On the Greatest Common Divisor of Binomial Coefficients n q, n 2q, n 3q, …
Abstract
Every binomial coefficient aficionado knows that the greatest common divisor of the binomial coefficients n1, n2,…, nn-1 equals p if n=pi for some i>0 and equals 1 otherwise. It is less well known that the greatest common divisor of the binomial coefficients 2n2,2n4,…,2n2n-2 equals (a certain power of 2 times) the product of all odd primes p such that 2n=pi+pj for some 0 i j. This note gives a concise proof of a tidy generalization of these facts.
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