Arc Length (thing) by Pantsless Bob

Finding the arc length of a function on an interval is another application of the definite integral. Everyone knows the distance formula, sqrt((x₂-x₁)^2 + (y₂-y₁)^2), but that only works for straight lines formed from connecting two points. The equation for finding arc length is simple, but taking the integral of the equation may be extremely difficult. In short, get a graphing calculator that can calculate integrals, or get math software (Derive, Mathematica, etc.) for the same purpose.

Enough rambling. The equation to find arc length is S_a^b sqrt(1 + (dy/dx)^2)dx. If you find it difficult or impossible to find the integral in this manner, try S_c^d sqrt(1 + (dx/dy)^2)dy. Both of these equations assume that their functions are differentiable on the intervals [a,b] and [c,d], respectively.

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