Question

What is the derivative of `arcsin^3(5x)`?

Answer 1

The final answer is `f'(x) = (15arcsin(5x)^2)/(sqrt(1-25x^2))`

Explanation:

Let `f(x) = y = arcsin^3(5x) = (arcsin(5x))^3`.
We need to use the chain rule here.

Recall that `(dy)/(dx) = (du)/(dx) * (dy)/(du)`.
First let `u = arcsin(5x)` and `y=u^3`.

To solve for `(dy)/(du)` where `y = u^3`, we can use the power rule:
`(dy)/(du) = 3u^2`

To solve for `(du)/(dx)` where `u = arcsin(5x)`, we can use the inverse sin derivative rule, combined with the chain rule again.
Let `u' = 5x`, so `u = arcsin(5x) = arcsin(u')`.

By the inverse sin derivative rule:
`(du)/(du') = 1/(sqrt(1-u'^2))`

By the power rule:
`(du')/(dx) = 5`

Then multiplying together and substituting in for `u'`, we have:
`(du)/(dx) = (du)/(du') * (du')/(dx)`
`(du)/(dx) = 5/(sqrt(1-(5x)^2))`
`(du)/(dx) = 5/(sqrt(1-25x^2))`

Finally, we have:
`(dy)/(dx) = (du)/(dx) * (dy)/(du)`
`(dy)/(dx) = 5/(sqrt(1-25x^2)) * 3u^2`

Plugging back in `u` and simplifying:
`(dy)/(dx) = 5/(sqrt(1-25x^2)) * 3arcsin(5x)^2`
`(dy)/(dx) = (15arcsin(5x)^2)/(sqrt(1-25x^2))`