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31 March, 12:16

Find the area of the region bounded by the x-axis and the curves y=7sin (x) and y=7 cos (x) where x∈[0, (π/2) ]

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  1. 31 March, 14:59
    0
    To calculate the area between both curves, we must calculate the following integrals:

    int a-b [f (x) ] dx

    int a-b: integral from a to b

    f (x) : function

    Enter [0, (π / 2) ]

    int 0-π / 2 [ (7 cos (x) - 7sin (x)) ] dx = int 0 - π / 2 [ (7 cos (x) ] dx + int 0-π / 2 [-7sin (x)) ] dx

    Calculated:

    int 0-π / 2 [ (7 cos (x) ] dx = 7 (sin (π / 2) - sin (0)) = 7 (1-0) = 7

    int 0-π / 2 [-7 sin (x)) ] dx = 7 (cos (π / 2) - cos (0)) = 7 (0-1) = - 7

    int 0-π / 2 [ (7 cos (x) - 7sin (x)) ] dx = 7 + (-7) = 0

    answer

    the area of the region bounded by the x-axis and the curves y = 7sin (x) and y = 7 cos (x) where x∈ [0, (π / 2) ] is

    A=0
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