{(1/sqrt(2))^n} from n=1 to infinity; is the series convergent or divergent? if convergent, why? and sum?

Question

asked Dec 1, 2018 55.7k views

1 Answer

Gayan · Answer 1 · 2018-12-05T14:05:42+0000

This is a geometric series with common ratio between terms of
$r=\frac1{\sqrt2}$ .

It should be clear to you that
$\frac1{\sqrt2}<1$ , which means the series will converge.

The sum would be

$\displaystyle\sum_(n\ge1)\left(\frac1{\sqrt2}\right)^n=\frac1{\sqrt2}\sum_(n\ge1)\left(\frac1{\sqrt2}\right)^(n-1)=\frac1{\sqrt2}*\frac1{1-\frac1{\sqrt2}}=\frac1{\sqrt2-1}=1+\sqrt2$

{(1/sqrt(2))^n} from n=1 to infinity; is the series convergent or divergent? if convergent, why? and sum?

Please log in or register to add a comment.

Please log in or register to answer this question.

1 Answer

Please log in or register to add a comment.

Related questions

Categories

Other Questions