How do you find the derivative of #f(x)= (5x^2 tan(x))/sec(x)#?

1 Answer
Astralboy
Feb 17, 2017

#f'(x)=5x^2cos(x)+10xsin(x)#

Explanation:

Rewrite #tan(x)# as #sin(x)/cos(x)# and #1/sec(x)# as #cosx#. As you can see, both the cos(x) cancel out leaving you with a simpler function to solve for.

#f(x)=5x^2sin(x)#

From here, use the product rule. Note that the derivative of #sinx# is #cosx#:

#f'(x)=5x^2cos(x)+sin(x)(10x)#

Simplify:

#f'(x)=5x^2cos(x)+10xsin(x)#

Related questions
See all questions in Derivative Rules for y=cos(x) and y=tan(x)
Impact of this question
3277 views around the world
You can reuse this answer
Creative Commons License