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- Mathematical Background: Foundations of Infinitesimal Calculus
- 3-2 Rational Numbers
- The Real Numbers
- The Real Numbers
- 9. P-Adic Numbers: I the Real Numbers R Are an Extension of the Rational Numbers Q. It Turns out That for Every Prime P There Is
- Chapter 1 Introductory Information and Review
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- Natural (Or Counting) Numbers N = {1, 2, 3, 4, 5
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- Note on P-Adic Expansions in Q Here We Tie up Some Loose Ends Concerning How P-Adic Expansions of (Ordinary) Integers and Rationals Look Inside of Qp
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- Arxiv:Math/0406429V1 [Math.NT] 22 Jun 2004 Generators Faseilrn Fqaenos H Uwt Utrin Ar Quaternions Hurwitz the Quaternions
- MATRICES of RATIONAL INTEGERS 1. Introduction. This Subject Is Very
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- Function Theories in Cayley-Dickson Algebras and Number Theory
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- THE P-ADIC EXPANSION of RATIONAL NUMBERS
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- RATIONAL POINTS Contents Introduction 1 1. Conics, Quaternion
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- Geometry of P-Adic Numbers
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- Periods and Line Arrangements: Contributions to the Kontsevich-Zagier Periods Conjecture and to the Terao Conjecture
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- Rational, Irrational, Complex, Transcendental
- Trick Or Truth: the Mysterious Connection Between Numbers and Motion and Geometry
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- Rational Numbers When You Think of Your Favourite Game, What Comes to Mind? It May Be a Computer Game Or Video Game
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