36. Find the sum of the infinite geometric series if it exists. 1+\frac{3}{2}+\frac{9}{4}+\frac{27}{8}+\cdots

asked Jun 17, 2023 217k views

1 vote

36. Find the sum of the infinite geometric series if it exists.

1+\frac{3}{2}+\frac{9}{4}+\frac{27}{8}+\cdots

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Answer:

$=2* \left( (3)/(2) \right)^(n+1) -2$

Explanation:

$1+(3)/(2) +(9)/(4) +(27)/(8) +\cdots$

$=1+\left( (3)/(2) \right)^(1) +\left( (3)/(2) \right)^(2) +\cdots +((3)/(2))^n$

$=(1-\left( (3)/(2) \right)^(n+1) )/(1-(3)/(2) )$

$=-2* \left( 1-\left( (3)/(2) \right)^(n+1) \right)$

$=2* \left( \left( (3)/(2) \right)^(n+1) -1\right)$

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