Imaginary unit
In mathematics, an imaginary number is a number whose square is negative. The term was coined by René Descartes in the seventeenth century and was meant to be derogatory: obviously such numbers don't exist. Nowadays we find the imaginary numbers on the vertical axis of the complex number plane. Every imaginary number can be written as  where  is a real number and  the imaginary unit with the property that
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See the definition of complex numbers on how they can be constructed.
(In electrical engineering and related fields, the imaginary unit is often written as j to avoid confusion with a changing current, traditionally denoted by i.) Every complex number can be written uniquely as a sum of a real number and an imaginary number (its imaginary part).
Despite their name, imaginary numbers are just as "real" as real numbers (or just about as real as a number, which is an abstract concept, can be). Imaginary numbers have concrete applications in a variety of sciences and related areas such as electromagnetism, quantum mechanics, and cartography.
The powers of i repeat in a cycle:
This can be expressed with the following pattern where n is any integer:
See also
Referenced By
List of numbers
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