Absolute Value Tools is a free on-line tool that helps to search out absolutely the worth of a given variety. absolutely the worth represents the magnitude of variety while not together with the sign. The concept behind absolute value is really just the idea of “distance from 0.” Going back to the idea of a number line.

We can say that 4 could be a distance of 4 units far away from zero, however conjointly -4, the other of four, is four units far away from zero. thus each 4 and -4 square measures four units far away from zero. the quantity five is 5 units far away from zero. and -3 is 3 units far away from zero.

The absolute value of a digit is represented by a modulus sign. parameters like distance, time, price,
etc., are always given by their absolute values. The formula for absolute value: **|x| = x**

- Absolute value of 12 is 12 written as |12| = 12
- Absolute value of -10 is 10 written as |10| = 10
- The absolute value of 0 is 0 written as |0| = 0

**What are Absolute Value Equations?**

In maths, an absolute value equation is defined as an equation that contains the absolute value expression. For example, |x+1|= 2. Here |x+1| is the absolute expression. The absolute value shows how long the given number is from zero. Here, negative values are not allowed. It is the size or the magnitude of the number.

For example, |-4| = 4. Because -4 is 4 away from the value 0. Hence, absolute value of -4 is four.

- Step 1: Enter the value within the input field.
- Step 2: Click on the calculate button to evaluate the result.
- Step 3: Finally, absolutely the worth equations are going to be displayed within the new window

**Calculating Absolute Value of a Number Examples**

Example 1. Find the absolute value of 52?

Solution:

According to the formula,

|x| = x, if x > 0 (x is positive)

|52| = 52.

Hence, the absolute value of 52 is 52.

Example 2. Find the absolute value of -21.2?

Solution:

According to the formula,

|x| = -x, if x < 0 (x is negative)

|-21.2| = -(-21.2) = 21.2

Hence, the absolute value of -21.2 is 21.2.

Example 3: Find the absolute value of -17?

Solution:

According to the formula,

|x| = -x, if x < 0 (x is negative)

|-17| = -(-17) = 17

Hence, the absolute value of -17 is 17.

**1. What is Meant by Absolute Value Equations?**

In maths, an absolute value equation is defined as an equation that contains the absolute value expression.

**2. How to calculate absolute value?**

Enter the worth within the input field, click on the button “evaluate” to urge the result, Finally, absolutely the worth equations are going to be displayed within the new window

**3. What is the formula for absolute value?**

The formula for absolute value: |x| = x