Difference between revisions of "Square root"

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It is also written as the one half exponent of the argument, so that squaring ''undoes'' this function just a multiplying by 2 undoes <math>\frac12</math>. Similar function can be generalized to any real number power as well as even [[complex number|complex]] powers!
 
It is also written as the one half exponent of the argument, so that squaring ''undoes'' this function just a multiplying by 2 undoes <math>\frac12</math>. Similar function can be generalized to any real number power as well as even [[complex number|complex]] powers!
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== See also ==
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* [[Algebra]]
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* [[Exponent]]s

Revision as of 17:42, 13 August 2006

A square root of a number x is a number y such that $y^2 = x$. Thus y is a square root of x if and only if x is the square of y. The square root of a number x is denoted $\sqrt x$. For instance, $\sqrt 4 = 2$. When we consider only positive reals, the square root function is the inverse of the squaring function. However, this does not hold more generally because every positive real has two square roots, one positive and one negative. The notation $\sqrt x$ is used for the positive square root.

It is also written as the one half exponent of the argument, so that squaring undoes this function just a multiplying by 2 undoes $\frac12$. Similar function can be generalized to any real number power as well as even complex powers!

See also