Absolute Value | Open Textbooks

What is Absolute Value?

Absolute Value = Distance from Zero

The absolute value of a number tells you how far that number is from zero, without caring about direction.

Think about it like this: If you're standing at zero on a number line, the absolute value tells you how many steps it takes to reach a number - whether you go left (negative) or right (positive).

The Absolute Value Symbol

| number | = distance from zero

We write absolute value using vertical bars around the number.

Visualizing on a Number Line

Both -5 and 5 are the same distance from 0

|-5| = 5 and |5| = 5

Key Facts About Absolute Value

Absolute value is always positive or zero - distance can't be negative!
Opposites have the same absolute value - |−7| = |7| = 7
The absolute value of zero is zero - |0| = 0
The bars work like grouping symbols - simplify inside first

Quick Examples

|8|

=

8

8 is 8 units from zero

|-8|

=

8

-8 is also 8 units from zero

|0|

=

0

Zero is 0 units from itself

|-25|

=

25

-25 is 25 units from zero

Real-World Uses of Absolute Value

🌡️

Temperature Difference

How far from freezing (0°) is the temperature?

|-15°C| = 15 degrees from freezing

🏦

Money Owed

How much do you owe, regardless of + or -?

|-$50| = $50 owed

🌊

Elevation

Distance from sea level (0 feet)

|-200 feet| = 200 feet below sea level

🎯

Accuracy

How far off is an estimate?

|guess - actual| = error

Easy Way to Remember: When you see absolute value bars, just ask: "How far from zero?" and make the answer positive!

Worked Examples

Let's work through several absolute value problems step by step.

Example 1: Basic Absolute Value

Find: |-12|

1

Ask: How far is -12 from zero?
-12 is 12 units to the left of zero on the number line.

2

The distance is always positive:
|-12| = 12

|-12| = 12

Example 2: Comparing Absolute Values

Which is greater: |-15| or |10|?

1

Find each absolute value:
|-15| = 15 (15 units from zero)
|10| = 10 (10 units from zero)

2

Compare:
15 > 10

|-15| > |10| because 15 > 10

Example 3: Absolute Value with Operations

Find: |−3| + |−7|

1

Find each absolute value separately:
|−3| = 3
|−7| = 7

2

Add the results:
3 + 7 = 10

|−3| + |−7| = 3 + 7 = 10

Example 4: Expression Inside Absolute Value

Find: |5 − 12|

1

Simplify inside the bars first:
5 − 12 = −7

2

Now find the absolute value:
|−7| = 7

|5 − 12| = |−7| = 7

Practice Problems

Try these absolute value problems!

Problem 1

|−20| = ?

Problem 2

Which is greater: |−9| or |7|?

Problem 3

|−4| + |−6| = ?

Problem 4

|8 − 15| = ?

Check Your Understanding: Absolute Value Challenge

Test your absolute value skills with this 6-question challenge!

Absolute Value Challenge

Score: 0 / 6

Question 1 of 6

Challenge Complete!

0/6

Next Steps

Key Takeaways:

Absolute value measures the distance from zero on a number line
Absolute value is always positive or zero - never negative
Opposite numbers have the same absolute value: |−5| = |5| = 5
Simplify inside the absolute value bars first, then find the distance

Practice identifying absolute values of everyday numbers
Think about real-world situations involving distance from zero
Move on to learn about integer operations in the next lesson!