Let ak = 2k + 1 and bk = (k 1)3 + k + 2 for all integers k 0. Show that the first three
Chapter 5, Problem 7(choose chapter or problem)
Let ak = 2k + 1 and bk = (k 1)3 + k + 2 for all integers k 0. Show that the first three terms of these sequences are identical but that their fourth terms differ.
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