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13 January, 15:20

Find y as a function of x if y"' + 9y' = 0, y (0) = 6, y' (0) = 9, y" (0) = 18. y (x) =

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  1. 13 January, 17:55
    0
    y (x) = 8 - 2cos 3x + 3sin 3x

    Step-by-step explanation:

    Given the equation:

    y''' + 9y' = 0

    The characteristic equation:

    ⇒r³ + 9r = 0

    Solving for r, we get r = 0 and r = ± 3i

    The general equation for such equation is:

    y = C₁ + C₂cos 3x + C₃sin 3x

    Given:

    y (0) = 6

    Thus, Applying in the above equation, we get

    6 = C₁ + C₂ ... 1

    Differentiating y, we get:

    y' = - 3C₂sin 3x + 3C₃cos 3x

    Given:

    y' (0) = 9

    Thus, Applying in the above equation, we get

    9 = 3C₃

    or,

    C₃ = 3

    Differentiating y', we get:

    y'' = - 9C₂cos 3x - 9C₃sin 3x

    Given:

    y'' (0) = 18

    Thus, Applying in the above equation, we get

    18 = - 9C₂

    or,

    C₂ = - 2

    Applying in equation 1, we get:

    C₁ = 8

    Thus,

    y (x) = 8 - 2cos 3x + 3sin 3x
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