What is the arclength of (t-2t^3,4t+1) on t in [-2,4]?

1 Answer
Steve M
Jul 19, 2017

Approximate arc length via a numerical method is:

146.64 (2dp)

Explanation:

The arc length of a curve:

vec(r) (t) = << f(t), g(t)) >>

Over an interval [a,b] is given by:

L = int_a^b \ || vec(r) (t) || \ dt
\ \ = int_a^b \ sqrt(f'(t)^2 +g'(t)^2) \ dt

So, for the given curve:

vec(r)(t) = (t-2t^3, 4t+1) \ \ \ t in [-2,4]

the arc length is given by:

L = int_(-2)^4 \ sqrt( (d/dt(t-2t^3))^2 + (d/dt(4t+1))^2 ) \ dt
\ \ = int_(-2)^4 \ sqrt( (1-6t^2)^2 + (4)^2 ) \ dt
\ \ = int_(-2)^4 \ sqrt( 1-12t^2+36t^4 + 16 ) \ dt
\ \ = int_(-2)^4 \ sqrt( 36t^4-12t^2 + 17 ) \ dt

The integral does not have an elementary antiderivative,and so we evaluate the definite integral al numerically:

L = 146.64637228 ...

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