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Use logarithmic differentiation to find the derivative of the function. y = (ln x)cos 2x

User Jantristanmilan
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1 Answer

11 votes
11 votes


y = \ln(x) \cos(2x)

Take the logarithm of both sides.


\ln(y) = \ln\bigg(\ln(x) \cos(2x)\bigg)

Expand the right side.


\ln(y) = \ln\bigg(\ln(x)\bigg) + \ln\bigg(\cos(2x)\bigg)

Use the chain rule to differentiate both sides with respect to
x.


\frac{y'}y = (\bigg(\ln(x)\bigg)')/(\ln(x)) + (\bigg(\cos(2x)\bigg)')/(\cos(2x))


\frac{y'}y = \frac1{x\ln(x)} - (\sin(2x)\bigg(2x\bigg)')/(\cos(2x))


\frac{y'}y = \frac1{x\ln(x)} - 2 \tan(2x)

Solve for
y'.


\frac{y'}y = (1 - 2x \ln(x) \tan(2x))/(x\ln(x))


y' = (1 - 2x \ln(x) \tan(2x))/(x\ln(x))\,y


y' = (1 - 2x \ln(x) \tan(2x))/(x\ln(x))\,\bigg(\ln(x) \cos(2x)\bigg)


y' = \boxed{\frac{\cos(2x) - 2x \ln(x) \sin(2x)}x}

User Cjserio
by
2.6k points
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