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Book Categories |
Preface | ||
Ch. 1 | Sums and Differences | 1 |
Ch. 2 | Products and Divisibility | 24 |
Ch. 3 | Order of Magnitude | 43 |
Ch. 4 | Averages | 64 |
Interlude 1 | Calculus | 83 |
Ch. 5 | Primes | 96 |
Interlude 2 | Series | 111 |
Ch. 6 | Basel Problem | 146 |
Ch. 7 | Euler's Product | 159 |
Interlude 3 | Complex Numbers | 187 |
Ch. 8 | The Riemann Zeta Function | 193 |
Ch. 9 | Symmetry | 216 |
Ch. 10 | Explicit Formula | 229 |
Interlude 4 | Modular Arithmetic | 254 |
Ch. 11 | Pell's Equation | 260 |
Ch. 12 | Elliptic Curves | 274 |
Ch. 13 | Analytic Theory of Algebraic Numbers | 295 |
Solutions | 327 | |
Bibliography | 375 | |
Index | 379 |
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Add Primer of Analytic Number Theory: From Pythagoras to Riemann, This undergraduate-level introduction describes those mathematical properties of prime numbers that can be deduced with the tools of calculus. Jeffrey Stopple pays special attention to the rich history of the subject and ancient questions on polygonal num, Primer of Analytic Number Theory: From Pythagoras to Riemann to the inventory that you are selling on WonderClubX
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Add Primer of Analytic Number Theory: From Pythagoras to Riemann, This undergraduate-level introduction describes those mathematical properties of prime numbers that can be deduced with the tools of calculus. Jeffrey Stopple pays special attention to the rich history of the subject and ancient questions on polygonal num, Primer of Analytic Number Theory: From Pythagoras to Riemann to your collection on WonderClub |