Question

What is the arclength of `(t-3,t^2)` on `t in [1,2]`?

Answer 1

The arclength is `1/2(2sqrt17-sqrt5)+1/4ln((4+sqrt17)/(2+sqrt5))` units.

Explanation:

`f(t)=(t-3,t^2)`

`f'(t)=(1,2t)`

Arclength is given by:

`L=int_1^2sqrt(1+4t^2)dt`

Apply the substitution `2t=tantheta`:

`L=1/2intsec^3thetad theta`

This is a known integral. If you do not have it memorized apply integration by parts or look it up in a table of integrals:

`L=1/4[secthetatantheta+ln|sectheta+tantheta|]`

Reverse the substitution:

`L=1/4[2tsqrt(1+4t^2)+ln|2t+sqrt(1+4t^2)|]_1^2`

Insert the limits of integration:

`L=1/2(2sqrt17-sqrt5)+1/4ln((4+sqrt17)/(2+sqrt5))`