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Designed for high school students and teachers with an interest in mathematical problem-solving, this volume offers a wealth of nonroutine problems in geometry that stimulate students to explore unfamiliar or little-known aspects of mathematics.
Included are nearly 200 problems dealing with congruence and parallelism, the Pythagorean theorem, circles, area relationships, Ptolemy and the cyclic quadrilateral, collinearity and concurrency, and many other subjects. Within each topic, the problems are arranged in approximate order of difficulty. Detailed solutions (as well as hints) are provided for all problems, and specific answers for most.
Invaluable as a supplement to a basic geometry textbook, this volume offers both further explorations on specific topics and practice in developing problem-solving techniques.
LanguageEnglish
PublisherDover Publications
Release dateApr 30, 2012
ISBN9780486134864
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Challenging Problems in Geometry - Alfred S. Posamentier
Coverimage
Challenging Problems in Geometry
ALFRED S. POSAMENTIER
Professor of Mathematics Education
The City College of the City University of New York
CHARLES T. SALKIND
Late Professor of Mathematics
Polytechnic University, New York
DOVER PUBLICATIONS, INC.
New York
Copyright
Copyright © 1970, 1988 by Alfred S. Posamentier.
All rights reserved.
Bibliographical Note
This Dover edition, first published in 1996, is an unabridged, very slightly altered republication of the work first published in 1970 by the Macmillan Company, New York, and again in 1988 by Dale Seymour Publications, Palo Alto, California. For the Dover edition, Professor Posamentier has made two slight alterations in the introductory material.
Library of Congress Cataloging-in-Publication Data
Posamentier, Alfred S.
Challenging problems in geometry / Alfred S. Posamentier, Charles T. Salkind.
p. cm.
Originally published: New York: The Macmillan Company, 1970.
ISBN-13: 978-0-486-69154-1
ISBN-10: 0-486-69154-3
1. Geometry—Problems, exercises, etc. I. Salkind, Charles T., 1898–. II. Title.
QA459.P681996
Manufactured in the United States by Courier Corporation
69154307
www.doverpublications.com
CONTENTS
Introduction
Preparing to Solve a Problem
SECTION I
A New Twist on Familiar Topics
Hints
Appendix I:
Selected Definitions, Postulates, and Theorems
Appendix II:
Selected Formulas
INTRODUCTION
The challenge of well-posed problems transcends national boundaries, ethnic origins, political systems, economic doctrines, and religious beliefs; the appeal is almost universal. Why? You are invited to formulate your own explanation. We simply accept the observation and exploit it here for entertainment and enrichment.
This book is a new, combined edition of two volumes first published in 1970. It contains nearly two hundred problems, many with extensions or variations that we call challenges. Supplied with pencil and paper and fortified with a diligent attitude, you can make this material the starting point for exploring unfamiliar or little-known aspects of mathematics. The challenges will spur you on; perhaps you can even supply your own challenges in some cases. A study of these nonroutine problems can provide valuable underpinnings for work in more advanced mathematics.
This book, with slight modifications made, is as appropriate now as it was a quarter century ago when it was first published. The National Council of Teachers of Mathematics (NCTM), in their Curriculum and Evaluation Standards for High School Mathematics (1989), lists problem solving as its first standard, stating that mathematical problem solving in its broadest sense is nearly synonymous with doing mathematics.
They go on to say, [problem solving] is a process by which the fabric of mathematics is identified in later standards as both constructive and reinforced.
This strong emphasis on mathematics is by no means a new agenda item. In 1980, the NCTM published An Agenda for Action. There, the NCTM also had problem solving as its first item, stating, educators should give priority to the identification and analysis of specific problem solving strategies …. [and] should develop and disseminate examples of ‘good problems’ and strategies.
It is our intention to provide secondary mathematics educators with materials to help them implement this very important recommendation.
ABOUT THE BOOK
Challenging Problems in Geometry is organized into three main parts: Problems,
Solutions,
and Hints.
Unlike many contemporary problem-solving resources, this book is arranged not by problem-solving technique, but by topic. We feel that announcing the technique to be used stifles creativity and destroys a good part of the fun of problem solving.
The problems themselves are grouped into two sections. Section I, A New Twist on Familiar Topics,
covers five topics that roughly parallel the sequence of the high school geometry course. Section II, Further Investigations,
presents topics not generally covered in the high school geometry course, but certainly within the scope of that audience. These topics lead to some very interesting extensions and enable the reader to investigate numerous fascinating geometric relationships.
Within each topic, the problems are arranged in approximate order of difficulty. For some problems, the basic difficulty may lie in making the distinction between relevant and irrelevant data or between known and unknown information. The sure ability to make these distinctions is part of the process of problem solving, and each devotee must develop this power by him- or herself. It will come with sustained effort.
In the Solutions
part of the book, each problem is restated and then its solution is given. Answers are also provided for many but not all of the challenges. In the solutions (and later in the hints), you will notice citations such as (#23)
and (Formula #5b).
These refer to the definitions, postulates, and theorems listed in Appendix I, and the formulas given in Appendix II.
From time to time we give alternate methods of solution, for there is rarely only one way to solve a problem. The solutions shown are far from exhaustive, and intentionally so, allowing you to try a variety of different approaches. Particularly enlightening is the strategy of using multiple methods, integrating algebra, geometry, and trigonometry. Instances of multiple methods or multiple interpretations appear in the solutions. Our continuing challenge to you, the reader, is to find a different method of solution for every problem.
The third part of the book, "Hints," offers suggestions for each problem and for selected challenges. Without giving away the solution, these hints can help you get back on the track if you run into difficulty.
USING THE BOOK
This book may be used in a variety of ways. It is a valuable supplement to the basic geometry textbook, both for further explorations on specific topics and for practice in developing problem-solving techniques. The book also has a natural place in preparing individuals or student teams for participation in mathematics contests. Mathematics clubs might use this book as a source of independent projects or activities. Whatever the use, experience has shown that these problems motivate people of all ages to pursue more vigorously the study of mathematics.
Very near the completion of the first phase of this project, the passing of Professor Charles T. Salkind grieved the many who knew and respected him. He dedicated much of his life to the study of problem posing and problem solving and to projects aimed at making problem solving meaningful, interesting, and instructive to mathematics students at all levels. His efforts were praised by all. Working closely with this truly great man was a fascinating and pleasurable experience.
Alfred S. Posamentier
1996
PREPARING TO SOLVE A PROBLEM
A strategy for attacking a problem is frequently dictated by the use of analogy. In fact, searching for an analogue appears to be a psychological necessity. However, some analogues are more apparent than real, so analogies should be scrutinized with care. Allied to analogy is structural similarity or pattern. Identifying a pattern in apparently unrelated problems is not a common achievement, but when done successfully it brings immense satisfaction.
Failure to solve a problem is sometimes the result of fixed habits of thought, that is, inflexible approaches. When familiar approaches prove fruitless, be prepared to alter the line of attack. A flexible attitude may help you to avoid needless frustration.
Here are three ways to make a problem yield dividends:
(1)The result of formal manipulation, that is, the answer,
may or may not be meaningful; find out! Investigate the possibility that the answer is not unique. If more than one answer is obtained, decide on the acceptability of each alternative. Where appropriate, estimate the answer in advance of the solution. The habit of estimating in advance should help to prevent crude errors in manipulation.
(2)Check possible restrictions on the data and/or the results. Vary the data in significant ways and study the effect of such variations on the original result.
(3)The insight needed to solve a generalized problem is sometimes gained by first specializing it. Conversely, a specialized problem, difficult when tackled directly, sometimes yields to an easy solution by first generalizing it.
As is often true, there may be more than one way to solve a problem. There is usually what we will refer to as the peasant’s way
in contrast to the poet’s way
—the latter being the more elegant method.
To better understand this distinction, let us consider the following problem:
If the sum of two numbers is 2, and the product of these same two numbers is 3, find the sum of the reciprocals of these two numbers.
Those attempting to solve the following pair of equations simultaneously are embarking on the peasant’s way
to solve this problem.
Substituting for y in the second equation yields the quadratic equation, x² − 2x + 3 = 0. Using the quadratic formula we can find . By adding the reciprocals of these two values of x, the answer appears. This is clearly a rather laborious procedure, not particularly elegant.
The poet’s way
involves working backwards. By considering the desired result
and seeking an expression from which this sum may be derived, one should inspect the algebraic sum:
The answer to the original problem is now obvious! That is, since x + y = 2 and xy = 3, This is clearly a more elegant solution than the first one.
The poet’s way
solution to this problem points out a very useful and all too often neglected method of solution. A reverse strategy is certainly not new. It was considered by Pappus of Alexandria about 320 A.D. In Book VII of Pappus’ Collection there is a rather complete description of the methods of analysis
and synthesis.
T. L. Heath, in his book A Manual of Greek Mathematics (Oxford University Press, 1931, pp. 452-53), provides a translation of Pappus’ definitions of these terms:
Analysis takes that which is sought as if it were admitted and passes from it through its successive consequences to something which is admitted as the result of synthesis: for in analysis we assume that which is sought as if it were already done, and we inquire what it is from which this results, and again what is the antecedent cause of the latter, and so on, until, by so retracing our steps, we come upon something already known or belonging to the class of first principles, and such a method we call analysis as being solution backward.
But in synthesis, reversing the progress, we take as already done that which was last arrived at in the analysis and, by arranging in their natural order as consequences what before were antecedents, and successively connecting them one with another, we arrive finally at the construction of that which was sought: and this we call synthesis.
Unfortunately, this method has not received its due emphasis in the mathematics classroom. We hope that the strategy recalled here will serve you well in solving some of the problems presented in this book.
Naturally, there are numerous other clever problem-solving strategies to pick from. In recent years a plethora of books describing various problem-solving methods have become available. A concise description of these problem-solving strategies can be found in Teaching Secondary School Mathematics: Techniques and Enrichment Units, by A. S. Posamentier and J. Stepelman, 4th edition (Columbus, Ohio: Prentice Hall/Merrill, 1995).
Our aim in this book is to strengthen the reader’s problem-solving skills through nonroutine motivational examples. We therefore allow the reader the fun of finding the best path to a problem’s solution, an achievement generating the most pleasure in mathematics.
PROBLEMS
SECTION I
A New Twist on Familiar Topics
1.Congruence and Parallelism
The problems in this section present applications of several topics that are encountered early in the formal development of plane Euclidean geometry. The major topics are congruence of line segments, angles, and triangles and parallelism in triangles and various types of quadrilaterals.
1-1In any ΔABC, E and D are interior points of and , respectively (Fig. 1-1). bisects , and bisects . Prove .
Challenge 1Prove that this result holds if E coincides with C.
Challenge 2Prove that the result holds if E and D are exterior points on extensions of and through C.
1-2In ΔABC, a point D is on AC so that AB = AD (Fig. 1-2). . Find .
1-3The interior bisector of , and the exterior bisector of of ΔABC meet at D (Fig. 1-3). Through D, a line parallel to CB meets AC at L and AB at M. If the measures of legs LC and MB of trapezoid CLMB are 5 and 7, respectively, find the measure of base LM. Prove your result.
ChallengeFind LM if ΔABC is equilateral.
1-4In right ΔABC, CF is the median to hypotenuse AB, CE is the bisector of , and CD is the altitude to AB (Fig. 1-4). Prove that .
ChallengeDoes this result hold for a non-right triangle?
1-5The measure of a line segment PC, perpendicular to hypotenuse AC of right ΔABC, is equal to the measure of leg BC. Show BP may be perpendicular or parallel to the bisector of .
1-6Prove the following: if, in ΔABC, median AM is such that is divided in the ratio 1:2, and AM is extended through M to D so that is a right angle, then (Fig. 1-6).
ChallengeFind two ways of proving the theorem when .
1-7In square ABCD, M is the midpoint of AB. A line perpendicular to MC at M meets AD at K. Prove that .
ChallengeProve that ΔKDC is a 3–4–5 right triangle.
1-8Given any ΔABC, AE bisects , BD bisects , , and (Fig. 1-8), prove that PQ is parallel to AB.
ChallengeIdentify the points P and Q when ΔABC is equilateral.
1-9Given that ABCD is a square, CF bisects , and BPQ is perpendicular to CF (Fig. 1-9), prove DQ = 2PE.
1-10Given square ABCD with , prove ΔABC is equilateral (Fig. 1-10).
1-11In any ΔABC, D, E, and F are midpoints of the sides AC, AB, and BC, respectively (Fig. 1-11). BG is an altitude of ΔABC. Prove that .
Challenge 1Investigate the case when ΔABC is equilateral.
Challenge 2Investigate the case when AC = CB.
1-12In right ΔABC, with right angle at C, BD = BC, AE = AC, , and (Fig. 1-12). Prove that DE = EF + DG.
1-13Prove that the sum of the measures of the perpendiculars from any point on a side of a rectangle to the diagonals is constant.
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