Question
Let t n, t n + 1 , t n + 2 (all positive) be any 3 consecutive terms of an arbitrary geometric progression. Prove
Let t n, t n + 1 , t n + 2 (all positive) be any 3 consecutive terms of an arbitrary geometric progression. Prove that t n + 1 is the Geometric Mean of t n and t n + 2.
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Probability And Statistics
Authors: Morris H. DeGroot, Mark J. Schervish
4th Edition
9579701075, 321500466, 978-0176861117, 176861114, 978-0134995472, 978-0321500465
