What is the second derivative of #f(x)=-sec2x-cotx #?

1 Answer
Ratnaker Mehta
Jul 8, 2016

#f''(x)=-4sec2x{sec^2(2x)+tan^2(2x)}-2csc^2xcotx.#

Explanation:

#f(x)=-sec2x-cotx#
#rArr f'(x)=(-sec2x)'-(cotx)'=-sec2x*tan2x*d/dx(2x)-(-csc^2x)#
#=-2sec2x*tan2x+csc^2x#
# rArr f''(x)={f'(x)}'=(-2sec2xtan2x)'+{(cscx)^2}'#.
#=-2{sec2x*(tan2x)'+tan2x*(sec2x)'}+2cscx*(cscx)'#, ......[Product Rule & Chain Rule]
#=-2[sec2x*{sec^2(2x)*2}+tan2x{sec2x*tan2x*2}]+2cscx(-cscx*cotx),#
#=-2{2sec^3(2x)+2sec2x*tan^2(2x)}-2csc^2xcotx,#
#=-4sec2x{sec^2(2x)+tan^2(2x)}-2csc^2xcotx.#

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