C. D. Olds

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Archive | 2000

The Geometry of Numbers: Solutions and Hints

C. D. Olds; Anneli Lax; Giuliana P. Davidoff

Chapter 1 1 a. y = ⅔ x + ⅕ (because 5 does not divide 3). Other examples are similar. b. (because 3 | 15). ( p 0 , q 0 ) = (5, 1); {( p k , q k ) = (5 + 15 k , 1 + 2 k ), | k is any integer}. 2. Hint: Use the distance formula to find the length d k of the line segment from ( p k -1 , q k -1 ) to ( p k , q k ). If d k is not a function of k , then d k is constant from any point to any adjacent lattice point.

Archive | 2000

The Geometry of Numbers

C. D. Olds; Anneli Lax; Giuliana P. Davidoff

Archive | 2000

The Geometry of Numbers: Minkowski's Fundamental Theorem

C. D. Olds; Anneli Lax; Giuliana P. Davidoff

Archive | 2000

The Geometry of Numbers: Lattice Points and Straight Lines

C. D. Olds; Anneli Lax; Giuliana P. Davidoff

Archive | 2000

The Geometry of Numbers: Brief Biographies

C. D. Olds; Anneli Lax; Giuliana P. Davidoff

Archive | 2000

The Geometry of Numbers: Linear Transformations and Integral Lattices

C. D. Olds; Anneli Lax; Giuliana P. Davidoff

Archive | 2000

The Geometry of Numbers: Preface

C. D. Olds; Anneli Lax; Giuliana P. Davidoff

Archive | 2000

The Geometry of Numbers: Bibliography

C. D. Olds; Anneli Lax; Giuliana P. Davidoff

Archive | 2000

The Geometry of Numbers: A New Principle in the Geometry of Numbers

C. D. Olds; Anneli Lax; Giuliana P. Davidoff

Archive | 2000

The Geometry of Numbers: Lattice Points and the Area of Polygons

C. D. Olds; Anneli Lax; Giuliana P. Davidoff

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Anneli Lax

New York University

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Giuliana P. Davidoff

Mount Holyoke College

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San Jose State University

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Network

Latest external collaboration on country level. Dive into details by clicking on the dots.

Hotspot

Dive into the research topics where C. D. Olds is active.

Publication

Featured researches published by C. D. Olds.

The Geometry of Numbers: Solutions and Hints

The Geometry of Numbers

The Geometry of Numbers: Minkowski's Fundamental Theorem

The Geometry of Numbers: Lattice Points and Straight Lines

The Geometry of Numbers: Brief Biographies

The Geometry of Numbers: Linear Transformations and Integral Lattices

The Geometry of Numbers: Preface

The Geometry of Numbers: Bibliography

The Geometry of Numbers: A New Principle in the Geometry of Numbers

The Geometry of Numbers: Lattice Points and the Area of Polygons

Collaboration

Dive into the C. D. Olds's collaboration.