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8 April, 10:32

Given that y=x^ (1/3), use calculus to determine an approximate value for ∛8030

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  1. 8 April, 12:53
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    F (x) = x^ (1/3)

    f (8000) = 8000^ (1/3) = 20

    f' (x) = 1/3 * x^ (-2/3)

    f' (x) = 1 / (3x^ (2/3))

    f' (8000) = 1 / (3*8000^ (2/3)) = 1 / (3*400) = 1/1200

    Linear approximation for f (x) about x = 8000

    L (x) = f (8000) + f' (8000) (x-8000)

    L (x) = 20 + 1/1200 (x-8000)

    8030^ (1/3) ≈ L (8030)

    = 20 + 1/1200 (8030-8000)

    = 20 + 30/1200

    = 20 + 1/40

    = 20.025
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