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

Question

1477 views around the world

You can reuse this answer
Creative Commons License

Answer 1 · 2015-11-15T18:54:06

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

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

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

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

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

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

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