How do you find the derivative of #sinx^tanx#?

1 Answer
Bill K.
Aug 4, 2016

Use logarithmic differentiation to get #d/dx(sin(x)^{tan(x)}) = (1+ln(sin(x))sec^2(x))*sin(x)^{tan(x)}#.

Explanation:

First, let #y=sin(x)^{tan(x)}#.

Next, take the natural logarithm of both sides and use a property of logarithms to get #ln(y)=tan(x)ln(sin(x))#.

Next, differentiate both sides with respect to #x#, keeping in mind that #y# is a function of #x# and using the Chain Rule and Product Rule to get #1/y*dy/dx=sec^{2}(x)ln(sin(x))+tan(x)*1/(sin(x))*cos(x)#

#=1+ln(sin(x))sec^{2}(x)#.

Multiplying both sides by #y=sin(x)^{tan(x)}# now gives the final answer to be #d/dx(sin(x)^{tan(x)}) = (1+ln(sin(x))sec^2(x))*sin(x)^{tan(x)}#.

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