1st published 1975, Second Printing 1978. The book contains a collection of 1351 problems (with answers) in plane and solid geometry for technical schools and colleges. The problems are of varied content, involving calculations, proof, construction of diagrams, and determination of the spatial location of geometrical points. It gives sufficient problems to meet the needs of students for practical work in geometry, and the requirements of the teacher for varied material for tests, etc.
There's no escaping problem employees. But with 101 prewritten disciplinary write-ups at a manager's fingertips, there is a way to escape the headaches, anxiety, and potential legal trouble of performance review or counseling sessions. Completely updated and covering the latest developments in employment law, the second edition of the book explains the disciplinary process from beginning to end and provides ready-to-use model documents in print and on disk that eliminate the stress and second-guessing about what to do and say.
Mathematical Problems and Puzzles from the Polish Mathematical Olympiads
This book is a translation of the second Polish edition, published in 1960, in which various improvements were made. The contest for secondary school pupils known as the Mathematical Olympiad has been held in Poland every year since 1949/50. The problems set at the contests require only a knowledge of school mathematics (i.e., elementary algebra, geometry and trigonometry) but are on the whole more difficult than the usual school exercises.
In this carefully researched study, the author examines Egyptian mathematics, demonstrating that although operations were limited in number, they were remarkably adaptable to a great many applications—solution of problems in direct and inverse proportion, linear equations of the first degree, and arithmetical and geometrical progressions
Lectures on Classical Differential Geometry: Second Edition
Excellent brief introduction presents fundamental theory of curves and surfaces and applies them to a number of examples. Topics include curves, theory of surfaces, fundamental equations, geometry on a surface, envelopes, conformal mapping, minimal surfaces, more. Well-illustrated, with abundant problems and solutions. Bibliography.