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Gardner, Martin – Scientific American, 1979
Discusses some theorems and properties of figures produced when circles are tangent to one another. (GA)
Descriptors: Game Theory, Games, Mathematics, Models
Peer reviewedTodd, Robert M., Ed.; Teates, Thomas G., Ed. – School Science and Mathematics, 1978
The development of square units for area and cube units for volume is discussed with emphasis that switching focus from one physical property to another is involved as opposed to simply multiplying units. (MN)
Descriptors: Activity Units, Elementary Secondary Education, Geometry, History
Peer reviewedJamski, William D. – Mathematics Teacher, 1978
A classroom activity is described where students divided circular regions into equal sections and reassembled them to determine the formula for the area of a circle. Using an odd number of sections (Instead of an even number) changes the shape of the reassembled pieces but still gives rise to the same formula. (MN)
Descriptors: Experiential Learning, Geometry, Instruction, Instructional Materials
Peer reviewedCohen, Martin P.; And Others – Mathematics Teacher, 1978
A combination of trigonometry and algebra is used to focus on the concept of congruent triangles. (JT)
Descriptors: Congruence, Geometric Concepts, Mathematics Instruction, Secondary Education
Peer reviewedBruckheimer, Maxim; Hershkowitz, Rina – Mathematics Teacher, 1977
Three different geometric constructions of the parabola are described.
Descriptors: College Mathematics, Geometry, Higher Education, Instruction
Peer reviewedDodd, W. A. – Mathematics in School, 1977
A general historical background for the development of some common formulas concerning length, area, and volume is given through a discussion of various written records. (MN)
Descriptors: Geometry, Mathematical Enrichment, Mathematical Formulas, Mathematics
Peer reviewedMillington, W. – Mathematics in School, 1977
Designs and arrangements of pentominoes are examined. (SD)
Descriptors: Geometric Concepts, Geometry, Instruction, Mathematical Enrichment
Peer reviewedLesh, Richard – Journal for Research in Mathematics Education, 1977
The activities of a research working group are described. The investigators from several institutions coordinate their work on space and geometry. Underlying assumptions of the group and issues faced by it are described. (SD)
Descriptors: Educational Research, Geometric Concepts, Geometry, Mathematics Education
Peer reviewedRosser, Rosemary A.; And Others – Child Study Journal, 1988
Three degrees of cognitive processing were tapped by four problem types when 60 children between four and eight years were administered a set of geometry tasks differing in complexity. Analysis revealed that the tasks differed in difficulty, task success was related to age, and a hierarchical sequence existed among the skills. (SKC)
Descriptors: Cognitive Development, Developmental Stages, Geometry, Mathematical Concepts
Peer reviewedPage, Warren, Ed. – College Mathematics Journal, 1984
Discusses: (1) how complex roots can be made visible; (2) a proof which supplies a fresh example of mathematical induction; (3) proving Heron's formula tangentially; and (4) income tax averaging and convexity. (JN)
Descriptors: Algebra, College Mathematics, Geometry, Higher Education
Peer reviewedKilpatrick, Harold C.; Waters, William M., Jr. – Mathematics and Computer Education, 1986
How to determine when there is a unique solution when two sides and an angle of a triangle are known, using simple algebra and the law of cosines, is described. (MNS)
Descriptors: Algebra, College Mathematics, Geometric Concepts, Higher Education
Peer reviewedJordan, S. L.; Kauffman, L. H. – International Journal of Mathematical Education in Science and Technology, 1976
A twenty-week course was designed around investigating many properties of the torus. Topology, differential geometry, and topics from both real and complex analysis were included. (SD)
Descriptors: Calculus, College Mathematics, Course Content, Curriculum
Peer reviewedLloyd, D. G. H. B. – Mathematics in School, 1976
The author argues that sine, secant, and tangent should be taught as the three basic trigonometric functions rather than sine, cosine, and tangent. (SD)
Descriptors: Curriculum, Geometry, Instruction, Mathematics Education
Peer reviewedHaak, Sheila – Mathematics Teacher, 1976
Descriptors: Art Activities, Elementary Secondary Education, Geometry, Instruction
Feinstein, Irwin K. – MATYC Journal, 1976
A method is presented for finding an asymptote which is not parallel to the x or y axis in a graph. (DT)
Descriptors: Analytic Geometry, Calculus, College Mathematics, Higher Education
