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NEWTON

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The three conic sections are the parabola, ellipse and hyperbola. Appollonius characterized the ellipse as the perpendicular of a flat plane with a cone. – PowerPoint PPT presentation

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Title: NEWTON


1
NEWTONS METHOD
  • Section 3.8

2
When you are done with your homework, you should
be able to
  • Approximate a zero of a function using Newtons
    Method
  •  

3
Appollonius lived in 250BC. He studied conic
sections. Name the three conic sections and how
Appollonius characterized the ellipse.
  1. The three conic sections are the circle, ellipse
    and hyperbola. Appollonius characterized the
    ellipse as the perpendicular of a flat plane with
    a cone.
  2. The three conic sections are the circle, ellipse
    and hyperbola. Appollonius characterized the
    ellipse as the perpendicular of a flat plane that
    is parallel to the side of a cone.
  3. The three conic sections are the parabola,
    ellipse and hyperbola. Appollonius characterized
    the ellipse as the perpendicular of a flat plane
    that is parallel to the side of a cone.
  4. The three conic sections are the parabola,
    ellipse and hyperbola. Appollonius characterized
    the ellipse as the perpendicular of a flat plane
    with a cone.

4
NEWTONS METHOD
  • Newtons Method uses tangent lines to approximate
    zeros
  • The assumption is that the function and the
    tangent line cross the x-axis at about the same
    point

5
NEWTONS METHOD FOR APPROXIMATING THE ZEROS OF A
FUNCTION
  • Let where f is differentiable on
    an open interval containing c. Then, to
    approximate c, use the following steps.
  • Make an initial estimate that is close to c.
    (Make a graph!)
  • Determine a new approximation
    .
  • If is within the desired accuracy,
    let serve as the final approximation.
    Otherwise, return to step 2 and calculate a new
    approximation.
  • Each successive application of this procedure
    is called an iteration.

6
Use Newtons Method to approximate to five
decimal places.
  • 2.64575
  • 0.0
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