Difference between revisions of "Absolute value"

Revision as of 14:35, June 20, 2007

The absolute value of a number is a measure of the size of that number. The absolute value of $\text{[math]}$ is written $\text{[math]}$ .

If

\text{[math]}

is a positive number, then

\text{[math]}

.

If

\text{[math]}

is a negative number, then

\text{[math]}

.

If

\text{[math]}

then

\text{[math]}

.

Absolute value has several useful properties. One is the multiplicative property. If $\text{[math]}$ and $\text{[math]}$ are two numbers, then $\text{[math]}$ . Another is the triangle inequality, which is the fact that $\text{[math]}$ . For example, if $\text{[math]}$ and $\text{[math]}$ , then $\text{[math]}$ , while $\text{[math]}$ . In this case, the triangle inequality is the fact that 2 is not more than 8.

Complex numbers also have an absolute value. If $\text{[math]}$ is a complex number with real part $\text{[math]}$ and imaginary part $\text{[math]}$ , then $\text{[math]}$ . If we represent $\text{[math]}$ as a point in the complex plane with coordinates $\text{[math]}$ , then $\text{[math]}$ is the distance from this point to the origin. The absolute value of complex numbers also has the multiplicative property and satisfies the triangle inequality.

Notes and references

@@ Line 17: / Line 17: @@
 [[Category:Algebra]]
-<b>If x is a negative number, then  | x | = − x.</b>
-This is incorrect.  It should read "If x is a negative number, then  | - x | = x."

Difference between revisions of "Absolute value"

Revision as of 14:35, June 20, 2007

Notes and references

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