PLEASE HELP!!! Use sigma notation to represent the following series for the first 12 terms.

if you notice, in the sum the terms are 2, -8, 32, -128....

we can always get the "common ratio" of a geometric sequence by dividing the "following term by the previous term", namely like in this case say -8/2, which is -4, so r = -4, and we know the first term is 2.

so, notice, the pattern will then be

[tex]\bf \stackrel{2(-4)^0}{2}~~\stackrel{2(-4)^1}{-8}~~\stackrel{2(-4)^2}{32}~~\stackrel{2(-4)^3}{-128}\qquad \implies \qquad \sum\limits_{k=0}^{11}~2(-4)^k[/tex]

psm22415 psm22415 · Answer 2 · 2022-05-05T17:52:28+02:00

By using sigma notation to represent the following series for the first 12 terms is [tex]\rm \sum_{11}^{k=0}=2(-4)^k[/tex].

What is sigma notation?

Sigma notation is a convenient method to represent an infinite number of terms.

'The given series is;

2, -8, 32, -128

The first term is a which is 2.

And the common ratio is r which is;

[tex]\rm r=\dfrac{-8}{2}\\\\r = -4[/tex]

By using sigma notation to represent the following series for the first 12 terms is;

[tex]\rm \sum_{11}^{k=0}=2(-4)^k[/tex]

Hence, By using sigma notation to represent the following series for the first 12 terms is [tex]\rm \sum_{11}^{k=0}=2(-4)^k[/tex].

Learn more about sigma notation;

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