## An introduction to the theory of numbers |

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### Contents

THE SERIES OF PRIMES | 1 |

THE SERIES OF PRIMES | 12 |

FAREY SERIES AND A THEOREM OF MINKOWSKI | 23 |

22 other sections not shown

### Other editions - View all

An Introduction to the Theory of Numbers Godfrey Harold Hardy,Edward Maitland Wright Limited preview - 1979 |

### Common terms and phrases

absolutely convergent algebraic number algorithm argument arithmetic coefficients congruence conjecture contradiction convergent convex coordinates coprime corresponding cubes D. H. Lehmer decimal deduce defined digits divides divisible equation equivalent Euclid's Euclid's algorithm Euclidean Euler example Farey Farey series Fermat's theorem follows formula function fundamental theorem Gauss Gaussian integers give h'jk infinite infinity integral quaternions interval irrational Journal London Math Kronecker's theorem Landau lattice point least Minkowski Minkowski's theorem modm modp modulus multiple non-residue notation NOTES ON CHAPTER number of primes odd prime parallelogram particular plainly positive integers positive number prime factor problem proof of Theorem properties prove Theorem quadratfrei quadratic residue rational integers rational prime region representable result roots satisfies sequence simple continued fraction solution square suppose Theorem 44 theory of numbers trivial true unity values Waring's problem Wilson's theorem write