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In mathematics, an imaginary number (or purely
imaginary number) is a complex number whose square is negative or zero. The term was coined by René Descartes in the
seventeenth century and was meant to be derogatory: obviously, such numbers were thought not to exist. Nowadays, we find the
imaginary numbers on the vertical axis of the complex number plane. An
imaginary number is a complex number which can be written as ib where b is a real number and i the imaginary unit with the property that
- i2 = −1
One way of viewing imaginary numbers is to consider a standard number
line, positively increasing in magnitude to the right, and negatively increasing in magnitude to the left. At zero on this
x axis, draw a y axis; "positive" imaginary numbers then increase in magnitude upwards, and "negative"
imaginary numbers increase in magnitude downwards. Note that technically, zero is considered to be a purely imaginary number.
(Zero is the only complex number which is both real and purely imaginary.) This vertical axis is often called the "imaginary
axis" and is denoted iR.
(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 (the latter is equal to i times its imaginary part).
Are imaginary numbers "real"?
Despite their name, imaginary numbers are just as "real" as real numbers. (See the definition of complex numbers on how they can be constructed using set theory.) One way to see why this is so, is to realise that numbers
themselves are abstractions, and we should not be fooled into thinking the abstractions are not real simply because they do not
always apply in the real world. For example, fractions such as 3/4 and 5/7 are meaningless to a person counting stones, but
essential to a person comparing the sizes of different collections of stones. Similarly, negative numbers such as −3 and
−5 are meaningless when keeping score in a football match, but essential when keeping track of monetary debts and
credits.
Imaginary numbers follow the same pattern. For most human tasks, real numbers (or even rational numbers) offer an adequate
description of data, and imaginary numbers have no meaning; however, in many areas of science and mathematics, imaginary numbers
(and complex numbers in general) are essential for describing reality. Imaginary numbers have essential concrete applications in
a variety of sciences and related areas such as electromagnetism,
quantum mechanics, and cartography. They are absolutely indispensable in advanced mathematics. Another way to think about the term is
to consider these numbers imaginary because they can be imagined in your mind.
See also
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