Vocabulary
- Absolute Value - The absolute
value of a number is it's distance from zero (0)
on a number line. This action ignores the "+" or "-"
sign of a number because distance in mathematics is never negative. The
symbol |x| represents the absolute value of x.
Lesson
The absolute value of a number is its distance
from zero (0) on a number line. This action ignores the + or sign of a number because distance in mathematics is never
negative.
You identify an absolute value of a number by writing the number between two
vertical bars referred to as absolute value brackets: |number|.
A helpful way of thinking about absolute value is relating it to a railroad
track. If you were to stand on a railroad track, more specifically on any one
of the railroad ties and mark that spot as zero, railroad ties to the left
would represent negative numbers and railroad ties to the right would represent
positive numbers.
The number 7 is 7 units away from zero on the negative side of the railroad
track. So, the following is true, |-7| = 7. The number 16 is 16 units away from
zero on the positive side of the railroad track. So, |16| = 16. The number 0 is
0 units from zero on the railroad track. So |0| = 0 Therefore, the absolute
value of any number is a positive number or zero.
In summary
THE ABSOLUTE VALUE OF A NUMBER
If x is a positive number, then |x| = x. Example: |5| = 5
If x is zero, then |x| = 0. Example: |0| = 0
If x is a negative number, then |x| = -x. Example: |-6| = -(-6)
= 6
You can find the absolute value of expressions as well. When addressed with
this you must treat the absolute value brackets as you would parentheses. You
need to simplify everything inside the absolute value brackets by performing
all the necessary operations by following the order of operations. Your last
step once you have a single number inside the absolute value brackets is to
take the absolute value. For example, |-5 + 1*3| = |-5 + 3| = |-2| = 2.
You may use the absolute value to find the distance between two numbers on the
number line. Let a and b be variables. Then |a-b| is
the distance between a and b. For example, if a=3 and
b=7, then |3-7| = |-4| = 4. Because you used the absolute value, the distance
is the same if you switch the order of the two numbers; if a=7 and b=3, then
|7-3|=|4|=4.
Two things to watch out for are an opposite sign and/or an operation outside
the absolute value brackets. As stated above, simplify everything inside the
absolute value brackets by performing all the necessary operations by following
the order of operations. Your last step once you have a single number inside
the absolute value brackets is to take the absolute value. Once you have taken
the absolute value then perform the other necessary operations by following the
order of operations from left to right in the expression. For example, -|5| =
-5 and 7 + |-5 + 1*3| = 7 + |-5 + 3| = 7 + |-2| = 7 + 2 = 9.
Example Problems
|0| = 0
-|-21| = -21
|7 1| + 9 = |6| + 9 = 6 + 9 = 15
|.5| = .5
|-5*3| = |-15| = 15
|-2/3| = 2/3
|25 - 16| = |9| = 9
|9| = 9
|3.5 5.7| = |-2.2| = 2.2
|-11.5| = 11.5
5 - |3| = 5 3 = 2
-|6.7| = -6.7
8 + |-6*2| = 8 + |-12| = 8 + 12 = 20
