Question

How do you find the arc length of the curve `y=x^2/2` over the interval [0, 1]?

Answer 1

`approx 2.96` units

Explanation:

`s = int_(0)^(2) sqrt(1+(y')^2) \ dx`

`= int_(0)^(2) sqrt(1+x^2) \ dx`

`= 1/2[ (x sqrt(x^2+1) +sinh^(-1)(x)) ]_(0)^(2)`

`= (sqrt(5)+1/2 sinh^(-1)(2) )` units

`approx 2.96` units

Computer used for integration and numerical solution

[The basic integral, `int sqrt(1+x^2) \ dx`...

... can be approached, using the identity `cosh^2 z - sinh^2 z = 1`...

....so by the sub `x = sinh z, dx = cosh z \ dz`

... and then maybe a hyperbolic double angle formula]