Absolute Value of Numbers
Absolute Value of Numbers
The absolute value of a number is its distance from zero on the number line. Because distance cannot be negative, the absolute value of a number is always zero or positive.
We write absolute value using two vertical bars. For example, the absolute value of โ7 is written as โฃโ7โฃ.
Finding the Absolute Value
To find the absolute value, simply count how many units the number is away from zero, regardless of the direction (left or right).
- Find โฃโ7โฃ: The number โ7 is exactly 7 units away from zero. Therefore, โฃโ7โฃ=7.
- Find โฃ4โฃ: The number 4 is exactly 4 units away from zero. Therefore, โฃ4โฃ=4.
- Find โฃ0โฃ: Zero is exactly 0 units away from itself. Therefore, โฃ0โฃ=0.
Comparing Absolute Values
You can use absolute value to figure out which number is further from zero.
Example: Which has a greater absolute value: โ12 or 9?
- First, find the absolute values: โฃโ12โฃ=12 and โฃ9โฃ=9.
- Compare the results: 12>9.
- Because 12 is larger, โ12 is further from zero and has the greater absolute value.
Ordering Absolute Values
When asked to order numbers by their absolute values, always evaluate the absolute values first before placing them in order.
Example: Order โฃโ3โฃ, โฃ5โฃ, โฃโ8โฃ, โฃ2โฃ from least to greatest.
- Find the value of each expression:
- โฃโ3โฃ=3
- โฃ5โฃ=5
- โฃโ8โฃ=8
- โฃ2โฃ=2
- Order these regular numbers from least to greatest: 2,3,5,8.
- Write the final answer using the original absolute value expressions: โฃ2โฃ, โฃโ3โฃ, โฃ5โฃ, โฃโ8โฃ.