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A new version of the Euclidean algorithm for finding the greatest common divisor of n integers a i and multipliers x i such that gcd = x 1 a 1 + ··· + x n a n is presented. The number of arithmetic operations and the number of storage locations are linear in n . A theorem of Lamé that gives a bound for the number of iterations of the Euclidean algorithm for two integers is extended to the case of n integers. An algorithm to construct a minimal set of multipliers is presented. A Fortran program for the algorithm appears as Comm. ACM Algorithm 386.
Gordon H. Bradley (Wed,) studied this question.