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16 July, 04:42

Use this equation to find dy/dx. 4y cos (x) = x2 + y2

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  1. 16 July, 04:54
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    Let's differentiate implicitly,

    don't worry about solving for y explicitly before differentiating.

    (4y) cosx = x^2 + y^2

    Apply product rule on the left,

    and power rule on the right-hand terms,

    (4y) 'cosx + 4y (cosx) ' = (x^2) ' + (y^2) '

    4y'cosx + 4y (-sinx) = 2x + 2yy'

    4y'cosx - 4ysinx = 2x + 2yy'

    Let's get both y' terms on the left side,

    and everything else on the right,

    4y'cosx - 2yy' = 2x + 4ysinx

    Factor y' out of each term,

    y' (4cosx - 2y) = 2x + 4ysinx

    Solve for y' (which is dy/dx) by dividing by the stuff,

    y' = (2x + 4ysinx) / (4cosx - 2y)

    You can divide a 2 out of everything to simplify it down a little bit.

    y' = (x + 2ysinx) / (2cosx - y)
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