School and college mathematics

1956 ◽  
Vol 49 (7) ◽  
pp. 514-518
Author(s):  
William L. Duren

A mathematician's thoughts on how to revise the high-school mathematics courses so as to minimize the “break” in the mathematics program at the beginning of the thirteenth year.

1976 ◽  
Vol 23 (2) ◽  
pp. 137-142
Author(s):  
Thomas P. Carpenter ◽  
Terrence G. Coburn ◽  
Robert E. Reys ◽  
James W. Wilson

Development of computational skills with fractions has long been a part of the upper elementary and junior high school mathematics program. Current movements toward metrication have led some individuals to suggest that decimals will receive more attention in the mathematics curriculum with a corresponding de-emphasis on fractions. The suggestion may find an increased number of supporters, as recurring evidence indicates that pupil performance with fractions is discouragingly low. An alternative point of view is that although metrication may somewhat alter work with fractions, their importance within the structure of mathematics and to applications justifies their continued emphasis in the curriculum.


1956 ◽  
Vol 49 (5) ◽  
pp. 412

The program which is now being planned for this summer meeting of N.C.T.M. in Los Angeles will include general sessions addressed by nationally known speakers, a banquet, a luncheon, and many sectional meetings. These meetings should be of interest to teachers of elementary arithmetic, and junior and senior high school mathematics, as well as to teachers of junior and senior college mathematics. Special sections will also deal with aspects of teacher education in mathematics.


1947 ◽  
Vol 40 (2) ◽  
pp. 62-64
Author(s):  
Edith L. Mossman

In arithmetic through the eighth grade and in first year algebra, is not the thorough understanding of fundamental principles of first importance? That this need of first importance has not been generally taken care of, is evidenced in many ways: (1) Such reports as that given by Admiral Nimitz, pointing out the weakness of our boys in junior and senior high school mathematics. (2) J. Kadushin's statements about the inability of men in the factories to handle simplest work in fractions, and their fear of taking any course in mathematics. (3) Constant complaint from teachers of physics, chemistry and algebra theory as to ignorance of the formula: what it is, what can and cannot be done to it. (4) The experience of much tutoring going on in universities, showing that great numbers have trouble with college mathematics because they did never really understand their work in arithmetic and algebra.


1975 ◽  
Vol 68 (2) ◽  
pp. 157-160
Author(s):  
John J. Rodgers

All too often in the teaching of high school mathematics courses, we overlook the inherent flexibility and interdependence of the subject matter. It is easy to fall into the trap of presenting algebra, trigonometry, geometry, and so on, as separate areas of study. It is because they were taught this way traditionally. With relatively minor changes in the order of presentation, we can demonstrate to the student the vital interconnectiveness of mathematics. For example, many courses in high school geometry include a unit on trigonometry. The student learns three trigonometric ratios, namely, the sine, the cosine, and the tangent. He also learns to use the trigonometric tables to solve for an unknown side of a right triangle. Generally this material comes quite late in the year.


1984 ◽  
Vol 77 (7) ◽  
pp. 510-513
Author(s):  
Charles E. Mitchell

One of the major problems faced by high school counselors and teachers of mathematics is convincing students with college potential to remain in a mathematics program until they have completed at least two years of algebra and one year of geometry.


1981 ◽  
Vol 18 (2) ◽  
pp. 207-218 ◽  
Author(s):  
Joan Daniels Pedro ◽  
Patricia Wolleat ◽  
Elizabeth Fennema ◽  
Ann DeVaney Becker

Males, more than females, elect advanced mathematics courses. This differential in the number of mathematics courses elected has been cited as a major explanation of sex-related differences in adults' mathematics performance and in their participation in mathematics-related careers. Knowledge about some of the variables that enter into the decision to persist in the study of mathematics is essential for those who are interested in encouraging females, as well as males, to adequately prepare themselves in mathematics. This study identified some attitudinal and attributional variables that relate to the election of mathematics courses by females and males. A small set of variables was found to explain some of the variance in female and male mathematics plans. These results might help in understanding why females do not continue in as large a proportion as males to elect mathematics and/or to enter mathematics-related careers.


2009 ◽  
Vol 103 (1) ◽  
pp. 69

The Mathematics Teacher is eager to publish articles about teaching mathematics at the entry level. These courses are critical to fostering students' pursuit of and love for learning mathematics through the high school years and beyond.


Sign in / Sign up

Export Citation Format

Share Document