The Mathematical Experience |
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Page 210
... prime number theorem , which is the subject of this section , has great attractions and mystery and is related to some of the central objects of mathematical analysis . It is also related to what is probably the most famous of the un ...
... prime number theorem , which is the subject of this section , has great attractions and mystery and is related to some of the central objects of mathematical analysis . It is also related to what is probably the most famous of the un ...
Page 212
... prime number or it isn't . If it is a prime number , it is a prime number greater than pm . If it isn't a prime number , it may be factored into prime numbers . But none of its prime factors can be 2 , 3 , 5 , . , Pm as we just saw ...
... prime number or it isn't . If it is a prime number , it is a prime number greater than pm . If it isn't a prime number , it may be factored into prime numbers . But none of its prime factors can be 2 , 3 , 5 , . , Pm as we just saw ...
Page 215
... prime pairs . It is thought that there are an infinite number of such pairs , though this is still an open question . Why do we believe it is true , even though there is no proof ? First of all , there is numerical ... Prime Number Theorem.
... prime pairs . It is thought that there are an infinite number of such pairs , though this is still an open question . Why do we believe it is true , even though there is no proof ? First of all , there is numerical ... Prime Number Theorem.
Other editions - View all
The Mathematical Experience, Study Edition Philip Davis,Reuben Hersh,Elena Anne Marchisotto Limited preview - 2011 |
The Mathematical Experience, Study Edition Philip Davis,Reuben Hersh,Elena Anne Marchisotto Limited preview - 2011 |
The Mathematical Experience: Study Edition Philip J. Davis,Reuben Hersh,Elena Anne Marchisotto Limited preview - 1995 |
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abstract aesthetic algebra algorithmic analysis analytic answer applications argument arithmetic asserts axiom of choice Bibliography calculus called century circle complex conjecture construct continuum hypothesis course definition differential equations elements ematics Euclid Euclidean geometry Euler example existence experience fact figure finite formal language formalist formula Fourier Fourier series function Further Readings G. H. Hardy Hilbert human hypercube hypersquares idea ideal infinite set infinitesimal infinity integers intuition knowledge Lakatos logic mathe mathematical objects mathematical proof mathematicians matics means ment method natural numbers non-Euclidean geometry non-Riemannian nonstandard notion number theory parallel postulate philosophy of mathematics physical Platonism Platonist possible postulate prime number prime number theorem problem proof proved question real numbers reason restricted set theory result rigorous sense solution square statement straight line symbols theorem thing tion triangle true truth universe words zero