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2019-05-07, 20:16
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#1 |
Mar 2016
3×5×23 Posts |
angle for gaussian primes ?
A peaceful and pleasant evening,
is it possible to calculate an angle for gaussian primes ? for example 5=(2+i)(2-i) alpha = arc tan (2/1) Would be nice to get a link or a clear answer, Greetings from the gaussian primes    Bernhard |
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2019-05-07, 20:41
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#2 | |
Sep 2002
Database er0rr
3,739 Posts |
Quote:
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2019-05-09, 10:34
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#3 |
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Romulan Interpreter
Jun 2011
Thailand
7×1,373 Posts |
What's wrong with polar form?
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2019-05-09, 11:53
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#4 |
Feb 2017
Nowhere
464310 Posts |
If R = Z[i], p is a prime number, p == 1 (mod 4), then pR = PP', the product of two conjugate prime ideals. If P = (a + b*i)R, it is easily shown that the argument of a + b*i is not a rational multiple of the number pi. (Pk is not a rational integer for any integer k other than 0.)
However, it is also easily shown that, if p1, p2, ..., pk are k distinct prime numbers congruent to 1 (mod 4), Pj = (aj + i*bj)R is a prime divisor of pjR, j = 1 to k, and xj = arg(aj + i*bj)/pi <-- the circle number, then the xj are Z-linearly independent -- a much stronger result. This result follows from unique factorization in R -- the product of integer powers of the Pj is not a rational number unless all the exponents are 0. Why the above argument does not apply to the prime divisor of 2R is left as an exercise for the reader. |
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