Difference between revisions of "Length of a curve"

Revision as of 18:05, 1 April 2021

The length of a curve from point a to point b can be found using an integral of the first derivative of the equation:

equation = f(x)

first derivative = f '(x)

length = ∫sqr(1+f '(x)²)dx

For the previous example of heating a liquid, the first derivative of the equation was f '(t)=30e^−0.3t

so the length of the curve from 0 to 5 minutes would be:

∫sqr(1+(30e^−0.3t)²)dt

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	so the length of the curve from 0 to 5 minutes would be:		so the length of the curve from 0 to 5 minutes would be:

−	<font size = "+2"><span>∫</span></font>sqr(1+30e<sup>−0.3t</sup><sup>2</sup>)dt	+	<font size = "+2"><span>∫</span></font>sqr(1+(30e<sup>−0.3t</sup>)<sup>2</sup>)dt