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1 results

  • Almost Squares and Factorisations in Consecutive Integers

  • N. Saradha, T. N. Shorey
  • Journal:
    Compositio Mathematica / Volume 138 / Issue 1 / August 2003
    Published online by Cambridge University Press:
    04 December 2007, pp. 113-124
    Print publication:
    August 2003
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  • We show that there is no square other than 122 and 7202 such that it can be written as a product of k−1 integers out of k(≥3) consecutive positive integers. We give an extension of a theorem of Sylvester that a product of k consecutive integers each greater than k is divisible by a prime exceeding k.