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24 November, 04:16

Find the sum of the geometric series 1 + 0.8 + 0.8^2 + 0.8^3 + ... + 0.8^{19}

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  1. 24 November, 05:15
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    S20 ≈ 4.942

    Step-by-step explanation:

    Sum of a geometric series is expressed as Sn = a (1-rⁿ) / 1-r if r<1

    a is the first term

    r is the common ratio

    n is the number of terms

    Given the geometric series

    1 + 0.8 + 0.8^2 + 0.8^3 + ... + 0.8^{19}

    Given a = 1,

    r = 0.8/1 = 0.8²/0.8 = 0.8

    n = 20 (The total number of terms in the series is 20)

    Substituting this values in the formula above.

    S20 = 1 (1-0.8^20) / 1-0.8

    S20 = 1-0.01153/0.2

    S20 = 0.9885/0.2

    S20 ≈ 4.942
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