musicgold
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HallsofIvy said:The point is that both of your series are geometric series. What you do in your last post is essentially repeating the proof that the sum of the geometric series, [itex]\sum_{n=0}^\infty r^n[/itex] is [itex]\frac{1}{1- r}[/itex] except that you have [itex]r= \frac{1}{\gamma}[/itex].
Mentallic said:There is no mention of infinite sums.
musicgold, so what is
[tex]\sum_{i=1}^{n}\frac{1}{1+y}[/tex]
musicgold said:Please see the attached file.
I think, I am close, but not sure how to get rid of the 'y' in the encircled term.
What am I missing?