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29 September, 05:55

The circumference of a sphere was measured to be 72 cm with a possible error of 0.5 cm. (a) Use differentials to estimate the maximum error in the calculated surface area. (Round your answer to the nearest integer.) 22.91 Correct: Your answer is correct. cm2 What is the relative error

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  1. 29 September, 07:22
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    dA (s) = 22,917 cm² maximum error

    dA (s) / A (s) = 0,01389 or 1,38 % relative error

    Step-by-step explanation:

    The Volume of a sphere is:

    V (s) = 4/3) * π*r³ where r is the radius of circumference

    If the length of circumference is 72 cm then

    L (c) = 72 = 2*π*r

    r = 72/2*π

    r = 72 / 6,28 ⇒ r = 11,46 cm

    And

    L (c) = 2*π*r

    Differentiation on both sides of the equation give:

    dL (c) = 2*π*dr

    dr = dL (c) / 2*π

    dr = 0,5 / 6,28 ⇒ dr = 0,07961

    The surface area Is:

    A (s) = 4*π*r²

    And the maximum or absolute error is

    dA (s) = 8*π*r*dr

    dA (s) = 22,917 cm²

    The relative error is dA (s) / A (s)

    dA (s) / A (s) = 8*π*r*dr / 4*π*r²

    dA (s) / A (s) = 2 * (0,07961) / (11,46)

    dA (s) / A (s) = 0,01389 or 1,38 %
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