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31 December, 10:09

Find dy/dx by implicit differentiation. Square root xy = 8 + x^2y

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  1. 31 December, 10:16
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    ((4xysqrt (xy)) - y) / (x-2x^2sqrt (xy))

    Step-by-step explanation:

    Treat y as a function of x and use the chain rule.

    Use the chain rule and product rule:

    (y+xy') / 2sqrt (xy) = d/dx[8+x^2y]

    (y+xy') / 2sqrt (xy) = d/dx[x^2y]

    Use product rule

    (y+xy') / 2sqrt (xy) = 2xy + x^2y'

    Now solve for y'

    y+xy' = (2xy) (2sqrt (xy)) + (x^2y') (2sqrt (xy))

    xy'-2x^2y'sqrt (xy) = (2xy) (2sqrt (xy)) - y

    y' (x-2x^2sqrt (xy))

    y' = ((4xysqrt (xy)) - y) / (x-2x^2sqrt (xy))
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