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23 May, 20:34

A sequence is defined recursively using the equation. If f (1) = 100, what is f (6) ?

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  1. 23 May, 20:47
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    Step-by-step explanation:

    The complete question is:

    A sequence is defined recursively using the equation f (n + 1) = f (n) - 8. If f (1) = 100, what is f (6) ?

    Since, A sequence is defined recursively using the equation f (n + 1) = f (n) - 8. If f (1) = 100, we have to find the value of f (6).

    Consider

    f (n+1) = f (n) - 8

    Let n = 1, we get

    f (1+1) = f (2) = f (1) - 8 = 100-8 = 92

    Let n = 2, we get

    f (2+1) = f (3) = f (2) - 8 = 92-8 = 84

    Let n = 3, we get

    f (3+1) = f (4) = f (3) - 8 = 84 - 8 = 76

    Let n = 4, we get

    f (4+1) = f (5) = f (4) - 8 = 76 - 8 = 68

    Let n = 5, we get

    f (5+1) = f (6) = f (5) - 8 = 68-8 = 60

    Therefore, the value of f (6) is 60.
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