What is the derivative of this function $sin^3(x)cos(x)$ ?

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Answer 1 · 2017-02-28T09:31:51

Derivative is $3sin^2xcos^2x-sin^4x$

Product rule states if $f(x)=g(x)h(x)$ , then $(df)/(dx)=(dg)/(dx)xxh(x)+(dh)/(dx)xxg(x)$

and according to chain rule if $y=f(u(x)$ then $(dy)/(dx)=(dy)/(du)xx(du)/(dx)$ .

Hence as $y=f(x)=sin^3xcosx$

$(df)/(dx)=3sin^2x xx cosx xx cosx+sin^3x xx(-sinx)$

= $3sin^2xcos^2x-sin^4x$

What is the derivative of this function sin^3(x)cos(x)sin^3(x)cos(x)?