What is the derivative of # f(x)=secx^2cos^2x#?

1 Answer
Vinícius Ferraz
Nov 15, 2015

#2 cdot sec^2 x^2 cdot (cos^2x cdot sin x^2 cdot x - cos x cdot sin x cdot cos x^2)#

Explanation:

I understood #y = (sec x^2) (cos^2 x)#. Is it?

#(df)/(dx) = d/(dx) (frac{cos^2 x}{cosx^2}) = frac{d/(dx) (cos^2x) cdot cos x^2 - cos^2x cdot d/(dx) (cos x^2)}{cos^2 x^2}#

#= frac{2 cos x cdot d/(dx) (cos x) cdot cos x^2 - cos^2x cdot (-sin x^2) d/(dx) (x^2)}{cos^2 x^2}#

#= frac{2 cos x cdot (-sin x) cdot cos x^2 - cos^2x cdot (-sin x^2) cdot 2x}{cos^2 x^2}#

#= 2 cdot sec^2 x^2 cdot ( - cos x cdot sin x cdot cos x^2 + cos^2x cdot sin x^2 cdot x)#

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