What is the derivative of #y = arcsin(x^5)#?

1 Answer
Jim H
Aug 29, 2015

#dy/dx = (5x^4)/sqrt(1-x^10)#

Explanation:

Use the derivative of #arcsin# and the chain rule.

#d/dx (arcsinx) = 1/sqrt(1-x^2)#

When we don't have #x# as the argument of the function, then we need the chain rule:

#d/dx (arcsinu) = 1/sqrt(1-u^2) (du)/dx#

So, we get:

For #y = arcsin(x^5)#,

#dy/dx = 1/sqrt(1-(x^5)^2) d/dx(x^5)#

# = (5x^4)/sqrt(1-x^10)#

Related questions
See all questions in Differentiating Inverse Trigonometric Functions
Impact of this question
1481 views around the world
You can reuse this answer
Creative Commons License