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Find the sum of the geometric series with a1 = -1, r = -2 And a10 = 512

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SGarratt · Answer 1 · 2019-09-20T18:17:19+0000

Assuming you want the sum of the first

terms:

$S_n=a_1+a_2+\cdots+a_(n-1)+a_n$

$S_n=a_1+ra_1+\cdots+r^(n-2)a_1+r^(n-1)a_1$

$rS_n=ra_1+r^2a_1+\cdots+r^(n-1)a_1+r^na_1$

$\implies S_n-rS_n=a_1-r^na_1\iff(1-r)S_n=(1-r^n)a_1\implies S_n=(1-r^n)/(1-r)a_1$

You're given that
a_1=-1

and

, so

$S_n=(1-(-2)^n)/(1-(-2))(-1)=-\frac{1-(-2)^n}3$

The fact that you're given
a_(10)

makes me think you're supposed to find
S_(10)

, which is just a matter of setting
n=10

in the formula above.

$S_(10)=-\frac{1-(-2)^(10)}3=-\frac{1-1024}3=341$

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