How solve Derivatives of Trigonometric Functions? PLEASE HELP

I Do not remember how solve this........enter image source here

2 Answers
GiĆ³
Apr 6, 2017

I tried changing the #csc#:

Explanation:

I would use the Quotient and Chain Rule and remember that #csc(x)=1/sin(x)# so:
#f(x)=csc^2(7x^2)=1/sin^2(7x^2)#
So:
#f'(x)=-(2sin(7x^2) cos(7x^2)*14x)/(sin^4(7x^2))=-28x(cos(7x^2)/sin^3(7x^2))=-28xcsc^2(7x^2)cot(7x^2)#

Kalit Gautam
Apr 8, 2017

Here I used Chain Rule successively:-

Explanation:

#f(x)# = #csc^2(7x^2)#
Now Differentiating both sides with respect to #x# successively we get:-
#f'(x)# = 2 #csc(7x^2).[ d/dx( csc 7x^2)]#
#rArr f'(x) # = #2csc(7x^2).[-csc(7x^2).cot(7x^2).d/dx(7x^2)]#

#rArr f'(x) # = #-2csc^2(7x^2).cot(7x^2).14x#

#rArr f'(x) # = #-28x.csc^2(7x^2).cot(7x^2)#

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