Definition of absolute value.
What does absolute value mean in math terms.
Absolute value refers to the distance of a number from zero regardless of direction.
Use this term to refer to the distance of a point or number from the origin zero of a number line.
Since the complex numbers are not ordered the definition given at the top for the real absolute value cannot be directly applied to complex numbers however the geometric interpretation of the absolute value of a real number as its distance from 0 can be generalised.
Find the absolute value of x when x is equal to 5 x is equal to negative 10 and x is equal to negative 12.
Absolute value definition the magnitude of a quantity irrespective of sign.
The distance is always positive as absolute value of a number cannot be negative.
So the absolute.
So the absolute value the way of writing it is almost more complicated than what it really is.
Look at the following two graphs.
For a negative number it is its positive value.
The distance of a quantity from zero.
The absolute value of a number is the distance the number is from zero.
The absolute value of a number is symbolized by two vertical lines as 3 or 3 is equal to 3.
For a positive number it is just the number.
6 is 6 away from zero so the absolute value of 6 is 6 6 is 6 away from zero so the absolute value of 6 is 6 in other words it is the magnitude or size of a number no negatives allowed.
The absolute value of a complex number is defined by the euclidean distance of its corresponding point in the complex plane.
How far a number is from zero.
The absolute value is really just the distance of x from 0.
The first graph shows 6 located at a distance of 6 units from zero.