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Reciprocal


Reciprocal

The reciprocal of a real or complex number z!=0 is its multiplicative inverse 1/z=z^(-1), i.e., z to the power -1. The reciprocal of zero is undefined. A plot of the reciprocal of a real number x is plotted above for -2<=x<=2.

Two numbers are reciprocals if and only if their product is 1. To put it another way, a number and its reciprocal are inversely related. Therefore, the larger a (positive) number, the smaller its reciprocal.

ReciprocalReIm
ReciprocalContours

The reciprocal of a complex number z=x+iy is given by

 1/(x+iy)=(x-iy)/(x^2+y^2)=x/(x^2+y^2)-y/(x^2+y^2)i.

Plots of the reciprocal in the complex plane are given above.

Given a geometric figure consisting of an assemblage of points, the polars with respect to an inversion circle constitute another figure. These figures are said to be reciprocal with respect to each other. Then there exists a duality principle which states that theorems for the original figure can be immediately applied to the reciprocal figure after suitable modification (Lachlan 1893).


See also

Division, Division by Zero, Inversion, Inversion Pole, Polar, Power, Reciprocal Curve, Reciprocation

Portions of this entry contributed by Robert P. Singleton

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References

Lachlan, R. An Elementary Treatise on Modern Pure Geometry. London: Macmillian, 1893.

Referenced on Wolfram|Alpha

Reciprocal

Cite this as:

Singleton, Robert P. and Weisstein, Eric W. "Reciprocal." From MathWorld--A Wolfram Web Resource. https://mathworld.wolfram.com/Reciprocal.html

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