Parametric Equations
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In the above cases only one independent variable was used, creating a parametrized curve. We can use more than one independent variable to create other graphs, including graphs of surfaces. For example, using parameters s and t, the surface of a sphere can be parametrized as follows: | In the above cases only one independent variable was used, creating a parametrized curve. We can use more than one independent variable to create other graphs, including graphs of surfaces. For example, using parameters s and t, the surface of a sphere can be parametrized as follows: | ||
<math> \begin{bmatrix} x \\ y\\ z\\ \end{bmatrix}= \begin{bmatrix} sin(t)cos(s) \\ sin(t)sin(s) \\cos(t) \end{bmatrix}</math> | <math> \begin{bmatrix} x \\ y\\ z\\ \end{bmatrix}= \begin{bmatrix} sin(t)cos(s) \\ sin(t)sin(s) \\cos(t) \end{bmatrix}</math> | ||
- | [[Image:Spheresurface.PNG| | + | [[Image:Spheresurface.PNG|center|thumb|500px|The ''surface'' of a sphere can be graphed using two parameters.]] |
===Parametrized Manifolds=== | ===Parametrized Manifolds=== |
Revision as of 11:20, 7 July 2009
- The Butterfly Curve is one of many beautiful images generated using parametric equations.
Butterfly Curve |
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Contents |
Basic Description
We often graph functions by letting one coordinate be dependent on another. For example, graphing the function has y values that depend upon x values. However, some complex functions are best described by having the coordinates be described using an equation of a separate independent variable, known as a parameter. Changing the value of the parameter then changes the value of each coordinate variable in the equation. We choose a range of values for the parameter, and the values that our function takes on as the parameter varies traces out a curve, known as a parametrized curve. Parametrization is the process of finding a parametrized version of a function.Parametrized Circle
One curve that can be easily parametrized is a circle of radius one:
We use the variable t as our parameter, and x and y as our normal Cartesian coordinates.
We now let and , and let t take on all values from to .
When , the coordinate is hit. As t increases, a circle is traced out as x initially decreases, since it is equal to the cosine of t, and y initially increases, since it is equal to the sine of t. The circle continues to be traced until t reaches , which gives the coordinate once again.
It is also useful to write parametrized curves in vector notation, using a coordinate vector:
The butterfly curve in this page's main image uses more complicated parametric equations as shown below.
A More Mathematical Explanation
- Note: understanding of this explanation requires: *Linear Algebra
Sometimes curves which would be very difficult or even impossible to graph in terms of elementary fun [...]
Sometimes curves which would be very difficult or even impossible to graph in terms of elementary functions of x and y can be graphed using a parameter. One example is the butterfly curve, as shown in this page's main image.
This curve uses the following parametrization:
Parametrized Surfaces
In the above cases only one independent variable was used, creating a parametrized curve. We can use more than one independent variable to create other graphs, including graphs of surfaces. For example, using parameters s and t, the surface of a sphere can be parametrized as follows:
Parametrized Manifolds
While two parameters are sufficient to parametrize a surface, objects of more than two dimensions, such as a three dimensional solid, will require more than two parameters. These objects, generally called manifolds, may live in higher than three dimensions and can have more than two parameters, so cannot always be visualized. Nevertheless they can be analyzed using the methods of vector calculus and differential geometry.
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