A Geometric Series is the sum of an infinite terms that the ration of two consecutive terms is a constant a. In general, it can be expressed as Σ 00 n+1 > ar" = n=0 r - Alternatively, 구) a + ar + ar + ar* + ... + ar" | r - 1 If the constant a = 1, prove the following geometric series by induction %3D
A Geometric Series is the sum of an infinite terms that the ration of two consecutive terms is a constant a. In general, it can be expressed as Σ 00 n+1 > ar" = n=0 r - Alternatively, 구) a + ar + ar + ar* + ... + ar" | r - 1 If the constant a = 1, prove the following geometric series by induction %3D
College Algebra
7th Edition
ISBN:9781305115545
Author:James Stewart, Lothar Redlin, Saleem Watson
Publisher:James Stewart, Lothar Redlin, Saleem Watson
Chapter8: Sequences And Series
Section8.3: Geometric Sequences
Problem 4E: (a) The nth partial sum of a geometric sequence an=arn1 is given by Sn=. (b) The series...
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Transcribed Image Text:1. A Geometric Series is the sum of an infinite terms that the ration of two consecutive terms is a
constant a. In general, it can be expressed as
Σ
ar" = a
n=0
Alternatively,
a + ar + ar + ar° + ... + ar" = a
( pn+1
If the constant a = 1, prove the following geometric series by induction
1+r+r² + r³+... + r" =
pn+1
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