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Text In this paper, the following results are proved: (i) For any odd integer l with at most two distinct prime factors and any positive integer n , the product (1l+1)(2l+1)⋯(nl+1)(1l+1)(2l+1)⋯(nl+1) is not a powerful number; (ii) For any integer r≥1r≥1, there exists a positive integer TrTr such that, if l is a positive odd integer with at most r distinct prime factors and n is an integer with n≥Trn≥Tr, then (1l+1)(2l+1)⋯(nl+1)(1l+1)(2l+1)⋯(nl+1) is not a powerful number. Video For a video summary of this paper, please visit http://youtu.be/nU-nkxNX1BA. |
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