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Intros
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Examples
Lessons
  1. Find the length of the arc of y2=(1+x)3y^2=(1+x)^3 from (-1,0) to (3,8)
    1. Find the length of the arc of x=ln(siny)x=\ln(sin y) on π4yπ2\frac{\pi}{4}\leq y \leq \frac{\pi}{2}
      1. Find the arc length function for the curve y=1x(43x4+116)y=\frac{1}{x}(\frac{4}{3}x^4+\frac{1}{16}) with initial point at x=12x=\frac{1}{2}
        Topic Notes
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        Instead of finding the area under the curve, we are going to be the length of the curve between a and b. Now we know we can find the length of a line using the distance formula, but what about the length of the curve? In the intro video, we will learn that we can find the length of the curve by manipulating the distance formula into an integral. After, we will be applying the formula that we've found by finding the arc length of functions in terms of x. We will then look at some advanced questions where we will find the arc length of functions in terms of y, as well as finding the arc length function with an initial point.
        The arc length of a curve from a to b:

        Arc  Length=ab1+[f(x)]2dxArc\; Length = \int_{a}^{b} \sqrt{1+[f'(x)]^2}dx

        Arc length as a function of a variable, x:

        s(x)=intialx1+[f(u)]2dus(x)=\int_{intial}^{x} \sqrt{1+[f'(u)]^2}du