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Para outros livros sobre matemática e ensino da matemática procure em: http://livros-matema.blogspot.com/

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For other books about mathematics and mathematics education try: http://livros-matema.blogspot.com/.

domingo, 10 de junho de 2012

Fair Voting - Weighted Votes for Unequal Constituencies

William F. Lucas


 COMAP, Inc. |  1992  |  81 páginas | PDF


online: prof2000.pt

Students are challenged to use the mathematics of weighted voting to wrestle with important social issues such as how power can be measured quantitatively, and how power is divided in our government. HiMAP Module 19. 


Table of Contents:

CHAPTER 1: VOTING IN DEMOCRATIC INSTITUTIONS

CHAPTER 2: SOME APPROACHES TO FAIR REPRESENTATION 

CHAPTER 3: PROPORTIONAL WEIGHTED VOTING: A FIRST ATTEMPT TO REALIZE FAIR REPRESENTATION

CHAPTER 4: MEASURING POWER

CHAPTER 5: ADJUSTED WEIGHTED VOTING: A BETTER IDEA

CHAPTER 6: HISTORICAL ASPECTS

CHAPTER 7: ADDITIONAL TOPICS ON WEIGHTED VOTING

REFERENCES

TRANSPARENCIES

The Mathematical Theory of Elections

Joseph Malkevitch


COMAP, Inc. | 1999 |  68 páginas | PDF


online: prof2000.pt
semmathmodeling.wikispaces.com


This module illustrates how mathematics can design and analyze election and ranking methods. Preference schedules, fairness criteria, and weighted voting all demonstrate that how votes are counted can affect the outcome of an election. HiMAP Module 1.

Table of Contents:

SECTION 1: SOME ELECTIONS RESULTS

SECTION 2: TYPES OF BALLOTS

SECTION 3: ELECTION METHODS

SECTION 4: ARROW'S THEOREM

SECTION 5: PROPORTIONAL REPRESENTATION

SECTION 6: RECENT DEVELOPMENTS

REFERENCES

GLOSSARY

Math Trails


Joel Schneider, Henry Pollak and Mary Margaret Shoaf

Comap | 2004 | 136 páginas | PDF

online:  comap.com

Introduction 

A mathematics trail is a walk to discover mathematics. A math trail can be almost anywhere—a neighborhood, a business district or shopping mall, a park, a zoo, a library, even a government building. The math trail map or guide points to places where walkers formulate, discuss, and solve interesting mathematical problems. Anyone can walk a math trail alone, with the family, or with another group. Walkers cooperate along the trail as they talk about the problems. There’s no competition or grading. At the end of the math trail they have the pleasure of having walked the trail and of having done some interesting mathematics. Everyone, no matter what age, gets an “I Walked the Math Trail” button to wear. 

This book is a guide to blazing a math trail. We’ll review the history of math trails and discuss their attributes. We’ll also discuss practical issues of organization and logistics in setting up and maintaining a math trail. We’ll discuss mathematical issues in choosing and describing problems and tasks along a trail. And we’ll also describe a variety of specific examples of trails and of problems. 

Joel Schneider began his personal math trail in junior high school with a geometry problem found in a science fiction novel. His other stops included some modest research in commutative algebra; helping to develop an elementary school math curriculum and its teacher education program; leading the math team for Square One, a television series about math that PBS broadcast in the 90s; and developing a math game show for children’s television in several countries. Having worked at Sesame Workshop for more than 20 years, Joel passed away in 2004. 

After a rather pure education in mathematics, Henry Pollak spent the major part of his career at Bell Laboratories, including 22 years as Director of Mathematics and Statistics Research. At the same time, a growing interest in mathematics education led to his involvement in the Mathematical Association of America, and in a large variety of projects, from the School Mathematics Study Group to Mathematics: Modeling Our World. A recurring theme in much of his work is the need to wear the two hats of mathematics in the real world and mathematics education on the same head. Dr. Pollak has been a Visiting Professor at Teachers College of Columbia University since 1987. 

Mary Margaret Shoaf received her Ph.D. in Mathematics Education from Columbia University under the direction of Dr. Henry O. Pollak. Dr. Shoaf lives in Waco, Texas where she is an Associate Professor of Mathematics in the Department of Mathematics at Baylor University. Dr. Shoaf wishes to thank her Department Chairperson at Baylor University, Dr. Edwin Oxford, for all of his support and encouragement during the writing of this book. Her areas of research and interest are hand-held mathematics technology, the use of computers in the mathematics classroom, and designing and implementing mathematics curriculum for Grades 3–12 preservice and inservice mathematics teachers

Part 1: Purposes and Organization of a Math Trail
Introduction 6
Background and History 6
Characteristics of Math Trails 8
Blazing a Trail 10
Organizing a Math Trail Project 14

Part 2: Examples of Math Trails
Recreational Mathematics in the Park 16
Recreational Mathematics Around Town 34
Recreational Mathematics at the Zoo 47
Recreational Mathematics in a Mall 57

Part 3: Mathematics of Several Kinds of Trail Situations
Parking 70
Supermarkets 78
Buildings 82
A Hike in the Country 85
Tilings 88
American Flags 99
Moving Vans 106
Estimation 108

References 112

Appendix: “A Mathematics Trail Around the City of Melbourne”