How do you calculate the derivative of $intarctan t dt$ from $[2,1/x]$ ?

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Answer 1 · 2015-08-14T10:45:21

$d/dxint_2^(1/x) arctan t dt = -(arctan (1/x))/x^2$

$d/dxint_2^(1/x) arctan t dt = arctan (1/x) d/dx(1/x)$
$= -(arctan (1/x))/x^2$

Answer 2 · 2015-08-14T19:11:57

Fundamental Theorem of Calculus, Part 1 tells us that if $f$ is continuous on interval $[a,b]$ , if $g$ is defined by

$g(x) = int_a^x f(t) dt" "$ for $x in [a,b]$

then ( $g$ is continuous on $[a,b]$ )
and ( $g$ is differentiable on $(a,b)$ )

and $g'(x) = f(x)$ (which is what we need here).

In this problem we have a composition, so we need the chain rule:

$g(x) = int_2^u arctan t dt$ with $u = 1/x$

So the chain rule gives us:

$g'(x) = arctanu (du)/dx$

In this case:

$g'(x) = arctan(1/x) (-1)/x^2$

$= - arctan(1/x)/x^2$

How do you calculate the derivative of intarctan t dt intarctan t dt from [2,1/x][2,1/x]?