How do you use part I of the Fundamental Theorem of Calculus to find the derivative of $f(x) = int {1} / {1+t^{2}} dt$ from x to 5?

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Answer 1 · 2015-09-11T21:52:59

See the explanation section.

FTC 1 says (among other things) that if $g$ is continuous on interval $[a,b]$ and we define

$f(x) = int_a^x g(t) dt$ for $x$ in $[a,b]$ then $f'(x) = g(x)$

If you meant $f(x) = int_5^x {1} / {1+t^{2}} dt$
(which is read "the integral from $5$ to $x$ ")

the $f'(x) = 1/(1+x^2)$ .

If you really meant the integral from $x$ to $5$ , we will first rewrite so that the lower limit is a constant.

$f(x) = int_x^5 1 / {1+t^{2}} dt = -int_5^x {1} / {1+t^{2}} dt$ , so

$f'(x) = -1/(1+x^2)$ .

Note 1
In some ways, the hardest part of the FTC1 question on an exam is convincing yourself that is really is that easy!

Note 2

Some courses apparently give a slightly different version of Part 1 of the FTC.

For $f(x) = int_(g(x))^(h(x)) F(t) dt$ ,

we get

$f'(x) = F(h(x)) h'(x) - F(g(x)) g'(x)$

So you may see that sometimes here on Socratic.

How do you use part I of the Fundamental Theorem of Calculus to find the derivative of f(x) = int {1} / {1+t^{2}} dtf(x) = int {1} / {1+t^{2}} dt from x to 5?