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Absolute value

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The absolute value of a real number x, denoted |x|, is the unsigned portion of x. Geometrically, |x| is the distance between x and zero on the real number line.

The absolute value function exists among other contexts as well, including complex numbers.

Contents

Real numbers

When x is real, |x| is defined as |x| = \begin{cases} x & \text{for } x \ge 0,\\ -x & \text{for } x \le 0.\end{cases} For all real numbers x and y, we have the following properties:

  • (Alternative definition) |x| = \sqrt{x^2}
  • (Non-negativity) |x| \ge 0
  • (Positive-definiteness) |x| = 0 \iff x=0
  • (Multiplicativeness) |xy| = |x| |y|
  • (Triangle Inequality) |x+y| \le |x|+|y|
  • (Symmetry) |x| = |-x|

Note that

|x| \le y \iff -y \le x \le y

and

|x| \ge y \iff x \ge y \text{ or } x \le -y.

Complex numbers

For complex numbers z, the absolute value is defined as |z| = \sqrt{x^2+y^2}, where x and y are the real and imaginary parts of z, respectively. It is equivalent to the distance between z and the origin, and is usually called the complex modulus.

Note that |z| = |\overline{z}| = \sqrt{z\overline{z}}, where \overline{z} is the complex conjugate of z.

Examples

  1. If |x|=k, for some real number k, then x=k or x=-k.
  2. If |ax| = k, for some real numbers a, k, then ax = k or ax = -k, and therefore x = \frac{k}{a} or x = -\frac{k}{a}.

Problems

  1. Find all real values of x if -|x| = x-6.
  2. Find all real values of x if 5 + 8 \cdot |4x| = 69.
  3. (AMC 12 2000) If |x - 2| = p, where x < 2, then find x - p.

See Also

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