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XXVIII.—On a Proposition in the Theory of Numbers

Published online by Cambridge University Press:  17 January 2013

Balfour Stewart Esq.
Affiliation:
Kew Observatory.

Extract

Problem. If p be one of the roots of the equation xm − 1 = 0, (not 1,) then (1 − p)(1 − p2) …. (1 − pm − 1) = m, provided m is a prime number.

If m be not a prime number, and if , the same will hold for all roots p = p1α, where α is a number < m and prime to m. But for all roots p = p1α, where α, or one of its prime factors, is also a prime factor of m, the product (1 − p)(1 − p2) …. (1 − pm − 1) will be equal to 0.

Type
Research Article
Copyright
Copyright © Royal Society of Edinburgh 1857

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