Lecture 9: Parametric Equations
Lecture 9: Parametric Equations. Objectives Be able to use parametric equations to describe the motion of a point Be able to find the arclength of a curve.
Jan 03, 2016
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Lecture 9: Parametric Equations
Objectives
• Be able to use parametric equations to describe the motion of a point
• Be able to find the arclength of a curve described by parametric equations as well as the area underneath such a curve.
• Know how to find the curvature of curves in 2D and 3D.
Corresponding Sections in Simmons 17.1,17.2,17.5
Parametric Equations
• It is often easier to express both x and y as a function of another variable (such as the time t or an angle ) instead of writing y in terms of x.
• This new variable is called a parameter and these are called parametric equations.
• Can be thought of as a map:
Example: Projectile motion
• We can express y in terms of x by eliminating t from these equations, giving
• However, the parametric equations are cleaner and much more informative.
Example: Circular Motion
• Consider a particle moving counterclockwise around a circle or radius r centered around the origin at constant speed.
Velocity and Acceleration• Given parametric equations , • Example: For projectile motion with , and • Example: For circular motion with, and
Arclength with Parametric Equations
• If we have function x(t), y(t), the length of the segment from t to t+dt is
• More generally,
Example: Arclength of a Circle
• Example: Arclength of a circle• , • ,
Area with Parametric Equations
• Area under a curve can also be done with parametric equations
• Example: What is the area under the curve described by , from to ?
Curvature
• The curvature of a curve is 1 divided by the radius of the circle which best approximates it at that point.
Recall the equations for circular motion: , and
• For a circle of radius R, (directed towards the center of the circle)
Curvature Cont.
• For a circle, so • In general, we want to take the component of
the acceleration which is perpendicular to the velocity and divide it by
Curvature of a curve
• In the special case where we have a curve , taking , , ,
• Example: The curve has curvature .
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