How do you find the sum of the geometric series $Sigma 5* 2^(n-1)$ n=1 to 9?

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Answer 1 · 2016-11-18T06:12:53

Sum of first $9$ terms is $2560$

In this geometric series first term $a_1=5.2^(1-1)=5*1=5$ and common ratio $r$ is $2$ , as second term is $a_2=5.2^(2-1)=5*2=10$ and $a_2/a_1=10/5=2$

The sum of such a series for first $n$ terms is given by

$S_n=a_1xx(r^n-1)/(r-1)$ and hence $S_n=5xx(2^n-1)/(2-1)$ , as $a_1=5$ and $r=2$ and

Sum of first $9$ terms is $5xx(2^9-1)/(2-1)=5xx512/1=2560$

How do you find the sum of the geometric series Sigma 5* 2^(n-1)Sigma 5* 2^(n-1) n=1 to 9?