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Quantum Chemistry/Integrals in polar coordinates

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Integration in spherical polar coordinates is a triple integral in the polar coordinate system. In the Cartesian coordinate system, points in space are defined by their position along the x, y, and z axes. Integration divides the space under a curve into infinitesimal widths along the x-axis. The sum of these strips is the area under the curve.In spherical polar coordinates, the frame of reference is changed so all points are defined by its position about the origin. The distance from the origin is defined by the radius r and the angle of displacement longitudinally, θ, and latitudinally ϕ. The angular components are limited in their value because of their periodic nature. Their ranges are defined as: Polar coordinates can be converted from Cartesian :For integration in higher dimensions, integration by parts is used. A triple integral is in three dimensions and therefore has three variables. The outer integral relates to the outer variable, and the inner integrals to the inner variable.In polar coordinates, the strips of infinitesimal widths are converted to wedges and can be converted from Cartesian.To solve spherical polar integral, begin at the inner most integral and proceed outwards.

Example

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integrate the innermost integral, x.

Integrate the next integral, θ.

Finally, integrate ϕ.