Pages similar to: Spherical coordinates
- Cartesian coordinates
Illustration of Cartesian coordinates in two and three dimensions. - Polar coordinates
Illustration of polar coordinates with interactive graphics. - Cylindrical coordinates
Illustration of cylindrical coordinates with interactive graphics. - Polar coordinates mapping
How polar coordinates can be viewed as mapping from the polar plane onto the Cartesian plane. - Parametrization of a line
Introduction to how one can parametrize a line. Interactive graphics illustrate basic concepts. - Parametrization of a line examples
Examples demonstrating how to calculate parametrizations of a line. - Triple integral change of variable examples
Examples of changing variables in triple integrals. - Lines (and other items in Analytic Geometry)
How to describe the equation for a line in terms of horizontal and vertical coordinates. - The elliptic paraboloid
Description of the elliptic paraboloid with interactive graphics that illustrate cross sections and the effect of changing parameters. - The hyperbolic paraboloid
Description of the hyperbolic paraboloid with interactive graphics that illustrate cross sections and the effect of changing parameters. - The ellipsoid
Description of the ellipsoid with interactive graphics that illustrate cross sections and the effect of changing parameters. - The double cone
Description of the double cone with interactive graphics that illustrate cross sections and the effect of changing parameters. - The hyperboloid of one sheet
Description of the hyperboloid of one sheet with interactive graphics that illustrate cross sections and the effect of changing parameters. - The hyperboloid of two sheets
Description of the hyperboloid of two sheets with interactive graphics that illustrate cross sections and the effect of changing parameters. - Introduction to changing variables in triple integrals
Introduction to the concepts behind a change of variables in triple integrals. - How linear transformations map parallelograms and parallelepipeds
Why linear transformations map parallelograms onto parallelograms and parallelepipeds onto parallelepipeds.
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