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An Introduction To The Theory Of Numbers 2007th Edition Godfrey Harold Hardy

Name: An Introduction To The Theory Of Numbers 2007th Edition Godfrey Harold Hardy
SKU: BELL-84098046
Price: 31.00 USD
Availability: InStock
Rating: 4.25 (28 reviews)

SKU: BELL-84098046

$ 31.00 ~~$ 45.00~~ (-31%)

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28 reviews

An Introduction To The Theory Of Numbers 2007th Edition Godfrey Harold Hardy instant download after payment.

Publisher: 人民邮电出版社

File Extension: PDF

File size: 12.43 MB

Pages: 453

Author: Godfrey Harold Hardy, Edward Maitland Wright, [英]G.H.HARDY E.M.WRIGHT著, (英)G. H. Hardy, (英)E. M. Wright著, 哈代, Rdy Ha, 莱特, Ight Wr, G H Hardy, E M Wright

ISBN: 9787115156112, 7115156115

Language: English

Year: 2007

Edition: 2007

Product desciption

An Introduction To The Theory Of Numbers 2007th Edition Godfrey Harold Hardy by Godfrey Harold Hardy, Edward Maitland Wright, [英]g.h.hardy E.m.wright著, (英)g. H. Hardy, (英)e. M. Wright著, 哈代, Rdy Ha, 莱特, Ight Wr, G H Hardy, E M Wright 9787115156112, 7115156115 instant download after payment.

1 (p1): Ⅰ.THE SERIES OF PRIMES（1）
1 (p1-1): 1.1.Divisibility of integers
1 (p1-2): 1.2.Prime numbers
3 (p1-3): 1.3.Statement of the fundamental theorem of arithmetic
3 (p1-4): 1.4.The sequence of primes
5 (p1-5): 1.5.Some questions concerning primes
7 (p1-6): 1.6.Some notations
8 (p1-7): 1.7.The logarithmic function
9 (p1-8): 1.8.Statement of the prime number theorem
12 (p2): Ⅱ.THE SERIES OF PRIMES（2）
12 (p2-1): 2.1.First proof of Euclid’s second theorem
12 (p2-2): 2.2.Further deductions from Euclid’s argument
13 (p2-3): 2.3.Primes in certain arithmetical progressions
14 (p2-4): 2.4.Second proof of Euclid’s theorem
14 (p2-5): 2.5.Fermat’s and Mersenne’s numbers
16 (p2-6): 2.6.Third proof of Euclid’s theorem
17 (p2-7): 2.7.Further remarks on formulae for primes
19 (p2-8): 2.8.Unsolved problems concerning primes
19 (p2-9): 2.9.Moduli of integers
21 (p2-10): 2.10.Proof of the fundamental theorem of arithmetic
21 (p2-11): 2.11.Another proof of the fundamental theorem
23 (p3): Ⅲ.FAREY SERIES AND A THEOREM OF MINKOWSKI
23 (p3-1): 3.1.The definition and simplest properties of a Farey series
24 (p3-2): 3.2.The equivalence of the two characteristic properties
24 (p3-3): 3.3.First proof of Theorems 28 and 29
25 (p3-4): 3.4.Second proof of the theorems
26 (p3-5): 3.5.The integral lattice
27 (p3-6): 3.6.Some simple properties of the fundamental lattice
29 (p3-7): 3.7.Third proof of Theorems 28 and 29
29 (p3-8): 3.8.The Farey dissection of the continuum
31 (p3-9): 3.9.A theorem of Minkowski
32 (p3-10): 3.10.Proof of Minkowski’s theorem
34 (p3-11): 3.11.Developments of Theorem 37
38 (p4): Ⅳ.IRRATIONAL NUMBERS
38 (p4-1): 4.1.Some generalities
38 (p4-2): 4.2.Numbers known to be irrational
39 (p4-3): 4.3.The theorem of Pythagoras and its generalizations
41 (p4-4): 4.4.The use of the fundamental theorem in the proofs of Theorems 43-45…