<meta http-equiv="refresh" content="1; url=/nojavascript/">

# Absolute Value

## Evaluate absolute values

%
Progress
Practice Absolute Value
Progress
%
Absolute Value

What is the absolute value of the number –6?

### Guidance

Absolute value in the real number system is the distance from zero on the number line. It is always a positive number. Absolute value is always written as $|x|$ . Using this notation can be translated as “the positive value of $x$ ”.

#### Example A

$|-7|=?$

Solution:

$|-7|=7$

#### Example B

$|7-15|=?$

Solution:

$|7-15|&=?\\|-8|&=?$

$|-8|=8$

#### Example C

$|-9|-|-2| = ?$

Solution:

$|-9|-|-2| &= ?\\|-9|-|-2| &= 9-2\\|-9|-|-2| &= 7$

#### Concept Problem Revisited

Remember the definition of absolute value in the real number system is the distance from zero on the number line. Let’s look at the distance from the –6 to zero.

Therefore $|-6|=6$ .

### Guided Practice

1. $|-50|=?$

2. $\big |- \frac{4}{5} \big |=?$

3. $|-3|-|-4|=?$

1. $|-50|=50$

2. $\big | - \frac{4}{5}\big |=\frac{4}{5}$

3. $|-3|-|-4|=3-4=-1$ . Remember that just because there is an absolute value in the problem doesn't mean that the answer is automatically positive!

### Explore More

Evaluate each of the following:

1. $|-4.5|=?$
2. $|-1|=?$
3. $\big | -\frac{1}{3} \big |=?$
4. $|4|=?$
5. $|-2|=?$
6. $|-1|+|3|=?$
7. $|5|-|-2|=?$
8. $\big | -\frac{1}{2}\big |+ \big | - \frac{2}{3} \big |=?$
9. $|-2.4|-|-1.6|=?$
10. $|-3|-|-2.4|=?$
11. $|2-4|=?$
12. $|5-6|=?$
13. $\big | -\frac{1}{2} - \frac{5}{6}\big |=?$
14. $|2.3-3.7|=?$
15. $|7.8 - 9.4|=?$

### Vocabulary Language: English

Absolute Value

Absolute Value

The absolute value of a number is the distance the number is from zero. Absolute values are never negative.