What is the arclength of $f(t) = (t/sqrt(t-1),t/(t^2-1))$ on $t in [2,3]$ ?

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What is the arclength of $f(t) = (t/sqrt(t-1),t/(t^2-1))$ on $t in [2,3]$ ?

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Answer 1 · 2018-05-27T15:48:23

$0.326586$

Explanation:

We have
$x(t)=t/sqrt(t-1)$
$x'(t)=1/sqrt(t-1)-t/(2*(t-1)^(3/2)$
$y(t)=t/(t^2-1)$
then
$y'(t)=1/(t^2-1)-2*t^2/(t^2-1)^2$
and our integral will be
$int_2^3sqrt((t-2)^2/(4*(t-1)^3)+(t^2+1)^2/((t-1)^4*(t+1)^4))dt$
which i can only solve by a numerical method.

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What is the arclength of $f(t) = (t/sqrt(t-1),t/(t^2-1))$ on $t in [2,3]$ ?

1 Answer

Explanation:

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