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Find the equation of the tangent and the normal to the following curves at the indicated points: y2 = 4ax at (x1, y1) |
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Answer» finding slope of the tangent by differentiating the curve \(2y\frac{dy}{dx}=4a\) \(\frac{dy}{dx}=\frac{2a}{y}\) m(tangent) at (x1, y1) = \(\frac{2a}{y_1}\) normal is perpendicular to tangent so, m1m2 = – 1 m(normal) at (x1, y1) = \(-\frac{y_1}{2a}\) equation of tangent is given by y – y1 = m(tangent)(x – x1) \(y-y_1=\frac{2a}{y_1}(x-x_1)\) equation of normal is given by y – y1 = m(normal)(x – x1) \(y-y_1=-\frac{y_1}{2a}(x-x_1)\) |
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