Question

How do you use Part 1 of the Fundamental Theorem of Calculus to find the derivative of the function `h(x)=int_4^(1/x) arctan(3t) dt`?

Answer 1

`h(x)=int_4^(1/x) arctan(3t) dt`

If we think of `g(x)` as `g(x) = int_4^x arctan(3t) dt`,
then the function `h(x) = g(1/x)`.

To find the derivative with respect to `x`, we need the chain rule along with Part 1 of the Fundamental Theorem of Calculus.

By the chain rule:
`h'(x) = g'(1/x) * d/dx(1/x)`

By FTC 1,

`g'(1/x) = arctan(3/x)` . of course `d/dx(1/x) = -1/x^2`.

So we have:

`h'(x) = arctan(3/x) * -1/x^2 =-1/x^2 arctan(3/x)`

or

`h'(x) = -arctan(3/x) /x^2`.

Note that, the end result is that the derivative w.r.t. `x` of

`h(x) = int_a^u f(t) dt` is `h'(x) = f(u) (du)/dx`