### Spherical Coordinates (3-D Graphing, Wireframe)

Graphs a function of the form r=f(t,s) using spherical coordinates in three dimensions.
How to use   ||   Examples   ||   Other Notes

How to use
• Enter a function f (θ,φ) in the text input field marked "f (θ,φ)=" (Example: f (θ,φ)=5)
• Click the "Graph" button (this button also refreshes the graph)
• Rotate the graph by clicking and dragging the mouse on the graph.
• To erase the graph and all input fields, click the "Clear" button
• There are four input fields which specify bounds on the variables for the function:
• The variable θ (the first angle, measured counterclockwise in the xy-plane) takes values between θmin*π and θmax*π, with θmin and θmax specified by the fields marked "θmin=" and "θmax=".
• The variable φ (the second angle, measured down from the z-axis) takes values between φmin*π and φmax*π, with φmin and φmax specified by the fields marked "φmin=" and "φmax=".
• These four text input fields can accept any decimal number input.
The text input fields for functions can accept a wide variety of expressions to represent functions, and the buttons under the graph allow various manipulations of the graph coordinates.
For another way to view surfaces, try the "faceted hidden surface" representation.
Examples

 Sphere: f (θ,φ)=5 Cylinder: f (θ,φ)=3/sin φ Plane: f (θ,φ)= 3/(cos θ sin φ)

Other Notes
Surfaces in three dimensions are represented in "wireframe" form. The "faceted hidden surface" representation allows for more than one surface to be drawn.