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We show under a couple of assumptions concerning the constants c_i that the ratio of the n-th root of a_n to the (n-1)-st root of a_{n-1} is strictly decreasing for all n>=N, for some N depending on the sequence, and has limit 1. In particular, this holds in the cases when all of the c_i are unity or when all of the c_i are zero except for the first and last, which are unity. 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We show under a couple of assumptions concerning the constants c_i that the ratio of the n-th root of a_n to the (n-1)-st root of a_{n-1} is strictly decreasing for all n>=N, for some N depending on the sequence, and has limit 1. In particular, this holds in the cases when all of the c_i are unity or when all of the c_i are zero except for the first and last, which are unity. 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