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Integration by substitution?

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Solve the initial value problem.

(d^2y)/(dx^2) = 12(sec(6x))^2 tan(6x), y'(0) = 3, y(0) = -7

I am more interested in finding out the method than the answer. Thanks!

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  1. d²y/dx² = 12 sec²(6x) tan(6x)

    y' = ∫12 sec(6x) sec(6x) tan(6x)  dx

    let u = sec(6x)

    du = 6 sec(6x) tan(6x) dx

    sec(6x) tan(6x) = (1/6) du

    sec(6x) = (1/6) du

    y' = ∫12(1/6) u du

    y' = ∫2 u du

    y' = u² + C

    y' = sec²(6x) + C

    given y'(0) = 3

    3 = sec(6*0)² + C

    3 = 1 + C

    C = 2

    y' = sec²(6x) + 2

    y = ∫sec²(6x) + 2

    y = (1/6) tan(6x) + 2x + C

    given y(0) = -7

    -7 = (1/6) tan(6*0) + 2(0) + C

    C = -7

    y = (1/6)tan(6x) + 2x - 7

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