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13 May, 13:16

The first two terms in a geometric series are 20, 22. To two decimal places, the sum of the first k terms of the series is 271.59. Find k.

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  1. 13 May, 15:02
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    k=9

    Step-by-step explanation:

    First find r=22/20=1.1

    The sum of the first k terms formula is a1• (1-r^k) / (1-r)

    a1=20 and the sum is 271.59

    Now plug in these values in the formula and find k.

    271.59=20 (1-1.1^k) / (1-1.1)

    When you simplify this equation, you will get k=ln (2.358) / ln (1.1)

    k=9
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