there is a very marked function that such an expert can
+perform; but he must serve a fourth and fifth use of measurement
+while he serves a particular school. When he serves the first three
+he is serving the science of education and, unfortunately, no one
+school will pay him to do that. The uses of measurement that
+directly benefit any one school are: (4) Classification by information
+<span class="pagenum" id="Page_3">[3]</span>and intelligence and (5) diagnosis of individual disability. For
+the proper prosecution of these aims individual measurements and
+age norms are essential. Only with such equipment can we make
+the prognoses of future school behavior which the administrator
+so urgently needs.</p>
+
+<p>Grade norms cannot be used to make individual diagnoses.
+Though we can see by them which children are below and which
+above the level that in their grade they should attain, we cannot
+see just what administrators most need to know; namely, whether
+the retardation and acceleration are justified or not—how many
+children are working at maximum. More than that, computations
+based on grade norms are very inaccurate in individual cases
+because the variability within any grade is so great. As it becomes
+necessary to use new norms for such purposes it is important to
+have them in terms that are directly comparable to intelligence
+mensuration.&#x2060;<a id="FNanchor_2" href="#Footnote_2" class="fnanchor">[2]</a></p>
+
+<p>First in importance is an interpretation of the meaning of an
+Intelligence Quotient. Too often it is stated as a number and
+left as a number with the belief that somehow or other that is a
+tag which carries its own divine implication. Its importance lies
+in its diagnosis of power of adaptation, and it has a high correlation
+with the maximum possible rate of school progress. Just as a pure
+information test diagnoses the neural bonds that have been formed
+in any one field, so an intelligence test diagnoses the ability to form
+bonds, to meet a new situation and form satisfactory habits—power
+to learn. It may be thought of as a diagnosis of the neural
+chemistry of the individual. As such it is not concerned with the
+connections or quantity, but rather with the quality of the neural
+tissue.</p>
+
+<p><span class="pagenum" id="Page_4">[4]</span></p>
+
+<p>As an intelligence quotient is actual mental age divided by
+chronological age—which is the normal mental level of the child’s
+age-group—so it is the rate at which the child has progressed to
+mental maturity. It is his potential rate of progress. It is a division
+of what is by what normally would be. Then, when we use IQ
+we express the various degrees of power of adaptation due to
+various degrees of fitness of neural equipment to form bonds, by
+means of a diagnosis of the rate of formation of bonds which
+everyone forms sooner or later in an environment such as ours.
+It is conceivable that we might test this same power without
+testing the presence of such bonds at all. Such a test would detect
+directly the quality of the neural equipment irrespective of quantity
+or conformation.</p>
+
+<p>A ten-year-old child whose mental age is ten has progressed
+at the rate which is normal, and his IQ is 1.00. A very exceptional
+ten-year-old child whose mental age is fifteen has progressed just
+one and one half times as fast as the former, and his IQ is 1.50.
+Another exceptional ten-year-old child whose mental age is five
+has progressed at just one-half the rate of the first, and his IQ is
+.50. What we mean, then, by an Intelligence Quotient is the
+rate at which a child grows to the mental maturity of human
+beings in the world as it is.</p>
+
+<p>For purposes of presentation of a problem one can here assume
+(an hypothesis the value of which will here be determined) that
+each child can attain this rate of progress in each of the elementary
+school subjects. The degree to which this is true is the degree
+to which the IQ is a valid index of power to deal with school subjects.
+This assumes that inherited special disabilities in the school subjects
+are uncommon, that school progress is determined by the interplay
+of intelligence and environment, and that so-called interest characteristics
+which aid in development are the result of an earlier
+interplay of intelligence and environment. The degree to which
+educational product of children can be made to approach this
+intelligence will allow us to judge how far these factors are inherited,
+since differences that are removable must be learned,
+not innate.</p>
+
+<p>We can the more readily see the significance of viewing a child’s
+equipment in terms of educational and mental age, when we
+conceive of a Subject Quotient. This is a quotient resulting from
+the division of the age level reached in the test in question by the
+<span class="pagenum" id="Page_5">[5]</span>chronological age of the pupil. It is a measure of the rate of progress
+of the child in the school subject under consideration. Thus a
+ten-year-old child with ten-year-old ability in Thorndike Reading
+Scale Alpha 2 would have as his reading age divided by chronological
+age, 1.00. This may be called his Subject Quotient in
+Reading or his Reading Quotient. The division of what is by what
+would be if the child were normal gives the percentage of normality,
+the actual rate of progress. Since the IQ is the potential
+rate of progress and the SQ the actual rate of progress, the ratio
+of SQ to IQ gives the percentage of what that child could do, that
+he has actually done. Thus a child with an IQ of 1.32 whose reading
+quotient (his RQ) is 1.10, though he is doing work which is
+above normal, is not doing work which is above normal for him.
+His RQ/IQ is 1.10/1.32, whereas if he were progressing at his optimum
+rate it would equal 1.32/1.32. This RQ/IQ is the same quantity as RA/MA.
+We may call this a Subject Ratio and the average of Subject Ratios
+an Accomplishment Ratio. We could, if the absolute association
+between reading age and mental age were perfect, measure the
+approximation to ideal educational performance of any one child
+in any one elementary school subject through the approximation
+of this Subject Ratio to 1.00. As we will see later, Subject Quotients
+approach the Intelligence Quotients when special treatment
+is given; that is, the correlation of SQ and IQ becomes nearer 1.00
+and the difference between the average IQ and the average
+SQ approaches zero. It is safe then to expect these Subject Ratios
+to be at least 1.00 before we pronounce satisfaction with the school
+product.</p>
+
+<p>There is certainly a significant relation between IQ and SQ,
+and the more perfect the educational procedure has been, the more
+it has called forth all that the child is capable of, the higher it
+will be. To determine whether the quotient in any school subject
+can be greater than the Intelligence Quotient in any significant
+amount, it will only be necessary after we have perfect age norms
+by months to get that quotient amongst enough pupils whom
+we know to be working at maximum. What is significant here is
+that the more nearly any such quotient reaches or exceeds the Intelligence
+Quotient the more nearly has the child been brought up to
+<span class="pagenum" id="Page_6">[6]</span>what he is able to do under the best conditions. The Accomplishment
+Ratio is the degree to which his actual progress has attained to
+his potential progress by the best possible measures of both.</p>
+
+<p>This would be a mark of the child’s effort, a mark of the concentration
+and interest that the child has in the school work, and as
+far as no inherited traits or capacities other than intelligence affect
+school work it is a measure of the efficiency of a child’s education
+thus far. If there are such other innate bases, it is also a measure
+of those inherited traits and capacities or their predisposition, such
+as concentration, effort, written expression, etc. At any rate it is a
+measure of the child’s accomplishment, and so of the effort and
+concentration as they really are at present working under those
+school conditions. It is an index of achievement irrespective of
+intelligence.</p>
+
+<p>A very convenient graph representing the same facts and easily
+interpreted by the teacher may be constructed thus:</p>
+
+<figure class="figcenter illowp100" id="graph" style="max-width: 37.5em;">
+ <img class="w100" src="images/graph.jpg" alt="">
+</figure>
+
+<p>Here it can be easily shown that Spelling Age, Reading Age,
+Arithmetic Age, etc., are in some definite relation to both Chronological
+Age and Mental Age. Using the Mental Age line as a goal,
+these records may be kept constantly up to date. Another use of
+the Accomplishment Ratio is as the medium in which the children
+may keep records of their own work. As it is a mark in terms of
+intelligence, dull and brilliant children may compete on a parity
+to bring their Accomplishment Ratios as high as possible.</p>
+
+<p>Mainly we have advanced formal education. We have in many
+ways promoted the abilities to read, write, spell and figure. But
+our philosophy of education has advanced far beyond that. We
+have other aims in education, and consequently other methods and
+modes, which also must be measured and judged. We wish to
+promote such qualities as stability, self-reliance, concentration,
+and ambition. It does not necessarily follow that we must measure
+these things directly, although every one vitally interested in
+<span class="pagenum" id="Page_7">[7]</span>measurement cherishes the hope that we may some day measure
+their behavioristic correlates,—“For the quality of anything exists
+in some quantity, and that quantity can be measured.”</p>
+
+<p>“Some of us might be entirely willing to rest the case after asking
+whether in practical school life anyone ever saw a teacher thoroughly
+confident of teaching ideals but neglectful of reading and
+arithmetic. The fact is that the conscientious teacher always gives
+attention to both and the successful teacher is able, without omitting
+one, to cultivate the other. The theoretical possibility of thinking
+of the two results separately has little significance in dealing with
+real teachers and real schools. Good reading is a school virtue;
+and when one has measured good reading he has measured more
+than the trivial or formal side of education.”&#x2060;<a id="FNanchor_3" href="#Footnote_3" class="fnanchor">[3]</a></p>
+
+<p>This I believe to be true, but I also believe that through measurement
+we can actually promote those other more ethical ideals in
+education. Through classification by information and by intelligence
+we gain a marked increase of attention, concentration, ambition,
+and other objectives, measured in part by Accomplishment
+Ratios. More discussion due to a greater homogeneity promotes
+powers of inference and insight; being only with equals promotes
+self-confidence and honor, and in many cases prevents a regrettable
+conceit among supernormals; having work to do which is hard
+enough prevents habits of indolence and carelessness so commonly
+found among intelligent children.&#x2060;<a id="FNanchor_4" href="#Footnote_4" class="fnanchor">[4]</a></p>
+
+<p>It is a well-known fact that much work must be done in classification
+to get homogeneity or real conditions of teaching. As it is,
+most teachers are talking to the middle of their classes. When
+they do they mystify the lower quarter and bore the upper quarter;
+they talk to the upper quarter and mystify the lower three quarters;
+<span class="pagenum" id="Page_8">[8]</span>or they talk to the lower quarter and bore the upper three quarters.
+When a child is bored or mystified his Subject Quotients become less
+while his Intelligence Quotient remains constant. Then his Accomplishment
+Ratios become less as long as he remains in a position
+where he is being mistreated educationally. This, then, is the
+proper measure to see whether a child is classified properly or not.
+At the Garden City public school I changed as far as I was able
+the conditions of education of each child in that subject wherein
+his Accomplishment Ratio was markedly below 1.00. The concentration
+and effort of the child were obviously low and my
+attempt was to change conditions and to promote habits of consistent
+work. When the Accomplishment Ratio increased I knew
+that the child was profiting, that he was working. Our objective
+was to increase Ratios of all children, not to attain any set
+standard.</p>
+
+<p>This Accomplishment Ratio would, to my mind, be an ideal
+school mark. Besides the inaccuracy of marks to-day, which are
+accurate marks only of the teacher’s opinion, biased as it is by the
+personal equation of her character with that of the pupil, there is
+another fault of prevalent school marking. It is based on average
+work. The mark is the link between education in the school and
+education in the home. It gives the parents an index of the child’s
+work and allows them to encourage or discourage the child’s attitudes.
+Such indices have no real significance when they are based
+upon average development, as the parent is generally mistaken
+about the ability of the child.</p>
+
+<p>Marks given by a teacher are satisfactory only for a normal
+child with normal age for the grade. Brilliant children are over-praised
+for work which, though over the ability for the group, is
+under their own ability. Marks given to stupid children are
+misinterpreted by parents so as greatly to prejudice the effort
+of the child. Though his work may be such as to merit encouragement
+his mark may be very low. Teachers’ marks are, aside from
+their inaccuracy, just, only in a group that is perfectly classified;
+just, only when the children are all of the same ability and all
+possess the same initial information. So far as they are unjust
+they are subversive of our aims, as they then transmit a faulty
+<span class="pagenum" id="Page_9">[9]</span>message to the home and disrupt the continuity of school and
+home education.&#x2060;<a id="FNanchor_5" href="#Footnote_5" class="fnanchor">[5]</a></p>
+
+<p>Such marks as are here advocated would correct this feature
+of our present system, as well as the inaccuracy of our present
+marks. It is a mark which evaluates the accomplishment of the
+child in terms of his own ability. A brilliant child would no longer
+be praised for work which in terms of his own effort is 70 per cent
+perfect, in terms of the maximum of the group 90 per cent. The
+teacher gives him a mark of 90 while we mark him 70. A stupid
+child who does work which is marked 70 in terms of the maximum
+of the class but 90 in terms of his own, a limited ability, is no longer
+discouraged. His effort is evaluated, and the praise which he
+receives from home is merited and consequently economical, since
+the resultant satisfaction cements the bonds of concentration and
+attention. Such a mark is an actual index of the effort that child
+is making and consequently forms the proper link between the
+school and the home.</p>
+
+<p>Parents would need no great instruction in the interpretation of
+these marks, since they have always acted as though the other
+marks were these, and since these also are in percentage form.
+The only kind of mark they can understand is an Accomplishment
+Ratio. I found that the parents of the children at Garden City
+were more attentive to such marks than to others, and acted upon
+them more readily. Of course the parents of the very intelligent
+children, who are used to marks above 90, are surprised at first
+when you tell them that your mark of the child is 80; but upon
+explanation, which should in all cases precede the first report to
+the parents, they immediately see the value of such grading. It
+is fortunate in this connection that the greatest amount of explanation
+is necessary about intelligent children, as one usually
+deals then with intelligent parents.</p>
+
+<h3>THE DERIVATION OF AGE NORMS</h3>
+
+<p>In this study age norms were derived empirically, both regression
+lines being taken into consideration. From the point of view of
+<span class="pagenum" id="Page_10">[10]</span>statistics it becomes imperative, in order to use the technique
+here advised, to have the average age of a score—since we are
+going to predict age from score—to translate crude scores into
+indices of maturity in each subject under consideration. We are
+in error in the use of grade norms, if we find the average score of a
+grade and then, when we obtain that score in practice, say that the
+work is of that grade. To be able to say this we must know the
+average grade of a score. This takes in an entirely different cross-section
+of data. If we get the average score of all children in grade
+6, then we can predict what a 6th grade child is likely to get, but
+we can say nothing about a child who is not in grade 6. In order to
+decide that a 4th grade child has 6th grade ability, we must know
+that he has such ability that all children who share this score
+make an average grade of 6.&#x2060;<a id="FNanchor_6" href="#Footnote_6" class="fnanchor">[6]</a> It would be wise then to get the
+regression of score on age as well as the regression of age on score,
+since they are not identical, the correlation between score and
+age being less than unity.</p>
+
+<p>We will note in passing that the data to establish these norms,
+except those of reading, are not as complete as may be desired,
+inasmuch as it was difficult to get test scores where the age in
+months also was available. However, the general data behind the
+grade norms could be used to keep the results from any crude
+error; and the averages were obtained for every month from 8
+years to 14 years, with a corresponding refinement in intervals of
+score, which made still more improbable an error in the general
+tendency of the regression lines. Then all the distributions, when
+grouped by years, were corrected for truncation; that is, the
+tendency for the brighter children of the older group to be in high
+school (the data were from elementary schools only) and the
+duller children of the younger group to be in the lower grades
+where they could not be reached was recognized and corrected by
+finding the average, standard deviation, and number of cases which
+would have existed if these forces of truncation were not operating.
+This was done by the use of the other one half of the figures comprising
+Table XI of Pearson’s <i>Tables for Statisticians and Biometricians</i>.
+Dr. Truman L. Kelley pointed the way to its derivation.</p>
+
+<p>These norms differ somewhat from those derived from the grade
+<span class="pagenum" id="Page_11">[11]</span>norms by translation of grade into average age for the grade. This
+is because the norm for a grade is the average score for a grade.
+Hence the norm of age 10 obtained in this way is the average score
+obtained by a grade whose average age is 10. Then the data used
+to obtain this average are made up of diverse ages, all of one grade,
+instead of all of one age and diverse grades. Even then, we would
+have only an average score of an age which approximates what
+we want, but is not as reliable to use as average age for a score.</p>
+
+<h3>A METHOD OF SURVEY OF READING, LANGUAGE, AND ARITHMETIC</h3>
+
+<p>The following procedure was employed in the experiment. The
+experiment was carried out in the public school at Garden City.
+Two hundred children were given the tests. The instructions, shown
+below, were followed in November, 1919, and in November, 1918;
+in June, 1919, and in June, 1920, with the exception that no
+arithmetic test was used in November, 1918, and June, 1919. The
+Binet tests were given by the author; all of the others were given
+either by the author or the principal who was careful not to deviate
+from the directions in any way. In June of both years the author
+gave instructions for a test in one room, and then left the teacher
+in charge and went on to the next. This could be done in June of
+each year as the teachers were then fully acquainted with the
+experiment and their coöperation was assured.</p>
+
+<blockquote>
+
+<p class="center"><span class="smcap">Directions</span></p>
+
+<p class="hanging">I. Administer and score the following tests according to standard instructions.
+Give all tests to grades 3 and above.</p>
+
+<ul>
+ <li>Woody-McCall Mixed Fundamentals in Arithmetic</li>
+ <li>Thorndike Reading Scale Alpha 2</li>
+ <li>Thorndike Visual Vocabulary Scale, A2</li>
+ <li>Kelley-Trabue Completion Exercises in Language</li>
+ <li>Stanford-Binet Tests (given by the author)</li>
+</ul>
+
+<p class="hanging">II. Translate the scores into year-month indices of maturity by means
+of the following table. (Use Mental Age for the Binet.) Assume rectilinear
+development, that is, that the amount of score which equals
+the development of one month is the same as the amount of score which
+equals the development of any other month. Then interpolation and
+extension are allowable. Use the table in this way: Find in the table
+the score made by a child (for instance in the Woody-McCall); find the
+age to which it corresponds, then call this age the Arithmetic Age of
+<span class="pagenum" id="Page_12">[12]</span>the child. For instance, if the score in Woody-McCall is 20, his Arithmetic
+Age is about halfway between 10 and 11 or 10 years 6 months.</p>
+
+<table class="borders">
+ <tr>
+ <th>Age</th>
+ <th>Woody-McCall</th>
+ <th>Alpha 2</th>
+ <th>Visual Vocab.</th>
+ <th>Kelley-Trabue</th>
+ </tr>
+ <tr>
+ <td class="tdc">&nbsp;&nbsp;8—0</td>
+ <td class="tdc">12.00&nbsp;&nbsp;</td>
+ <td class="tdc">4.50</td>
+ <td class="tdc">3.60</td>
+ <td class="tdc">4.30</td>
+ </tr>
+ <tr>
+ <td class="tdc">&nbsp;&nbsp;9—0</td>
+ <td class="tdc">15.16⅔</td>
+ <td class="tdc">4.98</td>
+ <td class="tdc">4.32</td>
+ <td class="tdc">5.00</td>
+ </tr>
+ <tr>
+ <td class="tdc">10—0</td>
+ <td class="tdc">18.33⅓</td>
+ <td class="tdc">5.46</td>
+ <td class="tdc">5.04</td>
+ <td class="tdc">5.65</td>
+ </tr>
+ <tr>
+ <td class="tdc">11—0</td>
+ <td class="tdc">21.50&nbsp;&nbsp;</td>
+ <td class="tdc">5.94</td>
+ <td class="tdc">5.76</td>
+ <td class="tdc">6.35</td>
+ </tr>
+ <tr>
+ <td class="tdc">12—0</td>
+ <td class="tdc">24.66⅔</td>
+ <td class="tdc">6.42</td>
+ <td class="tdc">6.48</td>
+ <td class="tdc">7.05</td>
+ </tr>
+ <tr>
+ <td class="tdc">13—0</td>
+ <td class="tdc">27.83⅓</td>
+ <td class="tdc">6.90</td>
+ <td class="tdc">7.20</td>
+ <td class="tdc">7.70</td>
+ </tr>
+</table>
+
+<p class="hanging">III. Arrange these Arithmetic Ages of all the children of your school in
+order from high to low with the names opposite the scores in the
+extreme left-hand column of the paper. At the right have parallel
+columns of the grades. Check the grade of each child in these columns.
+You will then have a sheet like this:</p>
+
+<table class="borders" style="border-bottom: none;">
+ <tr>
+ <th rowspan="3">Name</th>
+ <th rowspan="3">Arith. Age</th>
+ <th colspan="10">Grade</th>
+ </tr>
+ <tr>
+ <th colspan="2">4</th>
+ <th colspan="2">5</th>
+ <th colspan="2">6</th>
+ <th colspan="2">7</th>
+ <th colspan="2">8</th>
+ </tr>
+ <tr>
+ <th>B</th>
+ <th>A</th>
+ <th>B</th>
+ <th>A</th>
+ <th>B</th>
+ <th>A</th>
+ <th>B</th>
+ <th>A</th>
+ <th>B</th>
+ <th>A</th>
+ </tr>
+ <tr>
+ <td>Gertrude Smith</td>
+ <td class="tdc">180</td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="tdc bb">#</td>
+ <td class="bb"></td>
+ </tr>
+ <tr>
+ <td>Saul Sampson</td>
+ <td class="tdc">176</td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="tdc bb">#</td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ </tr>
+ <tr>
+ <td>Ed Jones</td>
+ <td class="tdc">176</td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="tdc bb">#</td>
+ <td class="bb"></td>
+ </tr>
+ <tr>
+ <td>George Calut</td>
+ <td class="tdc">172</td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="tdc bb">#</td>
+ </tr>
+ <tr>
+ <td>Ida Henry</td>
+ <td class="tdc">172</td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="tdc bb">#</td>
+ </tr>
+ <tr>
+ <td>Raymond Teller</td>
+ <td class="tdc">172</td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="bb"></td>
+ <td class="tdc bb">#</td>
+ </tr>
+ <tr>
+ <td>Ed Hoard</td>
+ <td class="tdc">172</td>
+ <td></td>
+ <td></td>
+ <td></td>
+ <td></td>
+ <td></td>
+ <td></td>
+ <td class="tdc">#</td>
+ <td></td>
+ <td></td>
+ <td></td>
+ </tr>
+ <tr>
+ <td colspan="12"><i>Etc.</i></td>
+ </tr>
+</table>
+
+<p class="in">Do the same with each of the tests. It is clear that, independent of
+the unreliability of the test, if your school were perfectly classified all
+the 8th grade children would come first on each relation sheet and then
+<span class="pagenum" id="Page_13">[13]</span>the 7th grade children, etc. You have now a picture of the overlapping
+of your grades. Regrade in reading and arithmetic. Draw horizontal lines
+across these relation sheets at the points of delineation. Divide your
+total number of children by the number of teachers available and then
+make a class division by the number of pupils, that is, call the upper
+one-sixth of the total number of pupils grade 8 in this subject, the next
+one-sixth, grade 7, etc. Teach all grades of arithmetic at the same time
+and all grades of reading at the same time. You can now send each
+pupil to the grade in which he belongs in each subject.</p>
+
+<p class="hanging">IV. Call each derived age a Subject Age (SA). Divide each subject age by
+the chronological age of the child. This will yield what may be called
+a Subject Quotient (SQ), previously called an Educational Quotient
+(EQ).&#x2060;<a id="FNanchor_7" href="#Footnote_7" class="fnanchor">[7]</a> Dividing the Reading Age by the Chronological Age, you arrive
+at a Reading Quotient. This RQ is the rate at which the child has
+progressed in reading. We have the same kind of quotient for intelligence
+(Stanford-Binet IQ). This IQ is the potential rate of progress
+of the child.</p>
+
+<p class="hanging">V. The ratio of any Subject Age to Mental Age&#x2060;<a id="FNanchor_8" href="#Footnote_8" class="fnanchor">[8]</a> may be called a Subject
+Ratio (SR), previously called an Accomplishment Quotient (AccQ).&#x2060;<a href="#Footnote_7" class="fnanchor">[7]</a>
+This Subject Ratio gives the proportion that the child has done in that
+subject of what he actually could have done, and is a mark of the
+efficiency of the education of the child in that subject to date. The goal
+is to bring up these Subject Ratios as high as possible. When they are
+above .90, the child may be considered as receiving satisfactory treatment,
+providing norms for subject ages are reasonably accurate. (This
+figure, .90, applies to a Subject Ratio obtained by using a Stanford-Binet
+Mental Age.) An Arithmetic Ratio based on one arithmetic test
+and one intelligence test only is not as good as one based on three
+arithmetic tests and three intelligence tests. If Subject Ratios go far
+over 1.00 the chances are that the Mental Age diagnosis is too low.
+The average of the Subject Ratios of a child may be called his Accomplishment
+Ratio.</p>
+
+<p>In the application of the above instructions, whenever opportunity offers
+for classification of both subject matter and intelligence (which means many
+teachers or a large school), use a Relation Sheet (for instance for Arithmetic)
+and then have additional columns at the extreme right for intelligence
+headed <i>A</i>, <i>B</i>, <i>C</i>, and <i>D</i>. If a child’s IQ is in the upper quarter of the IQ’s
+of your school, check in the column A opposite his name; if it is in the upper
+<span class="pagenum" id="Page_14">[14]</span>half but not in the upper quarter check in <i>B</i>, and so on with <i>C</i> and <i>D</i>.
+Then you will be able to split each group; for instance, the one which is
+defined as 8th grade in arithmetic ability, into four sections, each of which
+progresses at a rate differing from the others. The <i>A</i> section will progress
+most rapidly, <i>B</i> next, <i>C</i> more slowly, and <i>D</i> most slowly.</p>
+
+</blockquote>
+
+<p>As Garden City was a small school, adjustment of procedure to
+individual differences in intelligence, besides the grouping for
+subject matter, was done mostly by pushing children. Children
+were advanced whole years (the grade they “belonged to” was the
+one in which geography and history were taught; this was their
+home grade) besides the readjustment made by the special regrading
+in reading and arithmetic. A special treatment class was formed
+where pronounced negative deviates were given special attention.
+Regrading was also instituted for spelling. Children were promoted
+whenever it was considered advisable; teachers were switched from
+subject to subject whenever that was considered advisable by the
+principal and the author. The Thorndike <i>Arithmetics</i> and other
+new texts were introduced to some extent. <i>Any change possible was
+made in order to bring EQ/IQ as high as possible.</i> That was the goal.
+The purpose was not to prove that any certain educational procedure
+would tend to promote abilities more rapidly than others,
+but that abilities could be promoted to the level of intelligence—that
+intelligence is substantially the exclusive inherited determinant
+of variety of product among school children. (It is to be understood
+that intelligence may be, and probably is, the summation of
+thousands of inherited factors,—neutral elements, here merged
+in the broader behavioristic concept of intelligence.)</p>
+
+<h3>SCIENTIFIC QUESTIONS INVOLVED IN CLASSIFICATION</h3>
+
+<p>If we were able to negate other influences upon disparity of
+product, we could conclude that these were not inherited. Hence
+it would be our burden as educators so to manipulate education as
+to prevent their operation. We will attempt to analyze the determinants
+of individual differences in product in these children,
+to see which influences besides intelligence are part of the inborn
+equipment which is not the province of education, but of eugenics,
+to correct. No absolute validity is held for any of the conclusions
+stated here. The subject is, at best, vague and complicated; but
+<span class="pagenum" id="Page_15">[15]</span>our conclusions can be used as the basis for a good guess in school
+procedure. We can judge general tendencies from the educational
+experiences of the two hundred children whose abilities for two years
+are here charted.</p>
+
+<p>The importance to educators of the subject in hand is excuse
+enough for its treatment. All educational procedure points a prophetic
+finger toward the classification of pupils and a reduction of
+the individual differences of product to the inherited bases of these
+differences.</p>
+
+<p>Classification, however, needs some more accurate psychological
+foundation than the mere awareness of individual variance. We
+must know:</p>
+
+<p>1. What tests to use.</p>
+
+<p>2. How to use them.</p>
+
+<p>3. Whether abilities in reading, spelling, and arithmetic or
+their predispositions exist as special abilities, or whether children
+differ in these simply because of their innate differences of intelligence.</p>
+
+<p>4. Whether individual differences in ambition, interest, and
+industry, in so far as they influence accomplishment, are due to
+special tendencies, or whether they are learned manifestations of a
+more general heritage.</p>
+
+<p>5. How these proclivities, specific or general, are related to
+intelligence.</p>
+
+<p>Points 1 and 2 are problems of procedure which must be evolved
+from our existent knowledge of measurements and statistics. Points
+3, 4, and 5 are problems which must be solved from the evidence
+resulting from an experiment in classification using these methods.
+Points 4 and 5 introduce the vexed question of whether there is a
+“general factor” or some general inherited cause of disparity in
+school product other than intelligence. Should reading ability
+prove to be the result of certain inherited abilities, or predisposition
+to abilities, we could not use a measure of mental ability alone as
+the guide to what a child could attain in reading. If intelligence,
+however, were the only inherited prognostic factor of school achievement,
+we could mark the education which had functioned in the
+child’s life by the percentage which the actual accomplishment of
+the child was of the maximum accomplishment of which he was
+capable at that stage of his mental development. So, too, if interest
+in particular subjects and ambition are not mainly the result of
+<span class="pagenum" id="Page_16">[16]</span>rewards and punishments of early life, but are themselves significantly
+rooted in the nature of the child, we could not condemn or
+commend curricula and methods upon a basis of the ratio of resultant
+accomplishment to mental ability, but must include a measure of
+this potentiality. The practical queries whether or not a child
+can do reading as well as he does arithmetic, whether his ambition
+and his honesty have their origin in the same strength or weakness,
+can be answered only when these problems are fully solved. The
+immediate consequences of knowing that a child can usually be
+taught to read if he does other tasks well is of obvious import. It
+would be of great service, too, to know whether lack of application
+can be corrected so as to bring concentration to the level of the
+other traits. If a child is normal in other ways and not in his
+tendency to respond to the approval of others by satisfaction, can
+this “drive” be increased or reduced to the average, or are individual
+differences in specific original tendencies basic to development
+of character, and if they are, how much influence do these differences
+exert upon school accomplishment? In order to classify children
+and comprehendingly watch and control their progress we
+must know the relation of achievement to the inherited bases upon
+which it depends. We must be able to state a child’s progress in
+any one school subject in terms of the potential capacity of the
+child to progress. We must know the inherited determinants of
+disparity in school product.</p>
+
+<hr class="chap x-ebookmaker-drop">
+
+<div class="chapter">
+
+<p><span class="pagenum" id="Page_17">[17]</span></p>
+
+<h2 class="nobreak" id="PART_II">PART II<br>
+STATISTICAL TREATMENT OF THE EXPERIMENT</h2>
+
+</div>
+
+<p>In the discussion and tables which follow:</p>
+
+<p>Q stands for Quotient, which will mean a Subject Age divided
+by a Chronological Age. R stands for Ratio, which will mean a
+Subject Age divided by a Mental Age.</p>
+
+<p>AQ means Woody-McCall Arithmetic Age divided by Chronological
+Age, and AR means this AA divided by Mental Age.</p>
+
+<p>VQ means Thorndike Vocabulary Age divided by Chronological
+Age, and VR means this VA divided by Mental Age.</p>
+
+<p>RQ means Alpha 2 Reading Age divided by Chronological Age,
+and RR means this RA divided by Mental Age.</p>
+
+<p>CQ means Kelley-Trabue Completion Age divided by Chronological
+Age, and CR means this CA divided by Mental Age.</p>
+
+<p>SQ means any Subject Quotient, that is, any Subject Age divided
+by Chronological Age, and SR means any Subject Ratio,
+that is, any SA divided by Mental Age.</p>
+
+<p>EQ means the average of all Subject Quotients and AccR, the
+Accomplishment Ratio, means the average of all Subject Ratios.</p>
+
+<p>All <i>r</i>’s are product-moment correlation coefficients, uncorrected.
+As the reliabilities (<a href="#table4">Table 4</a>) are almost what the other coefficients
+are in June, 1920 (<a href="#table5">Table 5</a>), it is apparent that the corrected
+coefficients, when Grade III is excluded, would all be very near
+unity at that time.</p>
+
+<h3>THE QUOTIENTS</h3>
+
+<p>In <a href="#table1">Table 1</a> are presented all the quotients for all periods of
+testing, grouped by children. The table, a sample of which is
+included here,&#x2060;<a id="FNanchor_9" href="#Footnote_9" class="fnanchor">[9]</a> shows clearly how all SQ’s approach IQ as special
+treatment continues. The grades indicated in this grouping are
+as of June, 1920. Inasmuch as many double and triple promotions
+were made in an effort to get maximum product for intelligence
+invested, no conclusion can here be formed of the grade to which
+these children belonged at any time except June, 1920. The correspondence
+between IQ and the SQ’s in June, 1920 is further
+shown in <a href="#table2">Table 2</a>. In this table the 48 children who took all tests
+at all periods are ranked from high to low IQ and their SQ’s are
+listed opposite. The high correspondence is readily apparent.</p>
+
+<p><span class="pagenum" id="Page_18">[18]</span></p>
+
+<h4 id="table1">TABLE 1&#x2060;<a id="FNanchor_10" href="#Footnote_10" class="fnanchor">[10]</a><br>
+<span class="smcap">Intelligence Quotients for All Periods Grouped by Children</span></h4>
+
+<p>The children are arranged by grade as they were in June, 1920, and alphabetically
+within the grade. The periods of testing are lettered in their chronological
+sequence; <i>a</i> is November, 1918, <i>b</i> is June, 1919, <i>c</i> is November, 1919 and <i>d</i> is
+June, 1920. * = Zero Score</p>
+
+<p class="center"><span class="smcap">Grade 3</span></p>
+
+<table class="borders">
+ <tr>
+ <th>Intelligence Quotient</th>
+ <th>Test Period</th>
+ <th>Arithmetic Quotient</th>
+ <th>Vocabulary Quotient</th>
+ <th>Reading Quotient</th>
+ <th>Completion Quotient</th>
+ </tr>
+ <tr class="group">
+ <td rowspan="4" class="tdr">101</td>
+ <td class="tdc"><i>a</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td class="tdc"><i>b</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td class="tdc"><i>c</i></td>
+ <td class="tdr">64</td>
+ <td class="tdr">58</td>
+ <td class="tdr"></td>
+ <td class="tdr">43</td>
+ </tr>
+ <tr>
+ <td class="tdc"><i>d</i></td>
+ <td class="tdr">106</td>
+ <td class="tdr">88</td>
+ <td class="tdr"></td>
+ <td class="tdr">93</td>
+ </tr>
+ <tr class="group">
+ <td rowspan="4" class="tdr">128</td>
+ <td class="tdc"><i>a</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td class="tdc"><i>b</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td class="tdc"><i>c</i></td>
+ <td class="tdr">80</td>
+ <td class="tdr">102</td>
+ <td class="tdr"></td>
+ <td class="tdr">81</td>
+ </tr>
+ <tr>
+ <td class="tdc"><i>d</i></td>
+ <td class="tdr"></td>
+ <td class="tdr">152</td>
+ <td class="tdr">124</td>
+ <td class="tdr">153</td>
+ </tr>
+ <tr class="group">
+ <td rowspan="4" class="tdr">116</td>
+ <td class="tdc"><i>a</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td class="tdc"><i>b</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td class="tdc"><i>c</i></td>
+ <td class="tdr">56</td>
+ <td class="tdr">90</td>
+ <td class="tdr">*</td>
+ <td class="tdr">49</td>
+ </tr>
+ <tr>
+ <td class="tdc"><i>d</i></td>
+ <td class="tdr">94</td>
+ <td class="tdr">95</td>
+ <td class="tdr">77</td>
+ <td class="tdr">89</td>
+ </tr>
+ <tr class="group">
+ <td rowspan="4" class="tdr">87</td>
+ <td class="tdc"><i>a</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td class="tdc"><i>b</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td class="tdc"><i>c</i></td>
+ <td class="tdr">90</td>
+ <td class="tdr">40</td>
+ <td class="tdr">35</td>
+ <td class="tdr">54</td>
+ </tr>
+ <tr>
+ <td class="tdc"><i>d</i></td>
+ <td class="tdr">72</td>
+ <td class="tdr">74</td>
+ <td class="tdr">61</td>
+ <td class="tdr">52</td>
+ </tr>
+ <tr class="group">
+ <td rowspan="4" class="tdr">112</td>
+ <td class="tdc"><i>a</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td class="tdc"><i>b</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td class="tdc"><i>c</i></td>
+ <td class="tdr">90</td>
+ <td class="tdr">137</td>
+ <td class="tdr">133</td>
+ <td class="tdr">112</td>
+ </tr>
+ <tr>
+ <td class="tdc"><i>d</i></td>
+ <td class="tdr">112</td>
+ <td class="tdr">113</td>
+ <td class="tdr">121</td>
+ <td class="tdr">131</td>
+ </tr>
+</table>
+
+<p><span class="pagenum" id="Page_19">[19]</span></p>
+
+<h4 id="table2">TABLE 2&#x2060;<a id="FNanchor_11" href="#Footnote_11" class="fnanchor">[11]</a><br>
+<span class="smcap">Group Taking All Tests at All Periods Arranged in Order of
+Magnitude of Intelligence Quotients</span></h4>
+
+<table class="borders">
+ <tr>
+ <th>Intelligence Quotients</th>
+ <th>Arithmetic Quotients</th>
+ <th>Vocabulary Quotients</th>
+ <th>Reading Quotients</th>
+ <th>Completion Quotients</th>
+ </tr>
+ <tr>
+ <td class="tdr">146</td>
+ <td class="tdr">111</td>
+ <td class="tdr">154</td>
+ <td class="tdr">164</td>
+ <td class="tdr">150</td>
+ </tr>
+ <tr>
+ <td class="tdr">142</td>
+ <td class="tdr">129</td>
+ <td class="tdr">135</td>
+ <td class="tdr">137</td>
+ <td class="tdr">136</td>
+ </tr>
+ <tr>
+ <td class="tdr">141</td>
+ <td class="tdr">109</td>
+ <td class="tdr">118</td>
+ <td class="tdr">107</td>
+ <td class="tdr">121</td>
+ </tr>
+ <tr>
+ <td class="tdr">139</td>
+ <td class="tdr">124</td>
+ <td class="tdr">141</td>
+ <td class="tdr">124</td>
+ <td class="tdr">134</td>
+ </tr>
+ <tr>
+ <td class="tdr">138</td>
+ <td class="tdr">101</td>
+ <td class="tdr">112</td>
+ <td class="tdr">105</td>
+ <td class="tdr">106</td>
+ </tr>
+ <tr class="group">
+ <td class="tdr">138</td>
+ <td class="tdr">121</td>
+ <td class="tdr">130</td>
+ <td class="tdr">110</td>
+ <td class="tdr">109</td>
+ </tr>
+ <tr>
+ <td class="tdr">130</td>
+ <td class="tdr">107</td>
+ <td class="tdr">139</td>
+ <td class="tdr">135</td>
+ <td class="tdr">136</td>
+ </tr>
+ <tr>
+ <td class="tdr">122</td>
+ <td class="tdr">127</td>
+ <td class="tdr">130</td>
+ <td class="tdr">124</td>
+ <td class="tdr">121</td>
+ </tr>
+ <tr>
+ <td class="tdr">122</td>
+ <td class="tdr">113</td>
+ <td class="tdr">121</td>
+ <td class="tdr">117</td>
+ <td class="tdr">124</td>
+ </tr>
+ <tr>
+ <td class="tdr">122</td>
+ <td class="tdr">112</td>
+ <td class="tdr">102</td>
+ <td class="tdr">114</td>
+ <td class="tdr">129</td>
+ </tr>
+ <tr class="group">
+ <td class="tdr">121</td>
+ <td class="tdr">128</td>
+ <td class="tdr">125</td>
+ <td class="tdr">128</td>
+ <td class="tdr">128</td>
+ </tr>
+ <tr>
+ <td class="tdr">120</td>
+ <td class="tdr">100</td>
+ <td class="tdr">116</td>
+ <td class="tdr">102</td>
+ <td class="tdr">119</td>
+ </tr>
+ <tr>
+ <td class="tdr">118</td>
+ <td class="tdr">117</td>
+ <td class="tdr">123</td>
+ <td class="tdr">114</td>
+ <td class="tdr">125</td>
+ </tr>
+ <tr>
+ <td class="tdr">117</td>
+ <td class="tdr">131</td>
+ <td class="tdr">111</td>
+ <td class="tdr">118</td>
+ <td class="tdr">124</td>
+ </tr>
+ <tr>
+ <td class="tdr">117</td>
+ <td class="tdr">106</td>
+ <td class="tdr">122</td>
+ <td class="tdr">112</td>
+ <td class="tdr">111</td>
+ </tr>
+ <tr class="group">
+ <td class="tdr">114</td>
+ <td class="tdr">105</td>
+ <td class="tdr">126</td>
+ <td class="tdr">110</td>
+ <td class="tdr">114</td>
+ </tr>
+ <tr>
+ <td class="tdr">109</td>
+ <td class="tdr">83</td>
+ <td class="tdr">113</td>
+ <td class="tdr">117</td>
+ <td class="tdr">103</td>
+ </tr>
+ <tr>
+ <td class="tdr">107</td>
+ <td class="tdr">103</td>
+ <td class="tdr">112</td>
+ <td class="tdr">95</td>
+ <td class="tdr">103</td>
+ </tr>
+ <tr>
+ <td class="tdr">107</td>
+ <td class="tdr">94</td>
+ <td class="tdr">126</td>
+ <td class="tdr">94</td>
+ <td class="tdr">123</td>
+ </tr>
+ <tr>
+ <td class="tdr">104</td>
+ <td class="tdr">99</td>
+ <td class="tdr">117</td>
+ <td class="tdr">96</td>
+ <td class="tdr">104</td>
+ </tr>
+ <tr class="group">
+ <td class="tdr">104</td>
+ <td class="tdr">103</td>
+ <td class="tdr">110</td>
+ <td class="tdr">94</td>
+ <td class="tdr">116</td>
+ </tr>
+ <tr>
+ <td class="tdr">103</td>
+ <td class="tdr">108</td>
+ <td class="tdr">113</td>
+ <td class="tdr">112</td>
+ <td class="tdr">106</td>
+ </tr>
+ <tr>
+ <td class="tdr">101</td>
+ <td class="tdr">100</td>
+ <td class="tdr">114</td>
+ <td class="tdr">109</td>
+ <td class="tdr">106</td>
+ </tr>
+ <tr>
+ <td class="tdr">100</td>
+ <td class="tdr">90</td>
+ <td class="tdr">103</td>
+ <td class="tdr">92</td>
+ <td class="tdr">92</td>
+ </tr>
+ <tr>
+ <td class="tdr">100</td>
+ <td class="tdr">109</td>
+ <td class="tdr">118</td>
+ <td class="tdr">108</td>
+ <td class="tdr">113</td>
+ </tr>
+ <tr class="group">
+ <td class="tdr">99</td>
+ <td class="tdr">114</td>
+ <td class="tdr">104</td>
+ <td class="tdr">106</td>
+ <td class="tdr">110</td>
+ </tr>
+ <tr>
+ <td class="tdr">99</td>
+ <td class="tdr">114</td>
+ <td class="tdr">119</td>
+ <td class="tdr">117</td>
+ <td class="tdr">115</td>
+ </tr>
+ <tr>
+ <td class="tdr">98</td>
+ <td class="tdr">102</td>
+ <td class="tdr">101</td>
+ <td class="tdr">108</td>
+ <td class="tdr">104</td>
+ </tr>
+ <tr>
+ <td class="tdr">98</td>
+ <td class="tdr">99</td>
+ <td class="tdr">106</td>
+ <td class="tdr">107</td>
+ <td class="tdr">106</td>
+ </tr>
+ <tr>
+ <td class="tdr">97</td>
+ <td class="tdr">95</td>
+ <td class="tdr">109</td>
+ <td class="tdr">107</td>
+ <td class="tdr">105</td>
+ </tr>
+ <tr class="group">
+ <td class="tdr">97</td>
+ <td class="tdr">108</td>
+ <td class="tdr">101</td>
+ <td class="tdr">102</td>
+ <td class="tdr">105<span class="pagenum" id="Page_20">[20]</span></td>
+ </tr>
+ <tr>
+ <td class="tdr">97</td>
+ <td class="tdr">95</td>
+ <td class="tdr">104</td>
+ <td class="tdr">89</td>
+ <td class="tdr">110</td>
+ </tr>
+ <tr>
+ <td class="tdr">96</td>
+ <td class="tdr">90</td>
+ <td class="tdr">104</td>
+ <td class="tdr">91</td>
+ <td class="tdr">91</td>
+ </tr>
+ <tr>
+ <td class="tdr">95</td>
+ <td class="tdr">84</td>
+ <td class="tdr">99</td>
+ <td class="tdr">93</td>
+ <td class="tdr">100</td>
+ </tr>
+ <tr>
+ <td class="tdr">95</td>
+ <td class="tdr">90</td>
+ <td class="tdr">107</td>
+ <td class="tdr">99</td>
+ <td class="tdr">105</td>
+ </tr>
+ <tr class="group">
+ <td class="tdr">95</td>
+ <td class="tdr">85</td>
+ <td class="tdr">117</td>
+ <td class="tdr">114</td>
+ <td class="tdr">103</td>
+ </tr>
+ <tr>
+ <td class="tdr">94</td>
+ <td class="tdr">106</td>
+ <td class="tdr">57</td>
+ <td class="tdr">89</td>
+ <td class="tdr">108</td>
+ </tr>
+ <tr>
+ <td class="tdr">94</td>
+ <td class="tdr">103</td>
+ <td class="tdr">103</td>
+ <td class="tdr">106</td>
+ <td class="tdr">104</td>
+ </tr>
+ <tr>
+ <td class="tdr">92</td>
+ <td class="tdr">96</td>
+ <td class="tdr">86</td>
+ <td class="tdr">94</td>
+ <td class="tdr">85</td>
+ </tr>
+ <tr>
+ <td class="tdr">87</td>
+ <td class="tdr">83</td>
+ <td class="tdr">88</td>
+ <td class="tdr">92</td>
+ <td class="tdr">87</td>
+ </tr>
+ <tr class="group">
+ <td class="tdr">87</td>
+ <td class="tdr">95</td>
+ <td class="tdr">96</td>
+ <td class="tdr">94</td>
+ <td class="tdr">102</td>
+ </tr>
+ <tr>
+ <td class="tdr">84</td>
+ <td class="tdr">85</td>
+ <td class="tdr">87</td>
+ <td class="tdr">93</td>
+ <td class="tdr">87</td>
+ </tr>
+ <tr>
+ <td class="tdr">83</td>
+ <td class="tdr">106</td>
+ <td class="tdr">91</td>
+ <td class="tdr">87</td>
+ <td class="tdr">104</td>
+ </tr>
+ <tr>
+ <td class="tdr">80</td>
+ <td class="tdr">77</td>
+ <td class="tdr">91</td>
+ <td class="tdr">80</td>
+ <td class="tdr">84</td>
+ </tr>
+ <tr>
+ <td class="tdr">80</td>
+ <td class="tdr">84</td>
+ <td class="tdr">75</td>
+ <td class="tdr">79</td>
+ <td class="tdr">84</td>
+ </tr>
+ <tr class="group">
+ <td class="tdr">80</td>
+ <td class="tdr">89</td>
+ <td class="tdr">107</td>
+ <td class="tdr">88</td>
+ <td class="tdr">86</td>
+ </tr>
+ <tr>
+ <td class="tdr">78</td>
+ <td class="tdr">87</td>
+ <td class="tdr">90</td>
+ <td class="tdr">93</td>
+ <td class="tdr">85</td>
+ </tr>
+ <tr>
+ <td class="tdr">60</td>
+ <td class="tdr">69</td>
+ <td class="tdr">56</td>
+ <td class="tdr">71</td>
+ <td class="tdr">77</td>
+ </tr>
+</table>
+
+<p>The intercorrelations of the quotients of these 48 cases for
+all periods may be seen in <a href="#table3">Table 3</a> (<a href="#Page_21">page 21</a>). The correlations with
+IQ and the intercorrelations of the SQ’s have increased toward
+positive unity or rather toward the limits of a correlation with
+tools of measurement such as we have used. This limit is a function
+of the reliability of the tests employed. It is customary to use a
+formula to correct for attenuation in order to find the percentage
+which the correlation is of the geometric mean of the two reliability
+coefficients. This is tantamount to saying that any correlation
+can go no higher than the geometric mean of the reliability
+coefficients of the tests used. It is better to assume that an <i>r</i>
+<span class="pagenum" id="Page_21">[21]</span>can go as high as the ∜(<i>r</i>₁₁⋅<i>r</i>₂₂) since an <i>r</i> can go as high as the
+square root of its reliability coefficient. Dr. Truman L. Kelley
+has shown that the correlation of a test with an infinite number of
+forms of the same test would be as the square root of its correlation
+with any one other form.</p>
+
+<p>The reliabilities and limits defining a limit as the fourth root of
+the multiplied reliability coefficients are in <a href="#table4">Table 4</a>.</p>
+
+<p>Correction for attenuation is often ridiculously high because
+the reliability coefficient of one of the measures used is so low. If
+an element is included in the two tests which are correlated, but
+not in the other forms of each test used to get reliability, the
+“corrected coefficient” is corrected for an element which is not
+chance. Whenever the geometric mean of the reliabilities is less
+than the obtained <i>r</i>, the corrected <i>r</i> is over 1.00 and hence absurd.&#x2060;<a id="FNanchor_12" href="#Footnote_12" class="fnanchor">[12]</a></p>
+
+<p>Therefore we use here instead, a comparison to the maximum
+possibility in a true sense. Since a test correlates with the
+“true ability” √(<i>r</i>₁₁), ∜(<i>r</i>₁₁⋅<i>r</i>₂₂) is the limit of an <i>r</i>, its optimum
+with those tools. Although these limits apply, strictly speaking,
+only to the total correlations, since the reliability correlations are
+with all the data; we may assume that the same facts hold with
+regard to the correlations of each of the grades, that is, the reliability
+is a function of the test not of the data selected.</p>
+
+<h4 id="table3">TABLE 3<br>
+<span class="smcap">Intercorrelation of All Quotients for All Periods of the 48 Children
+Who Took All Tests</span></h4>
+
+<table>
+ <tr>
+ <th colspan="7"><span class="smcap">November, 1918</span></th>
+ </tr>
+ <tr>
+ <th></th>
+ <th>IQ</th>
+ <th></th>
+ <th>VQ</th>
+ <th>RQ</th>
+ <th>S.D.</th>
+ <th>M</th>
+ </tr>
+ <tr>
+ <td>IQ</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">19.12</td>
+ <td class="tdr">105.15</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">±1.32</td>
+ <td class="tdr">±1.86</td>
+ </tr>
+ <tr>
+ <td>VQ</td>
+ <td class="tdr">.72</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">20.54</td>
+ <td class="tdr">102.52</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr">±.05</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">±1.41</td>
+ <td class="tdr">±2.00</td>
+ </tr>
+ <tr>
+ <td>RQ</td>
+ <td class="tdr">.64</td>
+ <td class="tdr"></td>
+ <td class="tdr">.64</td>
+ <td class="tdr"></td>
+ <td class="tdr">19.09</td>
+ <td class="tdr">95.90</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr">±.06</td>
+ <td class="tdr"></td>
+ <td class="tdr">±.06</td>
+ <td class="tdr"></td>
+ <td class="tdr">±1.31</td>
+ <td class="tdr">±1.86</td>
+ </tr>
+ <tr>
+ <td>CQ</td>
+ <td class="tdr">.63</td>
+ <td class="tdr"></td>
+ <td class="tdr">.71</td>
+ <td class="tdr">.77</td>
+ <td class="tdr">19.34</td>
+ <td class="tdr">99.44</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr">±.06</td>
+ <td class="tdr"></td>
+ <td class="tdr">±.05</td>
+ <td class="tdr">±.04</td>
+ <td class="tdr">±1.33</td>
+ <td class="tdr">±1.88<span class="pagenum" id="Page_22">[22]</span></td>
+ </tr>
+ <tr>
+ <th colspan="7"><span class="smcap">June, 1919</span></th>
+ </tr>
+ <tr>
+ <th></th>
+ <th>IQ</th>
+ <th></th>
+ <th>VQ</th>
+ <th>RQ</th>
+ <th>S.D.</th>
+ <th>M</th>
+ </tr>
+ <tr>
+ <td>IQ</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">19.12</td>
+ <td class="tdr">105.15</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">±1.32</td>
+ <td class="tdr">±1.86</td>
+ </tr>
+ <tr>
+ <td>VQ</td>
+ <td class="tdr">.73</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">20.80</td>
+ <td class="tdr">113.54</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr">±.05</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">±1.43</td>
+ <td class="tdr">±2.02</td>
+ </tr>
+ <tr>
+ <td>RQ</td>
+ <td class="tdr">.65</td>
+ <td class="tdr"></td>
+ <td class="tdr">.58</td>
+ <td class="tdr"></td>
+ <td class="tdr">14.73</td>
+ <td class="tdr">101.31</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr">±.06</td>
+ <td class="tdr"></td>
+ <td class="tdr">±.06</td>
+ <td class="tdr"></td>
+ <td class="tdr">±1.01</td>
+ <td class="tdr">±1.43</td>
+ </tr>
+ <tr>
+ <td>CQ</td>
+ <td class="tdr">.62</td>
+ <td class="tdr"></td>
+ <td class="tdr">.68</td>
+ <td class="tdr">.77</td>
+ <td class="tdr">19.76</td>
+ <td class="tdr">101.04</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr">±.06</td>
+ <td class="tdr"></td>
+ <td class="tdr">±.05</td>
+ <td class="tdr">+.04</td>
+ <td class="tdr">±1.36</td>
+ <td class="tdr">±1.92</td>
+ </tr>
+ <tr>
+ <th colspan="7"><span class="smcap">November, 1919</span></th>
+ </tr>
+ <tr>
+ <th></th>
+ <th>IQ</th>
+ <th>AQ</th>
+ <th>VQ</th>
+ <th>RQ</th>
+ <th>S.D.</th>
+ <th>M</th>
+ </tr>
+ <tr>
+ <td>IQ</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">19.12</td>
+ <td class="tdr">105.15</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">±1.32</td>
+ <td class="tdr">±1.86</td>
+ </tr>
+ <tr>
+ <td>AQ</td>
+ <td class="tdr">.46</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">14.08</td>
+ <td class="tdr">102.90</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr">±.08</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">±0.97</td>
+ <td class="tdr">±1.37</td>
+ </tr>
+ <tr>
+ <td>VQ</td>
+ <td class="tdr">.86</td>
+ <td class="tdr">.23</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">17.07</td>
+ <td class="tdr">109.17</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr">±.03</td>
+ <td class="tdr">±.09</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">±1.18</td>
+ <td class="tdr">±1.66</td>
+ </tr>
+ <tr>
+ <td>RQ</td>
+ <td class="tdr">.65</td>
+ <td class="tdr">.56</td>
+ <td class="tdr">.71</td>
+ <td class="tdr"></td>
+ <td class="tdr">13.91</td>
+ <td class="tdr">101.42</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr">±.06</td>
+ <td class="tdr">±.07</td>
+ <td class="tdr">±.05</td>
+ <td class="tdr"></td>
+ <td class="tdr">±0.96</td>
+ <td class="tdr">±1.35</td>
+ </tr>
+ <tr>
+ <td>CQ</td>
+ <td class="tdr">.79</td>
+ <td class="tdr">.47</td>
+ <td class="tdr">.83</td>
+ <td class="tdr">.82</td>
+ <td class="tdr">17.53</td>
+ <td class="tdr">105.21</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr">±.04</td>
+ <td class="tdr">±.08</td>
+ <td class="tdr">±.03</td>
+ <td class="tdr">±.03</td>
+ <td class="tdr">±1.21</td>
+ <td class="tdr">±1.71</td>
+ </tr>
+ <tr>
+ <th colspan="7"><span class="smcap">June, 1920</span></th>
+ </tr>
+ <tr>
+ <th></th>
+ <th>IQ</th>
+ <th>AQ</th>
+ <th>VQ</th>
+ <th>RQ</th>
+ <th>S.D.</th>
+ <th>M</th>
+ </tr>
+ <tr>
+ <td>IQ</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">19.12</td>
+ <td class="tdr">105.15</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">±1.32</td>
+ <td class="tdr">±1.86</td>
+ </tr>
+ <tr>
+ <td>AQ</td>
+ <td class="tdr">.73</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">14.10</td>
+ <td class="tdr">101.79</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr">±.05</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">±0.97</td>
+ <td class="tdr">±1.37</td>
+ </tr>
+ <tr>
+ <td>VQ</td>
+ <td class="tdr">.81</td>
+ <td class="tdr">.60</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">18.89</td>
+ <td class="tdr">108.94</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr">±.03</td>
+ <td class="tdr">±.06</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">±1.30</td>
+ <td class="tdr">±1.84</td>
+ </tr>
+ <tr>
+ <td>RQ</td>
+ <td class="tdr">.79</td>
+ <td class="tdr">.68</td>
+ <td class="tdr">.87</td>
+ <td class="tdr"></td>
+ <td class="tdr">16.43</td>
+ <td class="tdr">104.94</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr">±.04</td>
+ <td class="tdr">±.05</td>
+ <td class="tdr">±.02</td>
+ <td class="tdr"></td>
+ <td class="tdr">±1.13</td>
+ <td class="tdr">±1.60</td>
+ </tr>
+ <tr>
+ <td>CQ</td>
+ <td class="tdr">.84</td>
+ <td class="tdr">.77</td>
+ <td class="tdr">.78</td>
+ <td class="tdr">.84</td>
+ <td class="tdr">15.87</td>
+ <td class="tdr">108.08</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr">±.03</td>
+ <td class="tdr">±.04</td>
+ <td class="tdr">±.04</td>
+ <td class="tdr">±.03</td>
+ <td class="tdr">±1.09</td>
+ <td class="tdr">±1.54</td>
+ </tr>
+</table>
+
+<p><span class="pagenum" id="Page_23">[23]</span></p>
+
+<h4 id="table4">TABLE 4<br>
+<span class="smcap">Reliability Coefficients</span></h4>
+
+<table>
+ <tr>
+ <th></th>
+ <th>One Form of Each Test</th>
+ <th>Two Forms of Each Test (by Brown’s Formula)</th>
+ <th>One Form with an Infinite Number of Forms</th>
+ <th>Two Forms with an Infinite Number of Forms</th>
+ </tr>
+ <tr>
+ <th></th>
+ <th><i>r</i>₁₁</th>
+ <th><i>r</i>₁₁</th>
+ <th>√<i>r</i>₁₁</th>
+ <th>√<i>r</i>₁₁</th>
+ </tr>
+ <tr>
+ <td class="nw">Intelligence Quotient</td>
+ <td class="tdr">.888</td>
+ <td class="tdr"></td>
+ <td class="tdr">.942</td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td></td>
+ <td colspan="4">(by Brown’s Formula)&#x2060;<a id="FNanchor_13" href="#Footnote_13" class="fnanchor">[13]</a></td>
+ </tr>
+ <tr>
+ <td class="nw">Arithmetic Quotient</td>
+ <td class="tdr">.824</td>
+ <td class="tdr">.904</td>
+ <td class="tdr">.908</td>
+ <td class="tdr">.951</td>
+ </tr>
+ <tr>
+ <td class="nw">Vocabulary Quotient</td>
+ <td class="tdr">.820</td>
+ <td class="tdr">.901</td>
+ <td class="tdr">.906</td>
+ <td class="tdr">.949</td>
+ </tr>
+ <tr>
+ <td class="nw">Reading Quotient</td>
+ <td class="tdr">.866</td>
+ <td class="tdr">.928</td>
+ <td class="tdr">.931</td>
+ <td class="tdr">.963</td>
+ </tr>
+ <tr>
+ <td class="nw">Completion Quotient</td>
+ <td class="tdr">.883</td>
+ <td class="tdr">.938</td>
+ <td class="tdr">.940</td>
+ <td class="tdr">.968</td>
+ </tr>
+</table>
+
+<p class="center">Limits of the <i>r</i>’s = ∜(<i>r</i>₁₁ × <i>r</i>₂₂)</p>
+
+<table>
+ <tr>
+ <th></th>
+ <th>Nov. 1918,<br>June and<br>Nov. 1919</th>
+ <th>June 1920</th>
+ </tr>
+ <tr>
+ <td>IQ and AQ</td>
+ <td class="tdr">.925</td>
+ <td class="tdr">.946</td>
+ </tr>
+ <tr>
+ <td>IQ and VQ</td>
+ <td class="tdr">.924</td>
+ <td class="tdr">.946</td>
+ </tr>
+ <tr>
+ <td>IQ and RQ</td>
+ <td class="tdr">.936</td>
+ <td class="tdr">.953</td>
+ </tr>
+ <tr>
+ <td>IQ and CQ</td>
+ <td class="tdr">.941</td>
+ <td class="tdr">.955</td>
+ </tr>
+</table>
+
+<p class="note">The limits of the June, 1920 <i>r</i>’s are naturally somewhat larger than
+the others since two forms of tests (except the Binet) were used; the
+unreliability of the quantitative indices is therefore lower and hence
+the correlation with IQ may be larger.</p>
+
+<p>The correlations in 1920 of another group—the whole school
+except Grade III—are reproduced in <a href="#table5">Table 5</a>. Grade III was
+excluded since here there had as yet been little chance to push the
+<i>r</i>’s. Partials were obtained with these data (<a href="#table6">Table 6</a>). Little
+faith may be placed in the relative sizes of these partials, much
+because the <i>r</i><sub>VQ.RQ</sub> is here only .73 and, in the data presented
+in <a href="#table3">Table 3</a>, it is .87. This is due to the fact that the data in
+<a href="#table3">Table 3</a> cover all periods (2 years) while those in <a href="#table5">Table 5</a> cover
+only one. This difference has comparatively slight influence on
+our general conclusions; but it makes a huge difference in the correlation
+of RQ and VQ when IQ is rendered constant, whether
+the one or the other set of data is used. Moreover, the whole
+logic of arguing for general factors by reduction of partial correlations
+from the original <i>r</i> has been called gravely into question
+in Godfrey H. Thomson’s recent work on this subject: “The Proof
+or Disproof of the Existence of General Ability.” Thomson shows
+that partial correlation gives one possible interpretation of the
+facts, but not an inevitable one. Thus we cannot say that because
+RQ and IQ and RQ and AQ are highly correlated, correlation
+of IQ and AQ is dependent upon RQ. We can say, however,
+that it is likely to be. IQ and AQ may be correlated by reason of
+inclusion of some element not included at all in RQ. The higher
+the correlations which we deal with the less we need worry about
+this, and of course correlations of unity exclude any such consideration.</p>
+
+<p><span class="pagenum" id="Page_24">[24]</span></p>
+
+<h4 id="table5">TABLE 5<br>
+<span class="smcap">Intercorrelation of All Quotients in June, 1920. All Children
+Exclusive of Grade 3 are Here Represented</span></h4>
+
+<p class="center">The P.E.’s are all less than .05</p>
+
+<p class="center"><i>N</i> = 81</p>
+
+<table>
+ <tr>
+ <th></th>
+ <th>IQ</th>
+ <th>Arithmetic<br>Quotient</th>
+ <th>Vocabulary<br>Quotient</th>
+ <th>Reading<br>Quotient</th>
+ </tr>
+ <tr>
+ <td class="nw">Arithmetic Quotient</td>
+ <td class="tdr">.733</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td class="nw">Vocabulary Quotient</td>
+ <td class="tdr">.837</td>
+ <td class="tdr">.628</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td class="nw">Reading Quotient</td>
+ <td class="tdr">.758</td>
+ <td class="tdr">.694</td>
+ <td class="tdr">.734</td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td class="nw">Completion Quotient</td>
+ <td class="tdr">.821</td>
+ <td class="tdr">.770</td>
+ <td class="tdr">.825</td>
+ <td class="tdr">.801</td>
+ </tr>
+</table>
+
+<p>I therefore draw no conclusions from the comparative size of
+these partials, nor do I get partials with any of the other data,
+and rest the case mainly on the high <i>r</i>’s between IQ and SQ’s in
+1920; increase in correspondence of the central tendencies and
+range of the SQ’s by grade with the central tendency and range
+<span class="pagenum" id="Page_25">[25]</span>of the IQ’s of the same data; small intercorrelation of SR’s and
+negative correlation of AccR with IQ.</p>
+
+<p>The general lowness of the partials (<a href="#table6">Table 6</a>) does, however,
+indicate the great causative relation between IQ and disparity
+of product. The elements still in here are common elements in
+the tests and the mistreatment of intelligence.</p>
+
+<h4 id="table6">TABLE 6<br>
+<span class="smcap">Partial Correlations of Quotients Irrespective of Intelligence
+Quotients</span></h4>
+
+<p class="center"><i>N</i> = 81</p>
+
+<table>
+ <tr>
+ <th></th>
+ <th>Arithmetic<br>Quotient</th>
+ <th>Vocabulary<br>Quotient</th>
+ <th>Reading<br>Quotient</th>
+ </tr>
+ <tr>
+ <td class="nw" rowspan="2">Vocabulary Quotient</td>
+ <td class="tdr">.04</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td class="tdr">±.07</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td class="nw" rowspan="2">Reading Quotient</td>
+ <td class="tdr">.31</td>
+ <td class="tdr">.28</td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td class="tdr">±.07</td>
+ <td class="tdr">±.07</td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td class="nw" rowspan="2">Completion Quotient</td>
+ <td class="tdr">.43</td>
+ <td class="tdr">.44</td>
+ <td class="tdr">.47</td>
+ </tr>
+ <tr>
+ <td class="tdr">±.08</td>
+ <td class="tdr">±.06</td>
+ <td class="tdr">±.06</td>
+ </tr>
+</table>
+
+<p>What happened by grade in 1918-1919 is summarized in <a href="#table7">Table
+7</a>. What happened by grade in 1919-1920 is summarized in <a href="#table8">Table
+8</a>. Since there were many changes in personnel from 1918-1919
+to 1919-1920, we need expect no continuity from <a href="#table7">Table 7</a> to <a href="#table8">Table
+8</a>. For the continuous influence of the two years, see <a href="#table3">Table 3</a>,
+which includes 48 children taking all tests at all periods.</p>
+
+<h4 id="table7">TABLE 7<br>
+<span class="smcap">All Correlations, Means, and Standard Deviations by Grade, Showing
+Progress from November, 1918 to June, 1919</span></h4>
+
+<ul>
+ <li>I stands for Intelligence Quotient</li>
+ <li>V stands for Vocabulary Quotient</li>
+ <li>R stands for Reading Quotient</li>
+ <li>C stands for Completion Quotient</li>
+</ul>
+
+<table>
+ <tr>
+ <th rowspan="2">GRADE</th>
+ <th rowspan="2"></th>
+ <th colspan="2"><i>r</i></th>
+ <th></th>
+ <th colspan="2">M</th>
+ <th></th>
+ <th colspan="2">S.D.</th>
+ </tr>
+ <tr>
+ <th>Nov.</th>
+ <th>June</th>
+ <th></th>
+ <th>Nov.</th>
+ <th>June</th>
+ <th></th>
+ <th>Nov.</th>
+ <th>June</th>
+ </tr>
+ <tr>
+ <td>III</td>
+ <td class="tdc">I V</td>
+ <td class="tdr">.467</td>
+ <td class="tdr">.633</td>
+ <td class="tdc">I</td>
+ <td class="tdr">109.89</td>
+ <td class="tdr">113.20</td>
+ <td class="tdc">I</td>
+ <td class="tdr">12.83</td>
+ <td class="tdr">15.49</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.12</td>
+ <td class="tdr">±.07</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.98</td>
+ <td class="tdr">±1.91</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.40</td>
+ <td class="tdr">±1.35</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I R</td>
+ <td class="tdr">.541</td>
+ <td class="tdr">.492</td>
+ <td class="tdc">V</td>
+ <td class="tdr">96.11</td>
+ <td class="tdr">109.90</td>
+ <td class="tdc">V</td>
+ <td class="tdr">21.21</td>
+ <td class="tdr">18.69</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.11</td>
+ <td class="tdr">±.09</td>
+ <td class="tdc"></td>
+ <td class="tdr">±3.28</td>
+ <td class="tdr">±2.30</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.32</td>
+ <td class="tdr">±1.63</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I C</td>
+ <td class="tdr">.641</td>
+ <td class="tdr">.386</td>
+ <td class="tdc">R</td>
+ <td class="tdr">82.26</td>
+ <td class="tdr">101.40</td>
+ <td class="tdc">R</td>
+ <td class="tdr">22.58</td>
+ <td class="tdr">15.85</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.09</td>
+ <td class="tdr">±.11</td>
+ <td class="tdc"></td>
+ <td class="tdr">±3.49</td>
+ <td class="tdr">±1.95</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.47</td>
+ <td class="tdr">±1.38</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc">C</td>
+ <td class="tdr">86.89</td>
+ <td class="tdr">108.40</td>
+ <td class="tdc">C</td>
+ <td class="tdr">22.76</td>
+ <td class="tdr">15.79</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr">±3.52</td>
+ <td class="tdr">±1.94</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.49</td>
+ <td class="tdr">±1.37</td>
+ </tr>
+ <tr class="bb">
+ <td class="tdr"><i>N</i> =</td>
+ <td class="tdc"></td>
+ <td class="tdr">19</td>
+ <td class="tdr">30</td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"><span class="pagenum" id="Page_26">[26]</span></td>
+ </tr>
+ <tr>
+ <td>IV</td>
+ <td class="tdc">I V</td>
+ <td class="tdr">.724</td>
+ <td class="tdr">.819</td>
+ <td class="tdc">I</td>
+ <td class="tdr">105.90</td>
+ <td class="tdr">104.82</td>
+ <td class="tdc">I</td>
+ <td class="tdr">18.08</td>
+ <td class="tdr">18.21</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.07</td>
+ <td class="tdr">±.05</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.73</td>
+ <td class="tdr">±2.98</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.93</td>
+ <td class="tdr">±2.11</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I R</td>
+ <td class="tdr">.665</td>
+ <td class="tdr">.845</td>
+ <td class="tdc">V</td>
+ <td class="tdr">97.20</td>
+ <td class="tdr">108.53</td>
+ <td class="tdc">V</td>
+ <td class="tdr">17.26</td>
+ <td class="tdr">24.92</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.08</td>
+ <td class="tdr">±.05</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.60</td>
+ <td class="tdr">±4.08</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.84</td>
+ <td class="tdr">±2.88</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I C</td>
+ <td class="tdr">.596</td>
+ <td class="tdr">.717</td>
+ <td class="tdc">R</td>
+ <td class="tdr">91.06</td>
+ <td class="tdr">107.82</td>
+ <td class="tdc">R</td>
+ <td class="tdr">27.85</td>
+ <td class="tdr">10.35</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.10</td>
+ <td class="tdr">±.08</td>
+ <td class="tdc"></td>
+ <td class="tdr">±4.20</td>
+ <td class="tdr">±1.69</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.97</td>
+ <td class="tdr">±1.20</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc">C</td>
+ <td class="tdr">101.45</td>
+ <td class="tdr">108.12</td>
+ <td class="tdc">C</td>
+ <td class="tdr">21.53</td>
+ <td class="tdr">17.75</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr">±3.25</td>
+ <td class="tdr">±2.90</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.30</td>
+ <td class="tdr">±2.05</td>
+ </tr>
+ <tr class="bb">
+ <td class="tdr"><i>N</i> =</td>
+ <td class="tdc"></td>
+ <td class="tdr">20</td>
+ <td class="tdr">17</td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td>V</td>
+ <td class="tdc">I V</td>
+ <td class="tdr">.887</td>
+ <td class="tdr">.822</td>
+ <td class="tdc">I</td>
+ <td class="tdr">101.64</td>
+ <td class="tdr">99.42</td>
+ <td class="tdc">I</td>
+ <td class="tdr">24.76</td>
+ <td class="tdr">17.63</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.04</td>
+ <td class="tdr">±.05</td>
+ <td class="tdc"></td>
+ <td class="tdr">±3.56</td>
+ <td class="tdr">±2.73</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.52</td>
+ <td class="tdr">±1.93</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I R</td>
+ <td class="tdr">.799</td>
+ <td class="tdr">.832</td>
+ <td class="tdc">V</td>
+ <td class="tdr">100.59</td>
+ <td class="tdr">111.58</td>
+ <td class="tdc">V</td>
+ <td class="tdr">26.71</td>
+ <td class="tdr">19.78</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.05</td>
+ <td class="tdr">±.05</td>
+ <td class="tdc"></td>
+ <td class="tdr">±3.84</td>
+ <td class="tdr">±3.06</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.72</td>
+ <td class="tdr">±2.16</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I C</td>
+ <td class="tdr">.818</td>
+ <td class="tdr">.890</td>
+ <td class="tdc">R</td>
+ <td class="tdr">94.59</td>
+ <td class="tdr">101.42</td>
+ <td class="tdc">R</td>
+ <td class="tdr">22.10</td>
+ <td class="tdr">12.56</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.05</td>
+ <td class="tdr">±.03</td>
+ <td class="tdc"></td>
+ <td class="tdr">±3.18</td>
+ <td class="tdr">±1.94</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.25</td>
+ <td class="tdr">±1.37</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc">C</td>
+ <td class="tdr">97.00</td>
+ <td class="tdr">102.68</td>
+ <td class="tdc">C</td>
+ <td class="tdr">22.52</td>
+ <td class="tdr">17.71</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr">±3.24</td>
+ <td class="tdr">±2.74</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.29</td>
+ <td class="tdr">±1.94</td>
+ </tr>
+ <tr class="bb">
+ <td class="tdr"><i>N</i> =</td>
+ <td class="tdc"></td>
+ <td class="tdr">22</td>
+ <td class="tdr">19</td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td>VI</td>
+ <td class="tdc">I V</td>
+ <td class="tdr">.793</td>
+ <td class="tdr">.772</td>
+ <td class="tdc">I</td>
+ <td class="tdr">109.90</td>
+ <td class="tdr">115.90</td>
+ <td class="tdc">I</td>
+ <td class="tdr">23.45</td>
+ <td class="tdr">24.38</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.08</td>
+ <td class="tdr">±.09</td>
+ <td class="tdc"></td>
+ <td class="tdr">±5.00</td>
+ <td class="tdr">±5.20</td>
+ <td class="tdc"></td>
+ <td class="tdr">±3.54</td>
+ <td class="tdr">±3.68</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I R</td>
+ <td class="tdr">.497</td>
+ <td class="tdr">.726</td>
+ <td class="tdc">V</td>
+ <td class="tdr">108.00</td>
+ <td class="tdr">126.80</td>
+ <td class="tdc">V</td>
+ <td class="tdr">30.20</td>
+ <td class="tdr">25.25</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.16</td>
+ <td class="tdr">±.10</td>
+ <td class="tdc"></td>
+ <td class="tdr">±6.44</td>
+ <td class="tdr">±5.39</td>
+ <td class="tdc"></td>
+ <td class="tdr">±4.55</td>
+ <td class="tdr">±3.81</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I C</td>
+ <td class="tdr">.798</td>
+ <td class="tdr">.891</td>
+ <td class="tdc">R</td>
+ <td class="tdr">103.10</td>
+ <td class="tdr">107.20</td>
+ <td class="tdc">R</td>
+ <td class="tdr">13.77</td>
+ <td class="tdr">20.62</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.08</td>
+ <td class="tdr">±.04</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.94</td>
+ <td class="tdr">±4.40</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.08</td>
+ <td class="tdr">±3.11</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc">C</td>
+ <td class="tdr">108.90</td>
+ <td class="tdr">117.10</td>
+ <td class="tdc">C</td>
+ <td class="tdr">15.23</td>
+ <td class="tdr">18.81</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr">±3.25</td>
+ <td class="tdr">±4.01</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.30</td>
+ <td class="tdr">±2.84</td>
+ </tr>
+ <tr class="bb">
+ <td class="tdr"><i>N</i> =</td>
+ <td class="tdc"></td>
+ <td class="tdr">10</td>
+ <td class="tdr">10</td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td>VII and VIII</td>
+ <td class="tdc">I V</td>
+ <td class="tdr">.625</td>
+ <td class="tdr">.504</td>
+ <td class="tdc">I</td>
+ <td class="tdr">99.29</td>
+ <td class="tdr">98.92</td>
+ <td class="tdc">I</td>
+ <td class="tdr">11.11</td>
+ <td class="tdr">11.45</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.11</td>
+ <td class="tdr">±.14</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.00</td>
+ <td class="tdr">±2.14</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.42</td>
+ <td class="tdr">±1.51</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I R</td>
+ <td class="tdr">.622</td>
+ <td class="tdr">.709</td>
+ <td class="tdc">V</td>
+ <td class="tdr">109.43</td>
+ <td class="tdr">115.23</td>
+ <td class="tdc">V</td>
+ <td class="tdr">14.07</td>
+ <td class="tdr">17.43</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.11</td>
+ <td class="tdr">±.09</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.54</td>
+ <td class="tdr">±2.95</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.79</td>
+ <td class="tdr">±2.31<span class="pagenum" id="Page_27">[27]</span></td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I C</td>
+ <td class="tdr">.782</td>
+ <td class="tdr">.730</td>
+ <td class="tdc">R</td>
+ <td class="tdr">97.00</td>
+ <td class="tdr">98.85</td>
+ <td class="tdc">R</td>
+ <td class="tdr">12.59</td>
+ <td class="tdr">15.77</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.07</td>
+ <td class="tdr">±.09</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.27</td>
+ <td class="tdr">±3.26</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.61</td>
+ <td class="tdr">±2.09</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc">C</td>
+ <td class="tdr">102.43</td>
+ <td class="tdr">95.85</td>
+ <td class="tdc">C</td>
+ <td class="tdr">13.49</td>
+ <td class="tdr">17.72</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.43</td>
+ <td class="tdr">±3.31</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.72</td>
+ <td class="tdr">±2.34</td>
+ </tr>
+ <tr class="bb">
+ <td class="tdr"><i>N</i> =</td>
+ <td class="tdc"></td>
+ <td class="tdr">14</td>
+ <td class="tdr">13</td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td><span class="smcap">Total</span></td>
+ <td class="tdc">I V</td>
+ <td class="tdr">.685</td>
+ <td class="tdr">.680</td>
+ <td class="tdc">I</td>
+ <td class="tdr">105.07</td>
+ <td class="tdr">106.88</td>
+ <td class="tdc">I</td>
+ <td class="tdr">19.34</td>
+ <td class="tdr">18.45</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.04</td>
+ <td class="tdr">±.04</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.41</td>
+ <td class="tdr">±1.32</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.00</td>
+ <td class="tdr">±0.93</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I R</td>
+ <td class="tdr">.568</td>
+ <td class="tdr">.626</td>
+ <td class="tdc">V</td>
+ <td class="tdr">101.12</td>
+ <td class="tdr">112.67</td>
+ <td class="tdc">V</td>
+ <td class="tdr">22.83</td>
+ <td class="tdr">21.58</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.05</td>
+ <td class="tdr">±.04</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.67</td>
+ <td class="tdr">±1.54</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.18</td>
+ <td class="tdr">±1.09</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I C</td>
+ <td class="tdr">.639</td>
+ <td class="tdr">.702</td>
+ <td class="tdc">R</td>
+ <td class="tdr">92.40</td>
+ <td class="tdr">102.91</td>
+ <td class="tdc">R</td>
+ <td class="tdr">22.65</td>
+ <td class="tdr">15.27</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.04</td>
+ <td class="tdr">±.04</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.66</td>
+ <td class="tdr">±1.09</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.17</td>
+ <td class="tdr">±0.77</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc">C</td>
+ <td class="tdr">98.08</td>
+ <td class="tdr">106.27</td>
+ <td class="tdc">C</td>
+ <td class="tdr">21.48</td>
+ <td class="tdr">18.19</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.57</td>
+ <td class="tdr">±1.30</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.11</td>
+ <td class="tdr">±0.92</td>
+ </tr>
+ <tr class="bb">
+ <td class="tdr"><i>N</i> =</td>
+ <td class="tdc"></td>
+ <td class="tdr">85</td>
+ <td class="tdr">89</td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+</table>
+
+<h4 id="table8">TABLE 8<br>
+<span class="smcap">All Correlations, Means, and Standard Deviations of Quotients by
+Grade, Showing Progress from November, 1919 to June, 1920</span></h4>
+
+<ul>
+ <li>I stands for Intelligence Quotient</li>
+ <li>V stands for Vocabulary Quotient</li>
+ <li>R stands for Reading Quotient</li>
+ <li>C stands for Completion Quotient</li>
+ <li>A stands for Arithmetic Quotient</li>
+</ul>
+
+<table>
+ <tr>
+ <th rowspan="2"></th>
+ <th></th>
+ <th colspan="2"><i>r</i></th>
+ <th></th>
+ <th colspan="2">M</th>
+ <th></th>
+ <th colspan="2">S.D.</th>
+ </tr>
+ <tr>
+ <th></th>
+ <th>Nov.</th>
+ <th>June</th>
+ <th></th>
+ <th>Nov.</th>
+ <th>June</th>
+ <th></th>
+ <th>Nov.</th>
+ <th>June</th>
+ </tr>
+ <tr>
+ <td>III</td>
+ <td class="tdc">I A</td>
+ <td class="tdr">.413</td>
+ <td class="tdr">.709</td>
+ <td class="tdc">I</td>
+ <td class="tdr">102.00</td>
+ <td class="tdr">105.53</td>
+ <td class="tdc">I</td>
+ <td class="tdr">9.60</td>
+ <td class="tdr">10.89</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.16</td>
+ <td class="tdr">±.08</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.87</td>
+ <td class="tdr">±1.68</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.32</td>
+ <td class="tdr">±1.19</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I V</td>
+ <td class="tdr">.649</td>
+ <td class="tdr">.667</td>
+ <td class="tdc">A</td>
+ <td class="tdr">82.75</td>
+ <td class="tdr">97.84</td>
+ <td class="tdc">A</td>
+ <td class="tdr">15.88</td>
+ <td class="tdr">18.62</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.11</td>
+ <td class="tdr">±.09</td>
+ <td class="tdc"></td>
+ <td class="tdr">±3.09</td>
+ <td class="tdr">±2.88</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.19</td>
+ <td class="tdr">±2.04</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I R</td>
+ <td class="tdr">.651</td>
+ <td class="tdr">.609</td>
+ <td class="tdc">V</td>
+ <td class="tdr">94.00</td>
+ <td class="tdr">103.47</td>
+ <td class="tdc">V</td>
+ <td class="tdr">33.44</td>
+ <td class="tdr">27.66</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.11</td>
+ <td class="tdr">±.10</td>
+ <td class="tdc"></td>
+ <td class="tdr">±6.51</td>
+ <td class="tdr">±4.28</td>
+ <td class="tdc"></td>
+ <td class="tdr">±4.60</td>
+ <td class="tdr">±3.03<span class="pagenum" id="Page_28">[28]</span></td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I C</td>
+ <td class="tdr">.612</td>
+ <td class="tdr">.719</td>
+ <td class="tdc">R</td>
+ <td class="tdr">87.59</td>
+ <td class="tdr">93.88</td>
+ <td class="tdc">R</td>
+ <td class="tdr">32.06</td>
+ <td class="tdr">19.02</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.12</td>
+ <td class="tdr">±.07</td>
+ <td class="tdc"></td>
+ <td class="tdr">±6.24</td>
+ <td class="tdr">±3.21</td>
+ <td class="tdc"></td>
+ <td class="tdr">±4.41</td>
+ <td class="tdr">±2.27</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc">C</td>
+ <td class="tdr">90.17</td>
+ <td class="tdr">96.84</td>
+ <td class="tdc">C</td>
+ <td class="tdr">28.82</td>
+ <td class="tdr">25.59</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr">±5.58</td>
+ <td class="tdr">±3.96</td>
+ <td class="tdc"></td>
+ <td class="tdr">±3.95</td>
+ <td class="tdr">±2.80</td>
+ </tr>
+ <tr class="bb">
+ <td class="tdr"><i>N</i> =</td>
+ <td class="tdc"></td>
+ <td class="tdr">12</td>
+ <td class="tdr">19</td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td>IV</td>
+ <td class="tdc">I A</td>
+ <td class="tdr">.426</td>
+ <td class="tdr">.725</td>
+ <td class="tdc">I</td>
+ <td class="tdr">111.48</td>
+ <td class="tdr">113.00</td>
+ <td class="tdc">I</td>
+ <td class="tdr">14.73</td>
+ <td class="tdr">15.04</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.10</td>
+ <td class="tdr">±.06</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.85</td>
+ <td class="tdr">±1.93</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.30</td>
+ <td class="tdr">±1.36</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I V</td>
+ <td class="tdr">.635</td>
+ <td class="tdr">.772</td>
+ <td class="tdc">A</td>
+ <td class="tdr">94.07</td>
+ <td class="tdr">111.08</td>
+ <td class="tdc">A</td>
+ <td class="tdr">12.34</td>
+ <td class="tdr">15.02</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.075</td>
+ <td class="tdr">±.05</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.55</td>
+ <td class="tdr">±1.99</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.09</td>
+ <td class="tdr">±1.40</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I R</td>
+ <td class="tdr">.316</td>
+ <td class="tdr">.569</td>
+ <td class="tdc">V</td>
+ <td class="tdr">109.79</td>
+ <td class="tdr">115.61</td>
+ <td class="tdc">V</td>
+ <td class="tdr">16.97</td>
+ <td class="tdr">18.39</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.11</td>
+ <td class="tdr">±.09</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.13</td>
+ <td class="tdr">±2.34</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.50</td>
+ <td class="tdr">±1.66</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I C</td>
+ <td class="tdr">.594</td>
+ <td class="tdr">.837</td>
+ <td class="tdc">R</td>
+ <td class="tdr">99.31</td>
+ <td class="tdr">110.11</td>
+ <td class="tdc">R</td>
+ <td class="tdr">17.89</td>
+ <td class="tdr">14.67</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.08</td>
+ <td class="tdr">±.04</td>
+ <td class="tdc"></td>
+ <td class="tdr">±3.24</td>
+ <td class="tdr">±1.67</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.58</td>
+ <td class="tdr">±1.32</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc">C</td>
+ <td class="tdr">108.14</td>
+ <td class="tdr">118.14</td>
+ <td class="tdc">C</td>
+ <td class="tdr">15.51</td>
+ <td class="tdr">12.70</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.94</td>
+ <td class="tdr">±1.62</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.37</td>
+ <td class="tdr">±1.15</td>
+ </tr>
+ <tr class="bb">
+ <td class="tdr"><i>N</i> =</td>
+ <td class="tdc"></td>
+ <td class="tdr">29</td>
+ <td class="tdr">28</td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td>V</td>
+ <td class="tdc">I A</td>
+ <td class="tdr">.698</td>
+ <td class="tdr">.713</td>
+ <td class="tdc">I</td>
+ <td class="tdr">103.72</td>
+ <td class="tdr">98.83</td>
+ <td class="tdc">I</td>
+ <td class="tdr">19.57</td>
+ <td class="tdr">18.84</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.07</td>
+ <td class="tdr">±.07</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.69</td>
+ <td class="tdr">±2.65</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.91</td>
+ <td class="tdr">±1.87</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I V</td>
+ <td class="tdr">.881</td>
+ <td class="tdr">.908</td>
+ <td class="tdc">A</td>
+ <td class="tdr">87.58</td>
+ <td class="tdr">99.71</td>
+ <td class="tdc">A</td>
+ <td class="tdr">12.43</td>
+ <td class="tdr">16.47</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.03</td>
+ <td class="tdr">±.02</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.71</td>
+ <td class="tdr">±2.27</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.21</td>
+ <td class="tdr">±1.60</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I R</td>
+ <td class="tdr">.773</td>
+ <td class="tdr">.891</td>
+ <td class="tdc">V</td>
+ <td class="tdr">109.00</td>
+ <td class="tdr">105.17</td>
+ <td class="tdc">V</td>
+ <td class="tdr">15.58</td>
+ <td class="tdr">19.97</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.06</td>
+ <td class="tdr">±.03</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.14</td>
+ <td class="tdr">±2.81</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.52</td>
+ <td class="tdr">±1.99</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I C</td>
+ <td class="tdr">.786</td>
+ <td class="tdr">.923</td>
+ <td class="tdc">R</td>
+ <td class="tdr">104.46</td>
+ <td class="tdr">103.00</td>
+ <td class="tdc">R</td>
+ <td class="tdr">16.99</td>
+ <td class="tdr">17.07</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.05</td>
+ <td class="tdr">±.02</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.34</td>
+ <td class="tdr">±2.40</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.65</td>
+ <td class="tdr">±1.70</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc">C</td>
+ <td class="tdr">107.00</td>
+ <td class="tdr">103.48</td>
+ <td class="tdc">C</td>
+ <td class="tdr">16.12</td>
+ <td class="tdr">14.51</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.22</td>
+ <td class="tdr">±2.04</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.57</td>
+ <td class="tdr">±1.44</td>
+ </tr>
+ <tr class="bb">
+ <td class="tdr"><i>N</i> =</td>
+ <td class="tdc"></td>
+ <td class="tdr">24</td>
+ <td class="tdr">23</td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td>VI</td>
+ <td class="tdc">I A</td>
+ <td class="tdr">.533</td>
+ <td class="tdr">.805</td>
+ <td class="tdc">I</td>
+ <td class="tdr">102.43</td>
+ <td class="tdr">105.39</td>
+ <td class="tdc">I</td>
+ <td class="tdr">11.61</td>
+ <td class="tdr">13.56</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.13</td>
+ <td class="tdr">±.06</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.09</td>
+ <td class="tdr">±2.16</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.48</td>
+ <td class="tdr">±1.52</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I V</td>
+ <td class="tdr">.774</td>
+ <td class="tdr">.858</td>
+ <td class="tdc">A</td>
+ <td class="tdr">91.43</td>
+ <td class="tdr">104.53</td>
+ <td class="tdc">A</td>
+ <td class="tdr">11.43</td>
+ <td class="tdr">11.31</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.07</td>
+ <td class="tdr">±.04</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.06</td>
+ <td class="tdr">±1.75</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.46</td>
+ <td class="tdr">±1.24<span class="pagenum" id="Page_29">[29]</span></td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I R</td>
+ <td class="tdr">.420</td>
+ <td class="tdr">.661</td>
+ <td class="tdc">V</td>
+ <td class="tdr">106.07</td>
+ <td class="tdr">112.94</td>
+ <td class="tdc">V</td>
+ <td class="tdr">11.93</td>
+ <td class="tdr">10.94</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.15</td>
+ <td class="tdr">±.09</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.15</td>
+ <td class="tdr">±1.74</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.52</td>
+ <td class="tdr">±1.23</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I C</td>
+ <td class="tdr">.739</td>
+ <td class="tdr">.620</td>
+ <td class="tdc">R</td>
+ <td class="tdr">96.64</td>
+ <td class="tdr">106.20</td>
+ <td class="tdc">R</td>
+ <td class="tdr">12.38</td>
+ <td class="tdr">11.88</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.08</td>
+ <td class="tdr">±.10</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.23</td>
+ <td class="tdr">±1.79</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.58</td>
+ <td class="tdr">±1.27</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc">C</td>
+ <td class="tdr">100.36</td>
+ <td class="tdr">107.61</td>
+ <td class="tdc">C</td>
+ <td class="tdr">13.95</td>
+ <td class="tdr">10.55</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.51</td>
+ <td class="tdr">±1.68</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.78</td>
+ <td class="tdr">±1.19</td>
+ </tr>
+ <tr class="bb">
+ <td class="tdr"><i>N</i> =</td>
+ <td class="tdc"></td>
+ <td class="tdr">14</td>
+ <td class="tdr">18</td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td>VII</td>
+ <td class="tdc">I A</td>
+ <td class="tdr">.740</td>
+ <td class="tdr">.795</td>
+ <td class="tdc">I</td>
+ <td class="tdr">107.27</td>
+ <td class="tdr">100.58</td>
+ <td class="tdc">I</td>
+ <td class="tdr">23.29</td>
+ <td class="tdr">19.78</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.09</td>
+ <td class="tdr">±.07</td>
+ <td class="tdc"></td>
+ <td class="tdr">±4.74</td>
+ <td class="tdr">±2.85</td>
+ <td class="tdc"></td>
+ <td class="tdr">±3.35</td>
+ <td class="tdr">±2.72</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I V</td>
+ <td class="tdr">.867</td>
+ <td class="tdr">.718</td>
+ <td class="tdc">A</td>
+ <td class="tdr">100.00</td>
+ <td class="tdr">99.31</td>
+ <td class="tdc">A</td>
+ <td class="tdr">9.26</td>
+ <td class="tdr">11.00</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.05</td>
+ <td class="tdr">±.09</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.86</td>
+ <td class="tdr">±2.06</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.33</td>
+ <td class="tdr">±1.45</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I R</td>
+ <td class="tdr">.862</td>
+ <td class="tdr">.799</td>
+ <td class="tdc">V</td>
+ <td class="tdr">114.36</td>
+ <td class="tdr">108.75</td>
+ <td class="tdc">V</td>
+ <td class="tdr">19.15</td>
+ <td class="tdr">14.42</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.05</td>
+ <td class="tdr">±.07</td>
+ <td class="tdc"></td>
+ <td class="tdr">±3.89</td>
+ <td class="tdr">±2.81</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.75</td>
+ <td class="tdr">±1.98</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I C</td>
+ <td class="tdr">.833</td>
+ <td class="tdr">.677</td>
+ <td class="tdc">R</td>
+ <td class="tdr">101.73</td>
+ <td class="tdr">98.58</td>
+ <td class="tdc">R</td>
+ <td class="tdr">12.28</td>
+ <td class="tdr">11.56</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.06</td>
+ <td class="tdr">±.11</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.50</td>
+ <td class="tdr">±2.25</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.77</td>
+ <td class="tdr">±1.59</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc">C</td>
+ <td class="tdr">105.82</td>
+ <td class="tdr">101.42</td>
+ <td class="tdc">C</td>
+ <td class="tdr">17.41</td>
+ <td class="tdr">16.02</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr">±3.54</td>
+ <td class="tdr">±3.12</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.50</td>
+ <td class="tdr">±2.21</td>
+ </tr>
+ <tr class="bb">
+ <td class="tdr"><i>N</i> =</td>
+ <td class="tdc"></td>
+ <td class="tdr">11</td>
+ <td class="tdr">12</td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td>VIII</td>
+ <td class="tdc">I A</td>
+ <td class="tdr">.663</td>
+ <td class="tdr">.796</td>
+ <td class="tdc">I</td>
+ <td class="tdr">104.83</td>
+ <td class="tdr">108.79</td>
+ <td class="tdc">I</td>
+ <td class="tdr">15.46</td>
+ <td class="tdr">18.25</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.11</td>
+ <td class="tdr">±.07</td>
+ <td class="tdc"></td>
+ <td class="tdr">±3.01</td>
+ <td class="tdr">±3.29</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.13</td>
+ <td class="tdr">±2.33</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I V</td>
+ <td class="tdr">.828</td>
+ <td class="tdr">.750</td>
+ <td class="tdc">A</td>
+ <td class="tdr">92.92</td>
+ <td class="tdr">93.86</td>
+ <td class="tdc">A</td>
+ <td class="tdr">10.20</td>
+ <td class="tdr">9.74</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.06</td>
+ <td class="tdr">±.08</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.99</td>
+ <td class="tdr">±1.76</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.40</td>
+ <td class="tdr">±1.24</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I R</td>
+ <td class="tdr">.775</td>
+ <td class="tdr">.722</td>
+ <td class="tdc">V</td>
+ <td class="tdr">111.67</td>
+ <td class="tdr">117.21</td>
+ <td class="tdc">V</td>
+ <td class="tdr">16.44</td>
+ <td class="tdr">14.02</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.08</td>
+ <td class="tdr">±.08</td>
+ <td class="tdc"></td>
+ <td class="tdr">±3.20</td>
+ <td class="tdr">±2.53</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.26</td>
+ <td class="tdr">±1.79</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I C</td>
+ <td class="tdr">.838</td>
+ <td class="tdr">.868</td>
+ <td class="tdc">R</td>
+ <td class="tdr">100.83</td>
+ <td class="tdr">104.38</td>
+ <td class="tdc">R</td>
+ <td class="tdr">11.52</td>
+ <td class="tdr">20.62</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.06</td>
+ <td class="tdr">±.04</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.24</td>
+ <td class="tdr">±3.72</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.59</td>
+ <td class="tdr">±2.63</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc">C</td>
+ <td class="tdr">104.92</td>
+ <td class="tdr">109.64</td>
+ <td class="tdc">C</td>
+ <td class="tdr">18.11</td>
+ <td class="tdr">17.41</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr">±3.53</td>
+ <td class="tdr">±3.14</td>
+ <td class="tdc"></td>
+ <td class="tdr">±2.49</td>
+ <td class="tdr">±2.22</td>
+ </tr>
+ <tr class="bb">
+ <td class="tdr"><i>N</i> =</td>
+ <td class="tdc"></td>
+ <td class="tdr">12</td>
+ <td class="tdr">14</td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"><span class="pagenum" id="Page_30">[30]</span></td>
+ </tr>
+ <tr>
+ <td><span class="smcap">Total</span></td>
+ <td class="tdc">I A</td>
+ <td class="tdr">.576</td>
+ <td class="tdr">.686</td>
+ <td class="tdc">I</td>
+ <td class="tdr">106.02</td>
+ <td class="tdr">105.87</td>
+ <td class="tdc">I</td>
+ <td class="tdr">16.73</td>
+ <td class="tdr">16.87</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.05</td>
+ <td class="tdr">±.03</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.12</td>
+ <td class="tdr">±1.07</td>
+ <td class="tdc"></td>
+ <td class="tdr">±0.79</td>
+ <td class="tdr">±0.75</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I V</td>
+ <td class="tdr">.679</td>
+ <td class="tdr">.727</td>
+ <td class="tdc">A</td>
+ <td class="tdr">91.35</td>
+ <td class="tdr">102.01</td>
+ <td class="tdc">A</td>
+ <td class="tdr">13.22</td>
+ <td class="tdr">15.61</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.04</td>
+ <td class="tdr">±.03</td>
+ <td class="tdc"></td>
+ <td class="tdr">±0.88</td>
+ <td class="tdr">±0.98</td>
+ <td class="tdc"></td>
+ <td class="tdr">±0.62</td>
+ <td class="tdr">±0.69</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I R</td>
+ <td class="tdr">.529</td>
+ <td class="tdr">.609</td>
+ <td class="tdc">V</td>
+ <td class="tdr">107.95</td>
+ <td class="tdr">110.54</td>
+ <td class="tdc">V</td>
+ <td class="tdr">19.76</td>
+ <td class="tdr">19.57</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.05</td>
+ <td class="tdr">±.04</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.32</td>
+ <td class="tdr">±1.24</td>
+ <td class="tdc"></td>
+ <td class="tdr">±0.93</td>
+ <td class="tdr">±0.87</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc">I C</td>
+ <td class="tdr">.678</td>
+ <td class="tdr">.731</td>
+ <td class="tdc">R</td>
+ <td class="tdr">99.22</td>
+ <td class="tdr">103.65</td>
+ <td class="tdc">R</td>
+ <td class="tdr">18.85</td>
+ <td class="tdr">17.12</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr">±.04</td>
+ <td class="tdr">±.03</td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.26</td>
+ <td class="tdr">±1.08</td>
+ <td class="tdc"></td>
+ <td class="tdr">±0.89</td>
+ <td class="tdr">±0.76</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc">C</td>
+ <td class="tdr">104.06</td>
+ <td class="tdr">108.00</td>
+ <td class="tdc">C</td>
+ <td class="tdr">18.87</td>
+ <td class="tdr">18.11</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr">±1.26</td>
+ <td class="tdr">±1.14</td>
+ <td class="tdc"></td>
+ <td class="tdr">±0.89</td>
+ <td class="tdr">±0.81</td>
+ </tr>
+ <tr class="bb">
+ <td class="tdr"><i>N</i> =</td>
+ <td class="tdc"></td>
+ <td class="tdr">102</td>
+ <td class="tdr">114</td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdc"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+</table>
+
+<p class="note"><span class="smcap">Note</span>—Totals without Grade III are much higher than these (<a href="#table5">Table 5</a>).
+Grade III has many children in it who have not been long enough in an
+academic situation to allow their SQ’s to go as high as they may.</p>
+
+<p>It is proper to note here that not much can be expected from
+Grades III and VIII and from totals including Grade III, since
+children in Grade III have not been there long enough to be pushed,
+and children in Grade VIII have been pushed beyond the limits
+which the tests used will register. Our logic is one of <i>pushed</i> correlations.
+If the association of IQ and the SQ’s is what we are
+attempting to establish, it is necessary to show:</p>
+
+<p>1. That the <i>r</i> comes near unity;</p>
+
+<p>2. That the central tendencies come near coincidence;</p>
+
+<p>3. That the S.D.’s come near coincidence.</p>
+
+<p>The value of the <i>r</i> is obvious; the value of coincidence of means
+becomes clearer if we think of Σ(IQ-EQ)/<i>n</i>, the average difference
+of potential rate of progress and actual rate of progress. This
+average of differences is the same as the difference of the averages,
+which is more readily calculated. Obviously, if we wish to use
+an AccR, it is necessary to show more than correspondence when
+<span class="pagenum" id="Page_31">[31]</span>differences in average and spread are equated as they are by the
+correlation coefficient. Besides, coincidence of M’s, correspondence
+of S.D.’s is also necessary since a correlation might be positive
+unity, the M’s might be equal, and still the spread of one measure
+might be more than the spread of the other. If the spreads are the
+same and the M’s are the same, and the correlation is positive
+unity, each <i>x</i> must equal its corresponding <i>y</i>. Then <i>b</i>₁₂ = <i>b</i>₂₁ = 1.00;
+and the M’s being equal, the deviations are from the same point.
+Therefore, we will attempt to measure similarity of M’s and
+S.D.’s as well as <i>r</i>.</p>
+
+<p>It will be observed that both Tables <a href="#table7">7</a> and <a href="#table8">8</a> give evidence of
+each of these tendencies in all grades. In <a href="#table8">Table 8</a> marked progress
+in arithmetic is apparent. This is due to re-classification in terms
+of the Woody-McCall test, which was not done in 1918-1919.
+In 1918-1919 no arithmetic test was given and all re-classification
+was in terms of reading, being done on the basis of both reading
+tests. Spelling re-classification was done each year, but the data
+were not treated in this manner. It can be said that wherever
+re-classification in terms of intelligence and pedagogical need was
+undertaken the desired result of pushing the SQ’s up to IQ was
+hastened. Of all the remedial procedure, such as changing teachers
+and time allotment and books and method, all of which were
+employed to some extent, it is my opinion that the re-classification
+was more important than everything else combined.</p>
+
+<p>It is noticeable that when <i>r</i>’s approach the limit which the
+unreliability of the test allows them, they drop down again. This
+is probably due to continued increase of SQ’s over IQ. Of course,
+for some SQ’s to be greater than IQ out of proportion to the
+general amount lowers the correlation as much as for some to lag
+behind. When the SQ’s of the children of lower intelligence
+reach their IQ they continue above. This, of course, is due to
+errors in establishment of the age norms. The norms are not
+limits of pushing, though an attempt was made by correction for
+truncation to get them as nearly so as possible. It is to be noted,
+however, that these norms are up the growth curve, that is, reading
+age of 10 means a score such that the average age of those getting
+it is 10, not the average score of children whose mental age is 10.
+The average reading achievement of children all ten years old
+chronologically is <i>higher</i> than that of a group all mentally ten,
+since many of the mentally advanced have not been pushed in
+<span class="pagenum" id="Page_32">[32]</span>product. The group used here to establish norms gives more nearly
+pushed norms than the others would.</p>
+
+<p>The tendency of the low IQ’s to go over unity in their SR’s is
+apparent in <a href="#table1">Table 1</a> and in <a href="#table12">Table 12</a> and also in the negative correlation
+between AccR and IQ.</p>
+
+<p>In both years some second grade children were advanced to
+Grade III during the year. This accounts for the low <i>r</i>’s in June,
+1919, but in 1919-1920 the Grade III correlations are raised and
+the means raised toward the M<sub>IQ</sub>, even though some second grade
+children were put in this group during the year.</p>
+
+<h4 id="table9">TABLE 9<br>
+<span class="smcap">Summary of Progress in Arithmetic by Increase in</span> <i>r</i>, <span class="smcap">Decrease in M<sub>IQ</sub>-M<sub>AQ</sub>
+and Decrease in Difference of Standard Deviations
+Irrespective of Direction</span></h4>
+
+<table>
+ <tr>
+ <th>GRADE</th>
+ <th colspan="2"><i>r</i></th>
+ <th colspan="2">Average Intelligence<br>Quotient Minus<br>Average Arithmetic<br>Quotient</th>
+ <th colspan="2">Difference of<br>Standard Deviations<br>Irrespective of<br>Sign (of IQ and Arith. Q)</th>
+ </tr>
+ <tr>
+ <th></th>
+ <th>Nov.</th>
+ <th>June</th>
+ <th>Nov.</th>
+ <th>June</th>
+ <th>Nov.</th>
+ <th>June</th>
+ </tr>
+ <tr>
+ <td>III</td>
+ <td class="tdr">.413</td>
+ <td class="tdr">.709</td>
+ <td class="tdr">19.25</td>
+ <td class="tdr">8.16</td>
+ <td class="tdr">6.27</td>
+ <td class="tdr">6.63</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td>±.16</td>
+ <td class="tdr">±.08</td>
+ <td class="tdr">±2.87</td>
+ <td class="tdr">±2.05</td>
+ <td class="tdr">±2.04</td>
+ <td class="tdr">±1.45</td>
+ </tr>
+ <tr>
+ <td>IV</td>
+ <td class="tdr">.426</td>
+ <td class="tdr">.725</td>
+ <td class="tdr">7.41</td>
+ <td class="tdr">0.46</td>
+ <td class="tdr">2.39</td>
+ <td class="tdr">0.47</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td>±.10</td>
+ <td class="tdr">±.06</td>
+ <td class="tdr">±1.84</td>
+ <td class="tdr">±1.50</td>
+ <td class="tdr">±1.29</td>
+ <td class="tdr">±1.02</td>
+ </tr>
+ <tr>
+ <td>V</td>
+ <td class="tdr">.698</td>
+ <td class="tdr">.713</td>
+ <td class="tdr">16.14</td>
+ <td class="tdr">0.54</td>
+ <td class="tdr">7.14</td>
+ <td class="tdr">2.06</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td>±.07</td>
+ <td class="tdr">±.07</td>
+ <td class="tdr">±1.93</td>
+ <td class="tdr">±1.84</td>
+ <td class="tdr">±1.37</td>
+ <td class="tdr">±1.30</td>
+ </tr>
+ <tr>
+ <td>VI</td>
+ <td class="tdr">5.33</td>
+ <td class="tdr">.805</td>
+ <td class="tdr">11.00</td>
+ <td class="tdr">3.00</td>
+ <td class="tdr">0.19</td>
+ <td class="tdr">1.63</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td>±.13</td>
+ <td class="tdr">±.06</td>
+ <td class="tdr">±2.01</td>
+ <td class="tdr">±1.19</td>
+ <td class="tdr">±1.42</td>
+ <td class="tdr">±0.85</td>
+ </tr>
+ <tr>
+ <td>VII</td>
+ <td class="tdr">.740</td>
+ <td class="tdr">.795</td>
+ <td class="tdr">7.27</td>
+ <td class="tdr">0.62</td>
+ <td class="tdr">14.03</td>
+ <td class="tdr">8.15</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td>±.09</td>
+ <td class="tdr">±.07</td>
+ <td class="tdr">±3.58</td>
+ <td class="tdr">±2.33</td>
+ <td class="tdr">±2.53</td>
+ <td class="tdr">±1.63</td>
+ </tr>
+ <tr>
+ <td>VIII</td>
+ <td class="tdr">.663</td>
+ <td class="tdr">.796</td>
+ <td class="tdr">11.92</td>
+ <td class="tdr"><a id="FNanchor_14" href="#Footnote_14" class="fnanchor">[14]</a>&#x2060;14.93</td>
+ <td class="tdr">5.26</td>
+ <td class="tdr"><a href="#Footnote_14" class="fnanchor">[14]</a>&#x2060;8.53</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td>±.11</td>
+ <td class="tdr">±.07</td>
+ <td class="tdr">±2.25</td>
+ <td class="tdr">±2.69</td>
+ <td class="tdr">±1.59</td>
+ <td class="tdr">±1.54</td>
+ </tr>
+ <tr>
+ <td>Total</td>
+ <td class="tdr">.576</td>
+ <td class="tdr">.686</td>
+ <td class="tdr">14.67</td>
+ <td class="tdr">3.72</td>
+ <td class="tdr">3.51</td>
+ <td class="tdr">1.16</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td>±.05</td>
+ <td class="tdr">±.03</td>
+ <td class="tdr">±0.94</td>
+ <td class="tdr">±0.81</td>
+ <td class="tdr">±0.67</td>
+ <td class="tdr">±0.57</td>
+ </tr>
+</table>
+
+<p><span class="pagenum" id="Page_33">[33]</span></p>
+
+<h4 id="table10">TABLE 10<br>
+<span class="smcap">Summary of Progress in Reading, November, 1918 to June, 1919, by Increase
+in</span> <i>r</i>, <span class="smcap">Decrease in M<sub>IQ</sub>-M<sub>RQ</sub>, and Decrease in Difference
+of Standard Deviations Irrespective of Sign</span></h4>
+
+<table>
+ <tr>
+ <th>GRADE</th>
+ <th colspan="2"><i>r</i></th>
+ <th colspan="2">Average Intelligence<br>Quotient Minus<br>Average Reading<br>Quotient</th>
+ <th colspan="2">Difference of<br>Standard Deviations<br>Irrespective of<br>Sign (of IQ and RQ)</th>
+ </tr>
+ <tr>
+ <th></th>
+ <th>Nov.</th>
+ <th>June</th>
+ <th>Nov.</th>
+ <th>June</th>
+ <th>Nov.</th>
+ <th>June</th>
+ </tr>
+ <tr>
+ <td>III</td>
+ <td class="tdr">.541</td>
+ <td class="tdr">.492</td>
+ <td class="tdr">27.63</td>
+ <td class="tdr">11.80</td>
+ <td class="tdr">9.75</td>
+ <td class="tdr">0.36</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td>±.11</td>
+ <td class="tdr">±.09</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td>IV</td>
+ <td class="tdr">.665</td>
+ <td class="tdr">.845</td>
+ <td class="tdr">14.84</td>
+ <td class="tdr">-3.00</td>
+ <td class="tdr">9.77</td>
+ <td class="tdr">7.86</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td>±.08</td>
+ <td class="tdr">±.05</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td>V</td>
+ <td class="tdr">.799</td>
+ <td class="tdr">.832</td>
+ <td class="tdr">7.05</td>
+ <td class="tdr">-2.00</td>
+ <td class="tdr">2.66</td>
+ <td class="tdr">5.07</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td>±.05</td>
+ <td class="tdr">±.05</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td>VI</td>
+ <td class="tdr">.497</td>
+ <td class="tdr">.726</td>
+ <td class="tdr">6.80</td>
+ <td class="tdr">8.70</td>
+ <td class="tdr">9.68</td>
+ <td class="tdr">3.76</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td>±.16</td>
+ <td class="tdr">±.10</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td>VII</td>
+ <td class="tdr">.622</td>
+ <td class="tdr">.709</td>
+ <td class="tdr">2.28</td>
+ <td class="tdr">0.07</td>
+ <td class="tdr">1.48</td>
+ <td class="tdr">5.98</td>
+ </tr>
+ <tr>
+ <td class="nw">3 of VIII</td>
+ <td class="tdr">±.11</td>
+ <td class="tdr">±.09</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td>Total</td>
+ <td class="tdr">.568</td>
+ <td class="tdr">.626</td>
+ <td class="tdr">12.67</td>
+ <td class="tdr">3.97</td>
+ <td class="tdr">3.31</td>
+ <td class="tdr">3.18</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td>±.05</td>
+ <td class="tdr">±.04</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+</table>
+
+<h4 id="table11">TABLE 11<br>
+<span class="smcap">Summary of Progress in Reading, November, 1919 to June, 1920, by Increase
+in</span> <i>r</i>, <span class="smcap">Decrease in M<sub>IQ</sub>-M<sub>RQ</sub>, and Decrease in Difference
+of Standard Deviations Irrespective of Sign</span></h4>
+
+<table>
+ <tr>
+ <th>GRADE</th>
+ <th colspan="2"><i>r</i></th>
+ <th colspan="2">Average Intelligence<br>Quotient Minus<br>Average Reading<br>Quotient</th>
+ <th colspan="2">Difference of<br>Standard Deviations<br>Irrespective of<br>Sign (of IQ and RQ)</th>
+ </tr>
+ <tr>
+ <th></th>
+ <th>Nov.</th>
+ <th>June</th>
+ <th>Nov.</th>
+ <th>June</th>
+ <th>Nov.</th>
+ <th>June</th>
+ </tr>
+ <tr>
+ <td>III</td>
+ <td class="tdr">.651</td>
+ <td class="tdr">.609</td>
+ <td class="tdr">14.41</td>
+ <td class="tdr">11.57</td>
+ <td class="tdr">22.46</td>
+ <td class="tdr">8.62</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td>±.11</td>
+ <td class="tdr">±.10</td>
+ <td class="tdr">±5.22</td>
+ <td class="tdr">±2.55</td>
+ <td class="tdr">±3.69</td>
+ <td class="tdr">±1.81</td>
+ </tr>
+ <tr>
+ <td>IV</td>
+ <td class="tdr">.316</td>
+ <td class="tdr">.569</td>
+ <td class="tdr">12.17</td>
+ <td class="tdr">2.43</td>
+ <td class="tdr">3.16</td>
+ <td class="tdr">0.76</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td>±.11</td>
+ <td class="tdr">±.09</td>
+ <td class="tdr">±2.41</td>
+ <td class="tdr">±1.78</td>
+ <td class="tdr">±1.70</td>
+ <td class="tdr">±1.26</td>
+ </tr>
+ <tr>
+ <td>V</td>
+ <td class="tdr">.773</td>
+ <td class="tdr">.891</td>
+ <td class="tdr">-0.74</td>
+ <td class="tdr">-4.17</td>
+ <td class="tdr">2.58</td>
+ <td class="tdr">1.77</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td>±.06</td>
+ <td class="tdr">±.03</td>
+ <td class="tdr">±1.72</td>
+ <td class="tdr">±1.20</td>
+ <td class="tdr">±1.22</td>
+ <td class="tdr">±0.85</td>
+ </tr>
+ <tr>
+ <td>VI</td>
+ <td class="tdr">.420</td>
+ <td class="tdr">.661</td>
+ <td class="tdr">5.79</td>
+ <td class="tdr">0.90</td>
+ <td class="tdr">0.77</td>
+ <td class="tdr">0.87</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td>±.15</td>
+ <td class="tdr">±.09</td>
+ <td class="tdr">±2.33</td>
+ <td class="tdr">±1.53</td>
+ <td class="tdr">±1.65</td>
+ <td class="tdr">±1.09</td>
+ </tr>
+ <tr>
+ <td>VII</td>
+ <td class="tdr">.862</td>
+ <td class="tdr">.799</td>
+ <td class="tdr">5.54</td>
+ <td class="tdr">0.92</td>
+ <td class="tdr">11.00</td>
+ <td class="tdr">8.31</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td>±.05</td>
+ <td class="tdr">±.07</td>
+ <td class="tdr">±2.88</td>
+ <td class="tdr">±2.54</td>
+ <td class="tdr">±2.03</td>
+ <td class="tdr">±1.80</td>
+ </tr>
+ <tr>
+ <td>VIII</td>
+ <td class="tdr">.775</td>
+ <td class="tdr">.722</td>
+ <td class="tdr">4.00</td>
+ <td class="tdr">4.43</td>
+ <td class="tdr">3.94</td>
+ <td class="tdr">2.41</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td>±.08</td>
+ <td class="tdr">±.09</td>
+ <td class="tdr">±1.90</td>
+ <td class="tdr">±2.64</td>
+ <td class="tdr">±1.92</td>
+ <td class="tdr">±1.87</td>
+ </tr>
+ <tr>
+ <td>Total</td>
+ <td class="tdr">.529</td>
+ <td class="tdr">.609</td>
+ <td class="tdr">6.80</td>
+ <td class="tdr">2.86</td>
+ <td class="tdr">2.12</td>
+ <td class="tdr">0.06</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td>±.05</td>
+ <td class="tdr">±.04</td>
+ <td class="tdr">±1.16</td>
+ <td class="tdr">±0.30</td>
+ <td class="tdr">±0.82</td>
+ <td class="tdr">±0.67</td>
+ </tr>
+</table>
+
+<p><span class="pagenum" id="Page_34">[34]</span></p>
+
+<p>The changes in rates of progress are expressed in summaries
+by subject matter in Tables <a href="#table9">9</a>, <a href="#table10">10</a>, and <a href="#table11">11</a>. Approach of Arithmetic
+Quotient to Intelligence Quotient is measured in <a href="#table9">Table 9</a> by:</p>
+
+<p>1. Comparison of <i>r</i> in June with <i>r</i> in November.</p>
+
+<p>2. Comparison of M<sub>IQ</sub>-M<sub>AQ</sub> in June and M<sub>IQ</sub>-M<sub>AQ</sub> in
+November.</p>
+
+<p>3. Comparison of S.D.’s of Arithmetic and Intelligence Quotients
+in June and November.</p>
+
+<p>The P.E.’s of each of these differences were obtained by</p>
+
+<p class="center">P.E.<sub>diff</sub>² = P.E.₁² + P.E.₂² - 2 <i>r</i>₁₂ P.E.₁ P.E.₂</p>
+
+<figure class="figcenter illowp100" id="formula1" style="max-width: 34.375em;">
+ <img class="w100" src="images/formula1.jpg" alt="">
+</figure>
+
+<p>The only M<sub>IQ</sub>-M<sub>SQ</sub> in <a href="#table9">Table 9</a> which does not show a decrease
+at least two times as large as the P.E. of either of the elements
+involved, is the 8th grade; and this is due to the limits of the test
+used. As mentioned before, the 8th grade did not register its true
+abilities in June since a perfect, or nearly perfect, score in the test
+was too easy to obtain. The small arithmetic S.D.’s in Grade 8
+and consequent great S.D.<sub>IQ</sub>-S.D.<sub>SQ</sub> is due to the same cause.</p>
+
+<p>Tables <a href="#table10">10</a> and <a href="#table11">11</a> present the summary of facts with regard
+to Thorndike Reading Quotients, the first and second years respectively.</p>
+
+<h3>THE RATIOS</h3>
+
+<p>The discussion which follows concerns <i>Ratios</i>, not <i>Quotients</i>.</p>
+
+<p><span class="pagenum" id="Page_35">[35]</span></p>
+
+<h4 id="table12">TABLE 12<br>
+<span class="smcap">Intelligence Quotients and Subject Ratios for All Periods Grouped
+by Child. The Order of Entries is Just as in <a href="#table1">Table 1</a></span></h4>
+
+<p class="center"><span class="smcap">Grade III</span></p>
+
+<table>
+ <tr>
+ <th>Intelligence Quotient</th>
+ <th></th>
+ <th>Arithmetic Ratio</th>
+ <th>Vocabulary Ratio</th>
+ <th>Reading Ratio</th>
+ <th>Completion Ratio</th>
+ </tr>
+ <tr>
+ <td rowspan="4">101</td>
+ <td><i>a</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td><i>b</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td><i>c</i></td>
+ <td class="tdr">63</td>
+ <td class="tdr">57</td>
+ <td class="tdr"></td>
+ <td class="tdr">43</td>
+ </tr>
+ <tr>
+ <td><i>d</i></td>
+ <td class="tdr">105</td>
+ <td class="tdr">87</td>
+ <td class="tdr"></td>
+ <td class="tdr">92</td>
+ </tr>
+ <tr class="group">
+ <td rowspan="4">128</td>
+ <td><i>a</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td><i>b</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td><i>c</i></td>
+ <td class="tdr">62</td>
+ <td class="tdr">80</td>
+ <td class="tdr"></td>
+ <td class="tdr">63</td>
+ </tr>
+ <tr>
+ <td><i>d</i></td>
+ <td class="tdr"></td>
+ <td class="tdr">119</td>
+ <td class="tdr">97</td>
+ <td class="tdr">120</td>
+ </tr>
+ <tr class="group">
+ <td rowspan="4">116</td>
+ <td><i>a</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td><i>b</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td><i>c</i></td>
+ <td class="tdr">48</td>
+ <td class="tdr">78</td>
+ <td class="tdr">*</td>
+ <td class="tdr">42</td>
+ </tr>
+ <tr>
+ <td><i>d</i></td>
+ <td class="tdr">81</td>
+ <td class="tdr">82</td>
+ <td class="tdr">66</td>
+ <td class="tdr">77</td>
+ </tr>
+ <tr class="group">
+ <td rowspan="4">87</td>
+ <td><i>a</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td><i>b</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td><i>c</i></td>
+ <td class="tdr">103</td>
+ <td class="tdr">46</td>
+ <td class="tdr">40</td>
+ <td class="tdr">62</td>
+ </tr>
+ <tr>
+ <td><i>d</i></td>
+ <td class="tdr">83</td>
+ <td class="tdr">85</td>
+ <td class="tdr">70</td>
+ <td class="tdr">60</td>
+ </tr>
+ <tr class="group">
+ <td rowspan="4">112</td>
+ <td><i>a</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td><i>b</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td><i>c</i></td>
+ <td class="tdr">80</td>
+ <td class="tdr">122</td>
+ <td class="tdr">119</td>
+ <td class="tdr">100</td>
+ </tr>
+ <tr>
+ <td><i>d</i></td>
+ <td class="tdr">100</td>
+ <td class="tdr">101</td>
+ <td class="tdr">108</td>
+ <td class="tdr">117</td>
+ </tr>
+ <tr class="group">
+ <td rowspan="4">101</td>
+ <td><i>a</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td><i>b</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td><i>c</i></td>
+ <td class="tdr">84</td>
+ <td class="tdr">93</td>
+ <td class="tdr">37</td>
+ <td class="tdr">55</td>
+ </tr>
+ <tr>
+ <td><i>d</i></td>
+ <td class="tdr">90</td>
+ <td class="tdr">110</td>
+ <td class="tdr">98</td>
+ <td class="tdr">92</td>
+ </tr>
+ <tr class="group">
+ <td rowspan="4">90</td>
+ <td><i>a</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td><i>b</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td><i>c</i></td>
+ <td class="tdr">76</td>
+ <td class="tdr">58</td>
+ <td class="tdr">72</td>
+ <td class="tdr">89</td>
+ </tr>
+ <tr>
+ <td><i>d</i></td>
+ <td class="tdr">68</td>
+ <td class="tdr">121</td>
+ <td class="tdr">77</td>
+ <td class="tdr">102</td>
+ </tr>
+ <tr class="group">
+ <td rowspan="4">105</td>
+ <td><i>a</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td><i>b</i></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ </tr>
+ <tr>
+ <td><i>c</i></td>
+ <td class="tdr">60</td>
+ <td class="tdr">43</td>
+ <td class="tdr">*</td>
+ <td class="tdr">57</td>
+ </tr>
+ <tr>
+ <td><i>d</i></td>
+ <td class="tdr">104</td>
+ <td class="tdr">95</td>
+ <td class="tdr">83</td>
+ <td class="tdr">66</td>
+ </tr>
+</table>
+
+<p class="note">The remainder of this table is filed in Teachers College Library, Columbia University.</p>
+
+<p><span class="pagenum" id="Page_36">[36]</span></p>
+
+<h4 id="table13">TABLE 13</h4>
+
+<table>
+ <tr>
+ <th></th>
+ <th>Nov., 1918</th>
+ <th>June, 1919</th>
+ <th>Nov., 1919</th>
+ <th>June, 1920</th>
+ </tr>
+ <tr>
+ <th colspan="5"><span class="smcap">Means</span></th>
+ </tr>
+ <tr>
+ <td>Arithmetic Ratio</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">89.02</td>
+ <td class="tdr">97.16</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">±1.05</td>
+ <td class="tdr">±1.07</td>
+ </tr>
+ <tr>
+ <td>Vocabulary Ratio</td>
+ <td class="tdr">98.96</td>
+ <td class="tdr">111.44</td>
+ <td class="tdr">106.20</td>
+ <td class="tdr">107.61</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr">±1.48</td>
+ <td class="tdr">±1.61</td>
+ <td class="tdr">±0.90</td>
+ <td class="tdr">±0.93</td>
+ </tr>
+ <tr>
+ <td>Reading Ratio</td>
+ <td class="tdr">96.47</td>
+ <td class="tdr">101.96</td>
+ <td class="tdr">98.98</td>
+ <td class="tdr">100.60</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr">±1.19</td>
+ <td class="tdr">±1.18</td>
+ <td class="tdr">±1.03</td>
+ <td class="tdr">±0.97</td>
+ </tr>
+ <tr>
+ <td>Completion Ratio</td>
+ <td class="tdr">99.76</td>
+ <td class="tdr">101.83</td>
+ <td class="tdr">101.67</td>
+ <td class="tdr">103.10</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr">±1.11</td>
+ <td class="tdr">±1.23</td>
+ <td class="tdr">±0.93</td>
+ <td class="tdr">±0.85</td>
+ </tr>
+ <tr>
+ <th colspan="5"><span class="smcap">Standard Deviations</span></th>
+ </tr>
+ <tr>
+ <td>Arithmetic Ratio</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">12.03</td>
+ <td class="tdr">12.53</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">±0.74</td>
+ <td class="tdr">±0.76</td>
+ </tr>
+ <tr>
+ <td>Vocabulary Ratio</td>
+ <td class="tdr">15.71</td>
+ <td class="tdr">16.58</td>
+ <td class="tdr">10.34</td>
+ <td class="tdr">10.84</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr">±1.05</td>
+ <td class="tdr">±1.14</td>
+ <td class="tdr">±0.64</td>
+ <td class="tdr">±0.66</td>
+ </tr>
+ <tr>
+ <td>Reading Ratio</td>
+ <td class="tdr">12.63</td>
+ <td class="tdr">12.14</td>
+ <td class="tdr">11.82</td>
+ <td class="tdr">11.36</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr">±0.84</td>
+ <td class="tdr">±0.84</td>
+ <td class="tdr">±0.73</td>
+ <td class="tdr">±0.69</td>
+ </tr>
+ <tr>
+ <td>Completion Ratio</td>
+ <td class="tdr">12.34</td>
+ <td class="tdr">12.63</td>
+ <td class="tdr">10.85</td>
+ <td class="tdr">9.90</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr">±0.82</td>
+ <td class="tdr">±0.87</td>
+ <td class="tdr">±0.67</td>
+ <td class="tdr">±0.60</td>
+ </tr>
+ <tr>
+ <th colspan="5"><span class="smcap">Correlations of Ratios</span></th>
+ </tr>
+ <tr>
+ <td>Arithmetic and Vocabulary</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">.60</td>
+ <td class="tdr">.30</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">±.06</td>
+ <td class="tdr">±.08</td>
+ </tr>
+ <tr>
+ <td>Arithmetic and Reading</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">.70</td>
+ <td class="tdr">.64</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">±.04</td>
+ <td class="tdr">±.05</td>
+ </tr>
+ <tr>
+ <td>Arithmetic and Completion</td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">.48</td>
+ <td class="tdr">.61</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr"></td>
+ <td class="tdr"></td>
+ <td class="tdr">±.07</td>
+ <td class="tdr">±.05</td>
+ </tr>
+ <tr>
+ <td>Vocabulary and Reading</td>
+ <td class="tdr">.34</td>
+ <td class="tdr">.32</td>
+ <td class="tdr">.57</td>
+ <td class="tdr">.47</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr">±.08</td>
+ <td class="tdr">±.09</td>
+ <td class="tdr">±.06</td>
+ <td class="tdr">±.07</td>
+ </tr>
+ <tr>
+ <td>Vocabulary and Completion</td>
+ <td class="tdr">.45</td>
+ <td class="tdr">.36</td>
+ <td class="tdr">.53</td>
+ <td class="tdr">.54</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr">±.07</td>
+ <td class="tdr">±.08</td>
+ <td class="tdr">±.06</td>
+ <td class="tdr">±.06</td>
+ </tr>
+ <tr>
+ <td>Reading and Completion</td>
+ <td class="tdr">.61</td>
+ <td class="tdr">.65</td>
+ <td class="tdr">.67</td>
+ <td class="tdr">.67</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td class="tdr">±.06</td>
+ <td class="tdr">±.06</td>
+ <td class="tdr">±.05</td>
+ <td class="tdr">±.05</td>
+ </tr>
+</table>
+
+<p><span class="pagenum" id="Page_37">[37]</span></p>
+
+<p>In <a href="#table12">Table 12</a> are presented the Subject Ratios in the same order
+as the Quotients appear in <a href="#table1">Table 1</a>.&#x2060;<a id="FNanchor_15" href="#Footnote_15" class="fnanchor">[15]</a> There plainly is a rapid
+rise of SQ/IQ from period to period, excluding all pupils who did
+not take all tests and excluding Grade III; which includes all
+children taking all tests who were in school in June, 1920, and were
+Grade IV and above in November, 1918. The average AccR is
+98.24 in November, 1918, and 102.78 in June, 1920. The average
+IQ for these children is 105.22. The S.D<sub>AccR₁₉₁₈</sub> is 11.17;
+the S.D.<sub>AccR₁₉₂₀</sub> is 9.09; the S.D.<sub>IQ</sub> is 19.24. It is obvious that
+the average amount of product per intelligence has increased,
+that the range of AccR’s has decreased (which means that factors
+causing disparities, other than intelligence, have been removed),
+and that the S.D. of the AccR’s is about one half the S.D. of the
+IQ’s. M’s are about equal so it is not necessary to use coefficients
+of variability. The variability of children, intelligence aside, is
+only one half what the variability is otherwise. The correlations
+when IQ = <i>X</i>, AccR₁₉₁₈ = <i>Y</i> and AccR₁₉₂₀ = <i>S</i> and when AccR =
+average of Vocabulary, Reading and Completion Ratios, are:&#x2060;<a id="FNanchor_16" href="#Footnote_16" class="fnanchor">[16]</a></p>
+
+<table>
+ <tr>
+ <td><i>r</i><sub>X.Y.</sub></td>
+ <td>=</td>
+ <td class="tdr">-.602</td>
+ </tr>
+ <tr>
+ <td><i>r</i><sub>X.S.</sub></td>
+ <td>=</td>
+ <td class="tdr">-.493</td>
+ </tr>
+ <tr>
+ <td><i>r</i><sub>Y.S.</sub></td>
+ <td>=</td>
+ <td class="tdr">+.549</td>
+ </tr>
+</table>
+
+<p>The remaining disparity is then due to something which is in
+negative correlation with intelligence.</p>
+
+<p>The number of cases here is only 48.</p>
+
+<p>The P.E.’s are then as follows:</p>
+
+<table>
+ <tr>
+ <td></td>
+ <td>P.E.<sub>M</sub></td>
+ <td>P.E.<sub>S.D.</sub></td>
+ </tr>
+ <tr>
+ <td><i>X</i></td>
+ <td>1.91</td>
+ <td>1.35</td>
+ </tr>
+ <tr>
+ <td><i>Y</i></td>
+ <td>1.11</td>
+ <td>0.79</td>
+ </tr>
+ <tr>
+ <td><i>S</i></td>
+ <td>0.90</td>
+ <td>0.64</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td>P.E.<i>r</i><sub>X.Y.</sub></td>
+ <td>= .06</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td>P.E.<i>r</i><sub>X.S.</sub></td>
+ <td>= .08</td>
+ </tr>
+ <tr>
+ <td></td>
+ <td>P.E.<i>r</i><sub>Y.S.</sub></td>
+ <td>= .07</td>
+ </tr>
+</table>
+
+<p>The differences between the M’s and between the S.D.’s of our
+1918 and our 1920 AccQ’s; namely, 102.78 - 98.24 = 4.54 and
+11.17 - 9.09 = 2.08, have formed a step in the argument. We must
+have the P.E.’s of these amounts in order to establish the reliability
+of the quantitative indices we employ:</p>
+
+<p class="center">P.E.<sub>diff</sub> = √P.E.<sub>X</sub>² + P.E.<sub>Y</sub>² - 2 <i>r</i><sub>XY</sub> P.E.<sub>X</sub> P.E.<sub>Y</sub></p>
+
+<p class="center">P.E.<sub>M₂₀-M₁₈</sub> = 0.94</p>
+
+<p class="center">P.E.<sub>S.D.₁₈-S.D.₂₀</sub> = 0.47</p>
+
+<figure class="figcenter illowp100" id="formula2" style="max-width: 37.5em;">
+ <img class="w100" src="images/formula2.jpg" alt="">
+</figure>
+
+<p><span class="pagenum" id="Page_38">[38]</span></p>
+
+<p>These differences are then reliable. If the same data were
+accumulated again in the same way with only 48 cases, the chances
+are even that the 4.54 would be between 3.50 and 5.48 and the 2.08
+between 1.61 and 2.55. That there would be positive differences
+is practically certain, since the difference between the means is
+over four times as large as its P.E., and the difference between
+the S.D.’s over four times as large as its P.E.</p>
+
+<p>To make still more certain this observation of positive amount
+in M of second testing minus M of first testing and in S.D. of
+first testing minus S.D. of second testing (AccR), which means
+an increase in central tendency of AccR’s and a decrease in spread
+of AccR’s under special treatment, we have listed in <a href="#table13">Table 13</a>
+the means and standard deviations of Subject Ratios of each
+test for each period and the intercorrelations of these Subject
+Ratios. These do not include exactly the same children in each
+period but are inclusive of all grades for all periods. They are a
+measurement of increased efficiency of the school as a whole,
+rather than of any one group of children; though, of course, the
+bulk of the children have representation in each of these indices.
+Too much continuity is not to be expected from June, 1919, to
+November, 1919, as the children are different. Comparison should
+always be from November to June.</p>
+
+<p>These tables bear out the fact presented by AccR. It is clear
+that there is a marked development in the S.R.’s, both by increase
+of M. and decrease of S.D. The decrease of correlation between
+S.R.’s is not so marked, but neither is the negative correlation
+between AccR and IQ much less in June, 1920, than in November,
+1918. The association of achievements in terms of intelligence is
+very probably due to mistreatment, since it is in negative correlation
+with IQ, as a general inherited ethical factor could not be.</p>
+
+<p>We will note that the Arithmetic Ratios are in as high positive
+association with the Reading Ratios as the Vocabulary Ratios are
+with the Reading Ratios. This makes it highly improbable that
+the intercorrelation of these remnants is due, to any large extent,
+to common elements in the test or to specific abilities. The common
+interassociation of all Ratios seems to point to the operation
+of some common factor other than intelligence as a determinant
+of disparity in school progress. It would be easy to identify this
+as the part of Burt’s “General Educational Factor” which is not
+intelligence—that is, industry, general perseverance and initiative—were
+<span class="pagenum" id="Page_39">[39]</span>it not for the fact that this same influence <i>stands in
+negative association to intelligence</i>. It is our belief that it is the
+influence of a maladjusted system of curricula and methods which
+accounts for these rather high interassociations of achievements,
+irrespective of intelligence.</p>
+
+<h3>SUMMARY</h3>
+
+<p>The association of abilities in arithmetic, reading, and completion
+with intelligence is markedly raised by special treatment.
+Disparities of educational product are therefore to a great extent
+due to intelligence. (Tables <a href="#table2">2</a>, <a href="#table3">3</a>,
+<a href="#table5">5</a>, <a href="#table7">7</a>, <a href="#table8">8</a>,
+<a href="#table9">9</a>, <a href="#table10">10</a> and <a href="#table11">11</a>.)</p>
+
+<p>The remnants (intelligence being rendered constant by division
+of each SQ by IQ) intercorrelate about .5. If there were specialized
+inherited abilities, these intercorrelations would not all be
+positive nor would they be as uniform. (Tables <a href="#table6">6</a> and <a href="#table13">13</a>.)</p>
+
+<p>The averages of these remnants, for reading, vocabulary, and
+completion, correlate -.61 in 1918 and -.49 in 1920 with IQ.
+These remnants are in negative association to intelligence. If
+the intercorrelations of these remnants were due to a “General
+Factor,” this correlation would not be negative.</p>
+
+<p>Therefore intelligence is far and away the most important
+determinant of individual differences in product.</p>
+
+<p>As part of the relation between tests, irrespective of intelligence,
+is due to common elements in the tests, this reasoning becomes
+still more probable.</p>
+
+<p>General factor in education, as distinct from intelligence, has
+not been separated here from inherited bases of ambition, concentration,
+and industry. It seems out of our province to conjure
+up some inherited complex of abilities other than intelligence,
+specialized inherited abilities, or proclivities and interests tending
+to thorough prosecution of school work. I have therefore meant
+this last by the general factor.</p>
+
+<p>McCall has correlations varying continually in size from -.63
+to +.98 between various measurements of a group of 6B children.&#x2060;<a id="FNanchor_17" href="#Footnote_17" class="fnanchor">[17]</a>
+The abilities involved were not pushed as are those considered here.
+Some of the low correlations are no doubt indications of low association
+because of the way children <i>are</i>, not the way they <i>might be</i>
+<span class="pagenum" id="Page_40">[40]</span>by heritage; still others, such as handwriting and cancellation
+(unless bright children do badly in cancellation tests because they
+are <i>more bored</i> than the others), are correlated low or negatively
+with intelligence when the correlation is at its maximum. Such
+results as those of McCall serve as a guide not to argue about
+other tests by analogy. It is necessary to find which traits and
+abilities can be pushed to unity in their relation to intelligence and
+which, like handwriting, are practically unrelated to general mental
+power.</p>
+
+<p>It is well to know about music tests and such tests as Stenquist’s
+mechanical ability test <i>when the correlation with intelligence
+is pushed</i>, before we decide whether the quality measured is a
+manifestation of specific talent or general intelligence.</p>
+
+<p>Cyril Burt obtained data much like that presented here except
+that instead of getting rid of the influence of intelligence and finding
+determinants for the remnants of disparity, he built up a hierarchy
+of coefficients as they would be if they were due entirely to a common
+factor and compared these with his obtained <i>r</i>’s. I will present his
+conclusions with regard to a general factor which are in substantial
+though not complete agreement with those advanced here.</p>
+
+<blockquote>
+
+<p class="center">“Evidence of a Single Common Factor.</p>
+
+<p>“The correlations thus established between the several school
+subjects may legitimately be attributed to the presence of common
+factors. Thus, the fact that the test of Arithmetic (Problems)
+correlates highly with the test of Arithmetic (Rules) is most naturally
+explained by assuming that the same ability is common to
+both subjects; similarly, the correlation of Composition with Arithmetic
+(Problems) may be regarded as evidence of a common factor
+underlying this second pair; and so with each of the seventy-eight
+pairs. But is the common factor one and the same in each case?
+Or have we to recognise a multiplicity of common factors, each
+limited to small groups of school subjects?</p>
+
+<p>“To answer this question a simple criterion may be devised. It is
+a matter of simple arithmetic to reconstruct a table of seventy-eight
+coefficients so calculated that all the correlations are due to one
+factor and one only, common to all subjects, but shared by each in
+different degrees. Such a theoretical construction is given in
+Table XIX. In this table theoretical values have been calculated
+so as to give the best possible fit to the values actually obtained in
+<span class="pagenum" id="Page_41">[41]</span>the investigation, and printed in Table XVIII. It will be seen
+that the theoretical coefficients exhibit a very characteristic arrangement.
+The values diminish progressively from above downwards
+and from right to left. Such an arrangement is termed a ‘hierarchy.’
+Its presence forms a rough and useful criterion of the presence of a
+single general factor.</p>
+
+<p>“On turning to the values originally obtained (Table XVIII.) it
+will be seen that they do, to some extent, conform to this criterion.
+In certain cases, however, the correlations are far too high—for
+instance, those between Arithmetic (Rules) and Arithmetic (Problems),
+and again Drawing and both Handwork and Writing
+(Quality). Now these instances are precisely those where we might
+anticipate special factors—general arithmetical ability, general
+manual dexterity—operating over and above the universal factor
+common to all subjects. These apparent exceptions, therefore, are
+not inconsistent with the general rule. Since, then, the chief
+deviations from the hierarchical arrangement occur precisely where,
+on other grounds, we should expect them to occur, we may accordingly
+conclude that performances in all the subjects tested appear
+to be determined in varying degrees by a single common factor.</p>
+
+<p class="center">“Nature of the Common Factor.</p>
+
+<p>“What, then, is this common factor? The most obvious suggestions
+are that it is either (1) General Educational Ability or (2)
+General Intelligence. For both these qualities, marks have been
+allotted by teachers, quite independently of the results of the tests.
+The correlations of these marks with performances in the tests are
+given in the last two lines of Table XVIII.</p>
+
+<p>“Upon certain assumptions, the correlation of each test with the
+Hypothetical Common Factor can readily be deduced from the
+coefficients originally observed. These estimates are given in the
+last line but two of the table. They agree more closely with the
+observed correlations for General Educational Ability, especially
+if the latter are first corrected for unreliability. (Correlations:
+Hypothetical General Factor coefficients and General Educational
+Ability coefficients .86; after correction .84. Hypothetical General
+Factor coefficients and General Intelligence coefficients .84; after
+correction .77.) We may, therefore, identify this hypothetical
+general factor with General Educational Ability, and conclude
+<span class="pagenum" id="Page_42">[42]</span>provisionally that this capacity more or less determines prowess in
+all school subjects.</p>
+
+<p>“The high agreement of the estimated coefficients with the intelligence
+correlations suggest that General Intelligence is an important,
+though not the only factor in General Educational Ability. Other
+important factors are probably long-distance memory, interest and
+industry. It is doubtless not a pure intellectual capacity; and,
+though single, is not simple, but complex.”&#x2060;<a id="FNanchor_18" href="#Footnote_18" class="fnanchor">[18]</a></p>
+
+</blockquote>
+
+<hr class="chap x-ebookmaker-drop">
+
+<div class="chapter">
+
+<p><span class="pagenum" id="Page_43">[43]</span></p>
+
+<h2 class="nobreak" id="PART_III">PART III<br>
+THE PSYCHOLOGICAL CONCLUSIONS OF THE EXPERIMENT</h2>
+
+</div>
+
+<h3>THE NEGLECT OF GENIUS</h3>
+
+<p>Schools of to-day are organized and administered so as to yield
+less chance to a child to obtain as much information as is possible
+for him to have in direct proportion to his mental ability. The
+correlation between accomplishment and intelligence (using AccR,
+the average of Reading, Vocabulary, and Completion Ratios with
+IQ) was -.61 in November, 1918, and -.49 in June, 1920, in the
+Garden City public school. The regrading and special promotion
+work from November, 1918, to June, 1920, reduced the handicap
+of brightness, but could not obliterate the sparsity of returns per
+increment of capacity in the upper reaches of the intelligence.
+Further, work along this same line done by A. J. Hamilton in the
+Washington School, Berkeley, California, indicates that this was
+not a peculiarity of the school at Garden City.</p>
+
+<p>The wide range of abilities which we know exists in pupils of any
+one age makes it impossible to adjust our formal education to the
+extremes. Much adjustment has been made in favor of the lower
+extreme, but little has been done for our genius. Of course the work
+with extreme subnormals is conceived and prosecuted more in the
+sense of clearing them away for the good of those remaining than
+of fitting education to their own needs. We are neglecting, however,
+our duty to those whom nature has endowed with the essentials of
+leadership. They do not interfere quite as much with ordinary
+classroom procedure, but they are greater social assets and need
+special treatment to develop <i>them</i> rather than to let others develop
+better.</p>
+
+<p>Neither of the extreme groups is certain of getting the normal
+stamina necessary for good citizenship. Neither group forms good
+habits of study nor accumulates such information as it might.
+Being aware of this discrepancy between the gift and the recipient,
+we have made our lessons easier and we have segregated the lower
+percentile. There is much more to be done. We must adapt
+<span class="pagenum" id="Page_44">[44]</span>education to at least five varying classes in order to reduce the
+spread within each to a commodious span. But the genius is the
+most important and should have the greatest claim to our immediate
+attention.</p>
+
+<p>First, our social needs demand special attention for the genius
+in order that we may better exploit our best nervous resources.
+Second, our educational needs demand it since the very bright as
+well as the very stupid disrupt calm and cogent classroom procedure.
+Third, they themselves demand it in order that they may, even
+when they do function as leaders, be happier in that function, since
+now they often lose much in social contact by peculiarities which
+prevent an integration of their “drives” into a harmonious economy
+of tendency. These peculiarities come from their continuous maladjustment,
+since when they are with children of their own mental
+maturity they are physically and physiologically handicapped;
+when they are with children of their own size and muscular equipment
+they are so far mentally superior that they are unhappily
+adjusted. Only classification on a large scale will allow sufficient
+numbers of them to congregate to correct this.</p>
+
+<p>I am reminded of a boy ten years old whose IQ on the Terman
+test was 172. He defined a nerve as the “conduction center of
+sensation” and, when asked to explain, did so in terms of sensation
+of heat and motive to withdraw. He explained the difference
+between misery and poverty thus: “Misery is a lack of the things
+we want; poverty is a lack of the things we need.” How can we
+expect a boy like this to grow into a normal citizen if we do not
+provide the companionship of peers in mentality and in physique?</p>
+
+<p>Fourth, our eugenic needs demand it, since we are not conserving
+this, our chiefest asset, genius. Unless we conserve better these
+rare products, the standard deviation of the intelligence of humanity
+will keep shrinking as we select against imbeciles and against genius
+as well. The waste of a genius who becomes an intellectual dilettante,
+as many now in fact do, is double. We lose what he might
+do for society; he does not marry and we lose the potentiality of
+his highly endowed germ-plasm.</p>
+
+<p>And they do become dilettantes when special treatment is not
+given. I know of a young man who was first of his high-school class,
+who got all A’s his first year in College (at Wisconsin), and all
+A’s his second year (at Harvard); and then he began to read all
+manner of literature with no schema of expression, no vocation,
+<span class="pagenum" id="Page_45">[45]</span>because, as he said, all college courses are so stupidly easy. He
+attended no lectures and read none of the books in one course, and
+then two days before the examination he was taunted with not
+being able to pass this course. He spent two nights and two days
+studying, and he received B in the course. But now he is a failure
+because he has no organized, purposive schema of expression;
+he was always in classes with people less fortunately endowed than
+he, and so he never had a chance.</p>
+
+<p>On these four counts then we must segregate our genius: (1)
+Social exploitation of our resources. (2) Educational procedure for
+the sake of other children as well as for them. (3) Happiness for
+them, organization of their trends, and formation of social habits.
+(4) Biologic conservation of great positive deviation from average
+human intelligence.</p>
+
+<h3>IS GENIUS SPECIALIZED?</h3>
+
+<p>This genius is of various kinds, political and business leaders,
+scientists and artists. Have they then the same inherited nervous
+structure with regard to abilities and capacities as distinct from
+interests? We know that they must have something in common,
+something that we call intelligence, power of adaptation. Calling
+this the nervous chemistry, the way the nervous system acts its
+quality, we must still know whether we have also an inherited
+nervous physics to deal with, or a further inherited nervous chemistry
+which predisposes to specific ability. Are there inherited
+capacities or predispositions to ability? We are in a position to
+answer this question with regard to the elementary school subjects,
+and are tempted here into a more general discussion of the matter
+in hand.</p>
+
+<p>The need to clarify our view on what is inherited and what is due
+to environment can be clearly envisaged in terms of our teachers.
+Whatever psychologists may mean by “predisposition to ability”
+it is quite certain that teachers make no distinction between this
+and the inheritance of a capacity. They feel that some children
+figure better than they read, and others read better than they
+figure, “by nature,” and there their obligation ends. If it is a
+grave matter that we shoulder the burden of bringing a child to his
+optimum achievement, then it is an immediate duty that we find
+how much of the failure to produce product of one kind or another
+is due to unremovable factors, and how much is due to our inadequacy.
+<span class="pagenum" id="Page_46">[46]</span>So, too, we have much loose discussion about finding
+out what children can do and want to do in the way of vocational
+diagnosis,—loose because it assumes that children are born with
+definite vocational capacities. Certainly we can do much more in
+the way of development and much more in the way of preparation
+for social needs if we know just how much “predisposition to ability”
+means. The teacher interprets it to mean about what was meant
+by the turtle that held up Atlas who held up the world. She makes
+no real distinction between predisposition to ability and specific
+ability, just as there was no real causal distinction between the
+turtle and Atlas. She then gets at her conception of intelligence
+additively,—a summation of school abilities.</p>
+
+<p>The correlation of teachers’ judgment of “power of adaptation,”
+carefully explained, and marks given six months previously by the
+same teachers was .82. The correlation of this same average
+judgment with the average of thirteen intelligence tests was only .58.
+These teachers obviously reached their conclusions of the intelligence
+of a child in the same way as they reached their conclusions of
+what marks he earned in their subjects.</p>
+
+<p>The unit characteristics which make up what we describe in
+terms of gross behavior as intelligence must of course be many.
+No one denies that if we knew just what these units were we could
+describe two possible manifestations of what we now call intelligence,
+of which one person could do one only and another person could
+do the other only because of the particular combinations of the
+units inherited. This would constitute inheritance of predisposition
+to special capacities. But it is not the same to assume that the
+vocations and aptitudes desirable in a world such as ours have
+specialized inherited bases. It is far more probable that substantially
+the same inherited characteristics are necessary to success in
+all the gross cross-sections of behavior which we call vocations and
+abilities.</p>
+
+<p>As the unit characteristics are certainly not so closely allied to
+our social needs as “mechanical intelligence” and “social intelligence”
+or even “rote memory for numbers,” we may not even
+distinguish presence of any five hundred elements from presence of
+any other five hundred elements in terms of what we now measure
+as intelligence. It is just as likely that all the elements of intelligence
+are necessary for every vocation and that all contribute to success
+of any one kind as it is likely that some are necessary for one vocation
+and others for another.</p>
+
+<p><span class="pagenum" id="Page_47">[47]</span></p>
+
+<p>This is a question of more or less. I believe that the amount to
+which a person’s specific talents, his vocation as distinct from his
+general power, are shaped by the combinations of elements which
+make up his inheritance, is much less than believed by Francis
+Galton, who says: “There cannot then remain a doubt but that
+the peculiar type of ability that is necessary to a judge is often
+transmitted by descent.” And again: “In other words, the combination
+of high intellectual gifts, tact in dealing with men, power
+of expression in debate, and ability to endure exceedingly hard work,
+is hereditary.”&#x2060;<a id="FNanchor_19" href="#Footnote_19" class="fnanchor">[19]</a></p>
+
+<p>I believe that the amount of influence which inheritance has upon
+the <i>kind</i> of thing a man does in life has been overestimated; that
+the inherited factors influence more the <i>way</i> in which he shall do
+whatever the environment influences him to do. This leaves plenty
+of play for the close correlation between parents and children in
+both intelligence and vocation. The former is the result of inheritance,
+the latter is the result of environment. All competent
+psychologists would agree to-day to less specific inheritance than a
+basis, for instance, for the distinction in vocation of minister and
+orator; and more specific inheritance than for such a statement
+as “We inherit how well we will do, we learn what we will do.”
+There would be substantial agreement to the statement that the
+inherited nervous bases of a very intelligent plumber are more like
+those of a very intelligent statesman than like those of a stupid
+plumber. This question is, <i>how much</i> inheritance we can conceive
+of as being made up of neuro-chemical elements determining us to
+do one kind of a thing rather than another.</p>
+
+<p>Interpretation statistically of one thousand possible elements,
+simply viewed as present or absent, and again simply viewed only
+as combinations and not permutations, would mean that the less
+the intelligence the more specific the inheritance. The most intelligent
+man alive could, by what he is born with, do anything since
+he has all of the one thousand factors, all of which help him in the
+prosecution of any venture. But the fewer elements he has the
+less well he does most things, and when lacking certain elements
+he has lost the capacity to do some things more completely than
+others. (I have neglected physiological characteristics necessary to
+an ability. A deaf man certainly is handicapped in music. I speak
+<span class="pagenum" id="Page_48">[48]</span>of <i>possible</i> mental capacities.) Such a view leaves scope for some
+degree of special abilities. It accounts for the idiot-savants, it
+accounts for the cases where genius is diverse as well as where it is
+not though it would demand that specialized genius be very rare
+and that inherited specialization be much rarer in the upper than
+in the lower reaches of intelligence. It allows for such cases as
+Galileo, whose father was a composer, as well as the cases cited by
+Galton. Heredity need not imply the same kind of genius though
+it does suggest it, whereas the environment backs up this inherited
+implication. We further can here absolutely resent an inheritance
+of such things as ability in the common school subjects without
+being involved in a view to deny the inheritance of a predisposition
+to mechanical rather than musical successes.</p>
+
+<p>Observation of brilliant children would corroborate this view.
+They can do anything. Observation of the mentally deficient is
+equally encouraging to this view. It has always been puzzling that
+they seem to do a few things much better than others. According
+to this conception there would be a negative correlation between
+intelligence and specialized inheritance.</p>
+
+<p>We will then consider each inherited element, not as music or as
+science, but rather as an element of intelligence which will help in
+all lines of work, but which may be a little more necessary for
+some than others. This is a predisposition in a true sense. If a
+man had only one element out of one thousand, he could do only
+a few things. If he had all thousand he could do everything.
+Inheritance of ability is not in terms of units valuable to us socially,
+but only in terms of undefined nervous elements; and we may conceive
+of specialization, and still hold that there be less, the more
+intelligent a man is.</p>
+
+<p>To make the matter still more concrete, imagine two men each
+of whom have 900 of the hypothetical 1000 elements, this being a
+value of +3 S.D. from the mean intelligence of the human race.
+One is a composer, the other financier. According to this view the
+greatest number of their inherited bases on which they could
+differ would be 100 of the 900 elements. The other 800 must be
+alike. Assuming that all of the elements contribute to all of the
+activities, but that some of them are more essential to some activities
+than to others, we could in this case say that the 100 which are
+different decided in some measure the vocation of each man. But
+it is much more probable that they overlap in 850 and that each
+<span class="pagenum" id="Page_49">[49]</span>has only 50 distinct elements, and further that the 50 which are
+distinct in each would not all be such as to influence one kind of
+ability rather than another. Then these two men, had they interchanged
+environments, would probably have interchanged vocations
+in that transaction. For the purposes of this discussion we treat
+physiological inherited features (such as hearing), as environment,
+as we are considering the mental capacity of composer as distinct
+from the necessary conditions to its development. According to
+this view, then, we account easily for the versatility of genius, which
+is so apparent in such accounts as Terman’s <i>The Intelligence of
+School Children</i>.&#x2060;<a id="FNanchor_20" href="#Footnote_20" class="fnanchor">[20]</a> Also, though very infrequent, we account for
+the genius who could not have done other things as well as those he
+did.</p>
+
+<p>Let us consider the case of negative deviates, say 3 S.D. from
+the mean intelligence of the human race. Two men each have 100
+of the 1000 hypothetical elements. It is much more probable here
+than not, that an appreciable amount of the 100 elements would
+be distinct in each person, though it is improbable that they would
+often be such as to form the basis of an “ability.” This then would
+account for specific abilities amongst morons and also for the
+presence but rarety of idiot-savants. Also since there are a limited
+number of such combinations possible and since many overlap for
+all practical purposes, we would account for the common likenesses
+as well as the relatively more uncommon extreme differences. This
+view is consistent with an examination of the data of this thesis
+which are contrary to the common belief in special abilities or to
+a view of inheritance of units which are actually the goals of
+education and the uses of a civilization too recent to leave its
+imprint on inheritance. We found no unremovable predispositions
+to one school subject more than to the others in any of the children.
+We would thus argue that such predispositions as to mathematics
+or to oratory are extremely rare and cannot be used as rules by
+which to interpret human nature.</p>
+
+<p>Woodworth says in a criticism of McDougall’s view of instincts:
+“What he here overlooks is the fact of native capacities or rather,
+the fact that each native capacity is at the same time a drive towards
+the sort of activity in question. The native capacity for mathematics
+<span class="pagenum" id="Page_50">[50]</span>is, at the same time, an interest in things mathematical and
+in dealing with such things. This is clearly true in individuals
+gifted with a great capacity for mathematics.”&#x2060;<a id="FNanchor_21" href="#Footnote_21" class="fnanchor">[21]</a></p>
+
+<p>I do not wish to become involved here in a discussion of the
+original nature of man on the instinctive side. I wish merely to
+rebel at the assumption of specific inheritance of abilities that are
+really sociological units. Mathematics is an ability which is useful
+to us, which we have come to encourage in education. But it is a
+man-made unit. There is no reason to believe that the inherited
+components of mentality are in any direct way related to such
+talents as mathematics or music. The units may vaguely predispose,
+but the units are not mathematics and music. We may say
+that the inherited physical and chemical units of the nervous
+system may be so distributed as to predispose one man to mathematics,
+and another to music, but we must not argue for inherited
+interests as correlates. The evidence is all that the inherited
+nervous chemistry of the individual is what on the side of behavior,
+we define as intelligence—power of adaptation. We may logically
+fall back on the inheritance of predisposition to ability, meaning
+thereby the inheritance of such nervous qualities as will better
+fit the individual to cope with mathematical than with musical
+situations; but if we adopt this cautious ground in disputation we
+cannot argue in another matter for an inherited interest in mathematics,
+innate because of the inborn mathematical talent. If the
+inherited qualities merely predispose they merely delimit; just as
+a man born without arms would probably not become a great baseball
+player, nor a deaf man a great musician, nor a man with poor
+motor control a skilled mechanic—so we are predisposed nervously
+for capacities. Hence can we argue that the inborn root of the
+interest is the capacity? Is it not safer to assume that interests in
+success, approval of fellowmen and general mental activity led to
+the development of the capacity by virtue of a favorable environment,
+and led by the same environment to interests centered about
+its activity?</p>
+
+<p>It is far from my intention to say that inheritance is not as
+specific nervously as it is in matters of blood pressure and texture
+of skin. As we, in our limited knowledge, still define abilities in
+terms of behaviour and not by nervous elements, my contention is
+<span class="pagenum" id="Page_51">[51]</span>that intelligence should be regarded as the sum total of this inheritance,
+much as general strength is, in terms of the body. We
+have still to find the component units of this intelligence. We can
+then define predisposition to ability. To split intelligence into
+inherited units of mathematics, reading, composition, mechanics,
+etc., is as unjustifiable as to split inherited vigor of body into baseball
+capacity, running capacity, climbing capacity, etc. Mathematics
+and music are what we do with intelligence, not what intelligence
+is made of. Of course everyone agrees to this. The lack of
+emphasis upon the chance that the inherited units are general in
+their application, that the same inherited elements are involved in
+many of the behavior complexes which we call traits and abilities,
+is what confuses the situation.</p>
+
+<h3>CURRENT PSYCHOLOGICAL OPINION</h3>
+
+<p>We must know what these elements are, and how many contribute
+to which capacities. Then we can decide the question of specialized
+inheritance. In all crude behavior data it is impossible to separate
+the influence of nature and nurture. A theory of specialized inheritance
+will inevitably infringe upon common sense in its claims.
+Of the following statements, it would be easier for most of us to
+endorse 1 and 2 than 3 and 4, whereas few would agree with 5
+and 6.</p>
+
+<p>1. “Unless one is a blind devotee to the irrepressibility and
+unmodifiability of original nature, one cannot be contented with
+the hypothesis that a boy’s conscientiousness or self-consciousness
+is absolutely uninfluenced by the family training given to him. Of
+intelligence in the sense of ability to get knowledge rather than
+amount of knowledge got, this might be maintained. But to prove
+that conscientiousness is irrespective of training is to prove too
+much.” (Thorndike, <i>Educational Psychology</i>, III, pp. 242.)</p>
+
+<p>2. “Some attempts have been made to apply these laws to
+behavior complexes, but as yet psychology has provided little
+foundation for such studies. The most thorough-going attempts
+have been made with human mental traits and some evidence has
+been collected here in favor of the view that differences in the
+instinctive behavior of individuals are inherited according to Mendelian
+ratios. <i>But in the field of human psychology too little is known
+of the genesis of character, of the distinction between nature and
+<span class="pagenum" id="Page_52">[52]</span>acquired behaviour to provide a very firm foundation for the work of
+the geneticist.</i>” (Watson, <i>Behaviour</i>, p. 156. Italics are mine.)</p>
+
+<p>3. “Even, however, when we omit the trades as well as the cases
+in which the fathers were artists, we find a very notable predominance
+of craftsmen in the parentage of painters, to such an extent
+indeed that while craftsmen only constitute 9.2 per cent among
+the fathers of our eminent persons generally, they constitute nearly
+35 per cent among the fathers of the painters and sculptors. It is
+difficult to avoid the conclusion that there is a real connection
+between the father’s aptitude for craftsmanship and the son’s
+aptitude for art.</p>
+
+<p>“To suppose that environment adequately accounts for this
+relationship is an inadmissible theory. The association between
+the craft of builder, carpenter, tanner, jeweller, watchmaker, wood-carver,
+rope-maker, etc., and the painter’s art is small at the best
+and in the most cases non-existent.” (Ellis, quoted in Thorndike,
+<i>Educational Psychology</i>, III, p. 257.)</p>
+
+<p>4. “—the statesman’s type of ability is largely transmitted or
+inherited. It would be tedious to count the instances in favor.
+Those to the contrary are Disraeli, Sir P. Francis (who was hardly
+a statesman, but rather bitter a controversialist) and Horner.
+In all the other 35 or 36 cases in my Appendix, one or more statesmen
+will be found among their eminent relations. In other words,
+the combination of high intellectual gifts, tact in dealing with men,
+power of expression in debate and ability to endure exceedingly
+hard work, is hereditary.” (Galton, <i>Hereditary Genius</i>, pp. 103,
+104.)</p>
+
+<p>Thorndike comments on this last quotation: “Of course there
+is, in the case of all of Galton’s facts the possibility that home surroundings
+decided the special direction which genius took, that
+really original nature is organized only along broad lines. Moreover,
+it is difficult to see just what in the nervous system could
+correspond to a specialized original capacity, say, to be a judge.
+Still the latter matter is a question of fact, and of the former issue
+Galton’s studies make him the best judge. We should note also
+that it is precisely in the traits the least amenable to environmental
+influence such as musical ability, that the specialization of family
+resemblance is most marked.”</p>
+
+<p>This cautious and sagacious commentary is in marked contrast
+to the following:</p>
+
+<p><span class="pagenum" id="Page_53">[53]</span></p>
+
+<p>5. “But no training and no external influence can entirely supersede
+the inborn tendencies. They are the product of <i>inheritance</i>.
+Not only unusual talents like musical or mathematical or linguistic
+powers can be traced through family histories, but the subtlest
+shades of temperament, character and intelligence can often be
+recognized as an ancestral gift.” (Munsterberg: <i>Psychology,
+General and Applied</i>, p. 230.)</p>
+
+<p>6. “Statistical studies which covered many characteristic
+opposites like industrious and lazy, emotional and cool, resolute
+and undecided, gay and depressed, fickle and constant, cautious
+and reckless, brilliant and stupid, independent and imitative,
+loquacious and silent, greedy and lavish, egoistic and altruistic
+and so on, have indicated clearly the influence of inheritance on
+every such mental trait.” (Munsterberg, <i>Psychology, General and
+Applied</i>, p. 237.)</p>
+
+<p>Undoubtedly Munsterberg here refers to the data accumulated
+by Heymans and Wiersma since they used such opposites as these,
+and also used what might be called statistical methods. Speaking
+of the same data Thorndike says:</p>
+
+<p>“In view of the insecurity of their original data it seems best
+not to enter upon an explanation of their somewhat awkward
+method of measuring the force of heredity, and not to repeat
+the figures which are got by this method. Also they do not attempt
+to estimate an allowance for the influence of similarity in home
+training, though they state that some such allowance must be
+made.” (<i>Educational Psychology</i>, III, p. 262.)</p>
+
+<p>Hollingworth and Poffenberger, commenting on the data of
+Galton and Ellis mentioned in the quotation above, say:</p>
+
+<p>“Francis Galton has made a statistical study of the inheritance
+of <i>specified</i> mental abilities and found that the abilities required
+for success as a judge, statesman, minister, commander, poet,
+artist, and scientific man, are inherited. But the nature of his
+data makes him unable to make exact allowances for influences
+of training and environmental influences. Consequently, his
+figures might really show general intelligence to be inherited and
+the form of its expression to be dependent upon environment.</p>
+
+<p>“Other investigators, among them F. A. Woods and Havelock
+Ellis, have made similar statistical studies and conclude that
+there is inheritance of even such qualities as temper, common
+sense, and the like, but these reports are also subject to the same
+<span class="pagenum" id="Page_54">[54]</span>complicating influence of environment.” (<i>Applied Psychology</i>,
+p. 43.)</p>
+
+<p>It can readily be seen, from these quotations, that there is fundamental
+disagreement among psychologists with regard to the
+inheritance of specific ability,—fundamental disagreement in
+three ways: (1) Interpretation of Galton’s and Ellis’s data. (2)
+Opinion on the matter. (3) Degree of precision possible in giving
+judgment.</p>
+
+<p>We have noted that it is very difficult to understand what the
+neural bases for such special abilities as Galton speaks of could
+be; that they are social, not neural or psychological units. A
+view of a large number of inherited elements all of which contribute
+to what we call general intelligence and each of which is slightly
+more necessary to some vocation than others, would account for
+all the observed facts, is neurally imaginable, and does not need
+to view ability to be a “judge” or “artistic talents” as biological
+entities. It further explains the differences in their limited abilities
+of mentally deficient children.</p>
+
+<p>Burt says in this connection: “Among children of special (M.D.)
+schools, the evidence for a general factor underlying educational
+abilities and disabilities of every kind is not so clear. In administrative
+practice, ‘mental deficiency’ implies among different
+children deficiencies in very different capacities, both general and
+specific.” (Cyril Burt: <i>The Distribution and Relation of Educational
+Abilities</i>, p. 83.)</p>
+
+<p>For these reasons it is justifiable to attempt to present evidence
+of the inheritance of school abilities with a view to showing that
+school abilities are not dependent upon special inherited aptitudes,
+as teachers so often assume, but that general intelligence is the
+only inherited cause of disparity in product. Investigations where
+the correlation between educational product and intelligence,
+irrespective of chronological age, was less than around .75, used
+data where many removable causes were not removed, and consequently
+measured results of the environment as well as heredity.
+A case such as this follows:</p>
+
+<p>“The influence of inheritance upon a <i>very specific</i> mental quality,
+namely, spelling ability, has been tested experimentally, although
+here there is some difficulty in separating the influence of heredity
+from that of environment. Earle studied the spelling ability of
+180 pairs of brothers and sisters who had uniform school training
+<span class="pagenum" id="Page_55">[55]</span>and found a correlation of .50. This means that if one child deviated
+by a certain amount from the average child in spelling ability,
+his brother or sister would deviate from the average child just
+half as much; that is, he would resemble his brother or sister to
+that extent.” (Hollingworth and Poffenberger: <i>Applied Psychology</i>,
+p. 44.)</p>
+
+<p>The data presented in this thesis indicate that that correlation
+could have been pushed as high as the <i>r</i> between the intelligence
+of the pairs of brothers. In other words, a child could be made
+to resemble his brother as nearly in spelling ability as he did in
+intelligence. All disparity could be reduced to that of general
+intelligence. Then intelligence alone is inherited as far as the
+data here presented have any bearing on the matter in hand.
+The influence of environment is in this case a matter of no consequence,
+since the subjects all had the same schooling, and home
+influence does not as a rule teach children to spell; but the data
+are not irrespective of the influence of intelligence.</p>
+
+<h3>INDICATIONS OF THE GARDEN CITY DATA</h3>
+
+<p><a href="#table3">Table 3</a> presents intercorrelations between IQ and quotients in
+the various subjects. The correlations are in each instance irrespective
+of chronological age since all quantitative indices are
+expressed as quotients. We have seen that they go up from September,
+1918, to June, 1920. Every possible means was used to
+push these correlations to their limit, to remove all removable
+factors. We have seen that the data show here, as in Tables <a href="#table7">7</a> and
+<a href="#table8">8</a>, that there is little association between traits which is not a result
+of differences in intelligence. <a href="#table3">Table 3</a> shows the same 48 children
+throughout. The <i>r</i>’s are not corrected for attenuation. Though
+the <i>r</i>’s are high throughout and go higher under special treatment,
+the association can still be more accurately registered by some
+attention to relation of the means and the S.D.’s. Two traits
+to be identical must have <i>r</i> = 1.00 S.D.<sub><i>x</i></sub> = S.D.<sub><i>y</i></sub> and M<sub><i>x</i></sub> = M<sub><i>y</i></sub>.
+We have seen that the <i>r</i> increases, M-M decreases and S.D.-S.D.
+regardless of sign decreases. (Tables <a href="#table9">9</a>, <a href="#table10">10</a> and <a href="#table11">11</a>.)</p>
+
+<p>But as the S.D.’s of the Subject Quotients (though they do
+approach S.D. of IQ) sometimes go below the S.D. of IQ, we
+must know why. It is because the low IQ’s do better per their
+intelligence than the high IQ’s. We have seen above that the
+correlation between IQ and average of the Vocabulary, Reading,
+<span class="pagenum" id="Page_56">[56]</span>and Completion Subject Ratios is -.61 in November, 1918, and
+-.49 in June, 1920.</p>
+
+<p>Then the ratio of achievement to intelligence is in definite
+relation to intelligence—a negative relation. It is this same
+tendency to adapt our education to a low level which has prevented
+a perfect association between intelligence and the various subjects.
+The relation of one subject to another, irrespective of intelligence,
+would be zero if there were no other factors except intelligence
+responsible for the product. After two years of such attempts as
+an ordinary public school will allow, we have removed many of the
+causes of disparity and increased the association between potential
+progress and progress in arithmetic, reading and language. The
+correlations, correspondence of S.D.’s, and Σ(IQ-EQ)/<i>n</i> registered
+in Tables <a href="#table9">9</a>, <a href="#table10">10</a>, and <a href="#table11">11</a> give evidence of this as does also the increase
+in the AccR, an average of the Arithmetic, Reading, Vocabulary
+and Completion Ratios. (<a href="#table13">Table 13.</a>)</p>
+
+<p>Are the unremoved causes other than intelligence unremovable?
+These causes might be, besides the unreliability of tests and the
+common elements in the tests, the specialized inheritance we have
+considered, ethical qualities of endurance, ambition, initiative and
+industry or a general factor. The correlations between Arithmetic
+Ratios and Reading Ratios and the other intercorrelations
+of Subject Ratios will yield us an index of how much of this remaining
+disparity is due to specialized inheritance. These intercorrelations
+for all years are embodied in <a href="#table13">Table 13</a>. The partial
+correlations of quotients when intelligence is rendered constant
+will be found in <a href="#table6">Table 6</a>. These intercorrelations, and the partials
+as well, give an indication of some general factor other than intelligence
+since the <i>r</i>’s irrespective of intelligence are uniform and
+all are positive. Only the correlation of arithmetic with vocabulary,
+intelligence being rendered constant, goes to zero. Though
+this might be due in part to common elements in the tests, it is
+more likely that there is another factor in operation. Inheritance
+of specific abilities could not have this uniform effect on the correlations.</p>
+
+<p>These correlations all being positive and the <i>r</i>’s being very
+uniform, both correlation of ratios and the partials, makes the
+interpretation of specialized inheritance of ability extremely
+unlikely. The correlation of Arithmetic Ratios with Reading
+<span class="pagenum" id="Page_57">[57]</span>Ratios is higher in 1920 than that of Vocabulary Ratios with
+Reading Ratios. It leaves the possibility that the unremoved
+factors are inherited ethical differences or that they are a “general
+educational factor.” The negative correlation of AccR with
+intelligence, however, being as high as these positive remnants of
+interrelation, would tend to make more probable an interpretation
+of this as a remnant of disparity, intelligence accounted for, which
+is entirely due to the organization of our schools.</p>
+
+<p>All disparity not due to intelligence was worked on as far as it
+was possible. Thereupon the association of intelligence and educational
+product increased markedly and the negative association
+of intelligence with achievement in terms of intelligence decreased
+somewhat. However, some association of abilities not due to
+intelligence remains. Exactly as much negative association of
+achievement in terms of intelligence, with intelligence, remains.
+So, when some of the disparities due to the environment have
+been removed and therefore the correlation of Arithmetic Ratio
+with Vocabulary Ratio and Reading Ratio has been decreased,
+the causes which contributed to a correlation such as lack of
+interest having been removed, there still remains some relation
+of school qualities. But there also still remains a negative association
+between this accomplishment and intelligence which means
+that we still have a remnant of such removable influence as is due
+to badly adjusted curricula.</p>
+
+<p>This enables us to interpret our partials. The partials are not
+nearer zero because although we have partialed out the effect
+of intelligence, we have not partialed out the factor which controls
+the negative relation to intelligence of these very partial resultants,
+since that is the effect of the methods and curricula. Though we
+did advance bright pupils and give them more chance, we have
+not given them a chance proportionate to the stupid children.
+And that is true since we often wanted to advance pupils and were
+not allowed to; whereas we were never allowed to demote pupils
+except in particular subject matter. The stupid children were
+always at the frontier of their intelligence at the educational cost
+of the others.</p>
+
+<p>It is this remnant which has usually been interpreted as “general
+factor” or as inherited factors basic to initiative, ambition, and
+industry. The fact of importance is that these remnants, these
+marks of children independent of their intelligence, are associated
+<span class="pagenum" id="Page_58">[58]</span>negatively with intelligence to the same degree that they are
+associated positively to each other. Unless we wish to assume
+that the “general factor” or the inherited bases of initiative and
+industry are associated negatively with intelligence we must account
+for the remnant in some other way. It seems far more reasonable
+to attribute this remaining association to the educational handicaps
+of intelligence which we were unable to remove.</p>
+
+<p>The original tendencies of man, as distinct from his original
+equipment, have not been considered in this study. If the quantitative
+differences in endowment of this kind were added to the
+denominator of our accomplishment ratio formula, we would
+have a better measure and better results. We share in this investigation
+a general limitation of educational psychology—the requisite
+technique to measure individual differences of instincts and the
+ethical traits of which they are the predisposition. Industry,
+ambition, and initiative are not inherited units. They are, however,
+the rules of an economy of expression and as such are dependent
+upon individual differences in strength of instinct.</p>
+
+<h3>CONCLUSIONS</h3>
+
+<p>1. IQ can be used as a limit of school achievement expressed
+as SQ.</p>
+
+<blockquote>
+
+<p class="hanging"><i>a</i> Progress in Σ(IQ-SQ)/<i>n</i> may be used as a measure of
+school efficiency.</p>
+
+<p class="hanging"><i>b</i> SQ/IQ may be used as a measure of individual efficiency.</p>
+
+</blockquote>
+
+<p>2. Correlations between intelligence and achievement are very
+different before and after the abilities are pushed.</p>
+
+<blockquote>
+
+<p class="hanging"><i>a</i> Many <i>r</i>’s are reported where conclusions are drawn as
+though they had been pushed. These conclusions should
+be restated.</p>
+
+<p class="hanging"><i>b</i> Intelligence and achievement are far more closely associated
+than has been assumed to date.</p>
+
+</blockquote>
+
+<p>3. Disparity of school product can be reduced to individual
+differences in intelligence.</p>
+
+<blockquote>
+
+<p class="hanging"><i>a</i> Little specific inheritance of school abilities.</p>
+
+<p><span class="pagenum" id="Page_59">[59]</span></p>
+
+<p class="hanging"><i>b</i> Little unremovable difference in industry, conscientiousness
+and concentration.</p>
+
+<p class="hanging"><i>c</i> Intelligence is the only inherited general factor.</p>
+
+</blockquote>
+
+<p>4. Negative association between AccR and IQ.</p>
+
+<blockquote>
+
+<p class="hanging"><i>a</i> To-day’s educational procedure involves a handicap to
+intelligence.</p>
+
+<p class="hanging"><i>b</i> The genius has been neglected.</p>
+
+</blockquote>
+
+<figure class="figcenter illowp75" id="columbia" style="max-width: 15.625em;">
+ <img class="w100" src="images/columbia.jpg" alt="">
+</figure>
+
+<hr class="chap x-ebookmaker-drop">
+
+<div class="footnotes">
+
+<div class="chapter">
+
+<h2 class="nobreak" id="FOOTNOTES">FOOTNOTES</h2>
+
+</div>
+
+<div class="footnote"><p><a id="Footnote_1" href="#FNanchor_1" class="label">[1]</a> Part of this section is reprinted with revisions from <span class="smcap">Teachers College Record</span>,
+Vol. XXI, No. 5 (November, 1920).</p></div>
+
+<div class="footnote"><p><a id="Footnote_2" href="#FNanchor_2" class="label">[2]</a> For scientific purposes we want year-month means and standard deviations, that
+we may say that Charlie Jones is 2.1 S.D. above the mean for his age level, while
+Harold Smith is .1 S.D. below that mean. It is in terms such as these that we may
+be able to compare accomplishment in one function with accomplishment in another,
+progress in one with progress in another. For many of our problems we need a common
+denominator of measurement so that we may compare progress between tests and
+age-groups. The best common denominator is, I believe, S.D. in an age-group.
+Thus we may locate a child in any age-group in any test and compare that location
+with the position of any other child in any other test in his age-group.</p>
+
+<p>For practical purposes, however, it is for many reasons more convenient to use
+quotients in elementary schools. Principals would rather deal with quotients since it
+is easier to explain them in terms of attainment and capacity. It is the use of such
+quotients that this thesis discusses.</p></div>
+
+<div class="footnote"><p><a id="Footnote_3" href="#FNanchor_3" class="label">[3]</a> Judd, C. H., “A Look Forward,” in <i>Seventeenth Yearbook</i>, Pt. II, of the N.S.S.E.,
+1918.</p></div>
+
+<div class="footnote"><p><a id="Footnote_4" href="#FNanchor_4" class="label">[4]</a> When the disadvantages of “pushing” children are discussed, the disadvantages
+of keeping children at their chronological age levels should be considered as well.
+Although it is true that a supernormal child placed in that grade for which he is mentally
+equipped loses much in social contact, it is also true that he loses a great deal by
+remaining in the grade where he physiologically belongs. There he develops habits
+of conceit, indolence, and carelessness. It is in all cases much better to group intelligent
+children and enrich the curriculum than to “push” them; but pushing may be
+better than leaving them where they belong by age. It is a possibility worth considering
+that the explanation of the “peculiarities” of genius lies in the fact that he has
+never associated with equals. When his fellows are mentally his equals they are
+physically far older and when they are physically his equals they are mentally inferior.</p></div>
+
+<div class="footnote"><p><a id="Footnote_5" href="#FNanchor_5" class="label">[5]</a> Whether only the Accomplishment Ratio as a percentage should be given the
+parents, or whether they should know both the IQ and all the SQ’s, is a question on
+which I am not prepared to give an opinion. I incline to believe that the parents
+should know only the final marks and am sure that I advise telling the children these
+only.</p></div>
+
+<div class="footnote"><p><a id="Footnote_6" href="#FNanchor_6" class="label">[6]</a> There will be reported elsewhere a fuller consideration of this aspect of
+the technique of derivation of norms, together with a complete presentation of the
+data used to obtain the age norms herein used.</p></div>
+
+<div class="footnote"><p><a id="Footnote_7" href="#FNanchor_7" class="label">[7]</a> “The Accomplishment Quotient,” <i>Teachers College Record</i>, November, 1920.</p></div>
+
+<div class="footnote"><p><a id="Footnote_8" href="#FNanchor_8" class="label">[8]</a> Or the ratio of the Subject Quotient to the Intelligence Quotient, which is the
+same as the ratio of the Subject Age to the Mental Age.</p></div>
+
+<div class="footnote"><p><a id="Footnote_9" href="#FNanchor_9" class="label">[9]</a> This table is too bulky for complete publication but may be found on file in
+Teachers College Library, Columbia University.</p></div>
+
+<div class="footnote"><p><a id="Footnote_10" href="#FNanchor_10" class="label">[10]</a> The remainder of this table is filed in Teachers College Library, Columbia University.
+Decimals are dropped in this table.</p></div>
+
+<div class="footnote"><p><a id="Footnote_11" href="#FNanchor_11" class="label">[11]</a> Decimals are dropped in this table.</p></div>
+
+<div class="footnote"><p><a id="Footnote_12" href="#FNanchor_12" class="label">[12]</a> Truman L. Kelley: <i>Statistics</i>, The Macmillan Co.</p></div>
+
+<div class="footnote"><p><a id="Footnote_13" href="#FNanchor_13" class="label">[13]</a> This correlation was obtained by correlating one half of the Binet against the other
+one half and then using Brown’s Formula to determine the correlation of a whole
+Binet against another whole Binet.</p></div>
+
+<div class="footnote"><p><a id="Footnote_14" href="#FNanchor_14" class="label">[14]</a> These quantities do not decrease because a perfect score on the arithmetic test was
+too easy to obtain at this time. The children had reached the limits of this test.</p></div>
+
+<div class="footnote"><p><a id="Footnote_15" href="#FNanchor_15" class="label">[15]</a> Table 12 is too bulky for complete publication. The first page is reproduced here
+and the complete table is filed at the library, Teachers College, Columbia University.</p></div>
+
+<div class="footnote"><p><a id="Footnote_16" href="#FNanchor_16" class="label">[16]</a> No arithmetic was given in 1918, therefore arithmetic was not used in these
+averages.</p></div>
+
+<div class="footnote"><p><a id="Footnote_17" href="#FNanchor_17" class="label">[17]</a> William Anderson McCall: <i>Correlations of Some Psychological and Educational
+Measurements</i>, Teachers College Contributions to Education, No. 79.</p></div>
+
+<div class="footnote"><p><a id="Footnote_18" href="#FNanchor_18" class="label">[18]</a> Cyril Burt: <i>The Distribution and Relations of Educational Abilities</i>, pp. 53-56.</p></div>
+
+<div class="footnote"><p><a id="Footnote_19" href="#FNanchor_19" class="label">[19]</a> Quotations from Galton: <i>Hereditary Genius</i>, ’92, pp. 61-62 and pp. 103-104.</p></div>
+
+<div class="footnote"><p><a id="Footnote_20" href="#FNanchor_20" class="label">[20]</a> Terman, Lewis: <i>The Intelligence of School Children</i>. Boston: Houghton Mifflin,
+1919.</p></div>
+
+<div class="footnote"><p><a id="Footnote_21" href="#FNanchor_21" class="label">[21]</a> Woodworth, R. S.: <i>Dynamic Psychology</i>, p. 200. New York: Columbia University
+Press, 1918.</p></div>
+
+</div>
+
+<div style='text-align:center'>*** END OF THE PROJECT GUTENBERG EBOOK 76891 ***</div>
+</body>
+</html>
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