How do you find the derivative of y = cotx(cscx)?

1 Answer
Shwetank Mauria
Aug 3, 2016

(dy)/(dx)=-cscx(csc^2x+cot^2x)

Explanation:

Product rule states if f(x)=g(x)h(x)

then (df)/(dx)=(dg)/(dx)xxh(x)+(dh)/(dx)xxg(x)

Hence as y=cotx(cscx)

(dy)/(dx)=d/(dx)(cotx)xxcscx+d/(dx)(cscx)xxcotx

= (-csc^2x)xxcscx+(-cscxcotx)xxcotx

= -csc^2x xxcscx-cscxxxcot^2x

= -cscx(csc^2x+cot^2x)

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