Ĭircle ( center, radius ) The first parameter, center, is the center of the circle and must be a two-dimensional Vector with algebraic entries. The possible regions of integration are Circle, Ellipse, Parallelepiped, Rectangle, Region, Sector, Sphere, Tetrahedron, and Triangle. The third calling sequence specifies a region of integration using the parameter = region. Output = steps specifies that the intermediate steps of solving the multiple integral are shown. Output = integral specifies that the inert form of the integral is shown. Output = value specifies that the value of the integral is returned. Specifies the return value of the function. Note: The coordinates option is not valid for the third calling sequence. For spherical coordinates, the second coordinate is the angle measured down from the vertical. The first variable of polar, cylindrical, and spherical is assumed to be the radial component. Specifies the coordinate system being used. The opts argument can contain any of the following equations.Ĭoordinates = cartesian, polar (2-D), cartesian, cylindrical, or spherical The MultiInt command returns the integral of a function over a region in space. (optional) equation(s) of the form option = value where option is coordinates or output specify output options One of the possible regions of integration as described below Sequence of names specify the independent variables Return the integral of a function defined over a region
0 Comments
Leave a Reply. |