2 Answers

Anand Gaurav · Answer 1 · 2020-03-25T19:47:33+0000

Answer: This series would have no last term. The general form of the infinite geometric series is a1+a1r+a1r2+a1r3+... , where a1 is the first term and r is the common ratio.

Explanation:

RBerteig · Answer 2 · 2020-03-27T21:23:00+0000

Answer:

$S_(\infty)=(80)/(3)$

Explanation:

The sum of an infinite geometric series is given by:

$S_(\infty)=(a)/(1-r)$ ,

The given geometric series is

$\sum_(n=1)^(\infty)32(-(1)/(5))^(n-1)$

The constant ratio for this series is

r=-(1)/(5)

The first term of the series is
a=32(-(1)/(5))^(1-1)=32

The sum to infinity is
$S_(\infty)=(32)/(1--(1)/(5))$

$\implies S_(\infty)=(32)/((6)/(5))=(80)/(3)$

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