Find the sum of a geometric series with a1=-96 and r=-1/2 and n=5

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asked Sep 18, 2020 20.0k views

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Vegidio · Answer 1 · 2020-09-23T15:17:19+0000

Answer:

The sum of the series is: -66

Explanation:

We can use the formula for a partial sum
S_n of a geometric series of n terms, with first term
a_1 and ratio r:

S_n=(a_1(1-r^n))/(1-r)

which in our case translates into:

$S_n=(a_1(1-r^n))/(1-r)\\S_5=(-96(1-(-(1)/(2)) ^5))/(1-(-(1)/(2)) )\\S_5=(-96(1+(1)/(32) ))/(1+(1)/(2) )\\S_5=(-96((33)/(32) ))/((3)/(2) )\\S_5=-(96*11)/(16) \\S_5=-66$

Find the sum of a geometric series with a1=-96 and r=-1/2 and n=5

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