Applications of Integration: Arc Length

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Applications of Integration: Arc Length

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The length of the line segment joining points (x0,y0) and (x1,y1) ... Approximate by chopping it into polygonal pieces and adding up the lengths of the pieces ... – PowerPoint PPT presentation

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Title: Applications of Integration: Arc Length

1
Applications of Integration Arc Length
Dr. Dillon Calculus II Fall 1999 SPSU
2
Start with something easy

The length of the line segment joining points
(x0,y0) and (x1,y1) is

(x1,y1)
(x0,y0)
3
The Length of a Polygonal Path?

Add the lengths of the line segments.

4
The length of a curve?

Approximate by chopping it into polygonal pieces
and adding up the lengths of the pieces

5
Approximate the curve with polygonal pieces?
6
What is the approximate length of your curve?

Say there are n line segments
our example has 18
The ith segment connects (xi-1, yi-1) and (xi, yi)

(xi-1,yi-1)
(xi, yi)
7
The length of that ith segment is...
8
The length of the polygonal path is thus...

which is the approximate length of the curve

9
What do we do to get the actual length of the
curve?

The idea is to get the length of the curve in
terms of an equation which describes the curve.
Note that our approximation improves when we take
more polygonal pieces

10
For Ease of Calculation...
Let
and
11
A Basic Assumption...

We can always view y as a function of x, at least
locally (just looking at one little piece of the
curve)
And if you dont buy that
we can view x as a function of y when we cant
view y as a function of x...

12
To keep our discussion simple...