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find **all numbers whose absolute value is 4**.

If there are no such **numbers**, click on "None". 1 ) You want to find out how far you have travelled in a car or plane etc. **4** - 0 = **4** **4** - 1 = 3 **4** - 2 = 2 **4** - 3 = 1 **4** - **4** = 0 **4** - 5 = -1.

So let me just draw a fast **number** line over here.

. USING THE DISTANCE DEFINITION TO SOLVE AN **ABSOLUTE VALUE** EQUATION. Again, the **absolute value** will always be positive; hence, we can conclude that there is no solution.

|3 (5)-9| = |15 -9| = |6| = 6. About us Gauth PLUS.

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The sum of two **integers** of the same sign is an integer of the same sign **whose** **absolute** **value** is equal to the sum of the **absolute** values of the given **integers**.

,. 2) You want to know how much points your team has scored from games start, to end.

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**All** steps.

. If there are no such **numbers**, click on "none". 3) You want to know how much time it took you to do ____(whatever).

So let's just think about the **absolute** **value**. The **absolute value** of a **number** is its distance from zero on the **number** line. . . . Question: Find **all numbers whose absolute value** is **4**.

This problem has been solved! You'll get a detailed solution from a subject matter expert that helps you learn core concepts.

. **find all numbers whose absolute value is** 7.

Welcome to **Absolute Value** with Mr.

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We started with the inequality \(|x|\leq 5\).

We saw that the **numbers** **whose** distance is less than or equal to five from zero on the **number** line were \(−5\) and 5 and **all** the **numbers** between \(−5\) and 5 (Figure \(\PageIndex{**4**}\)).

The distance from 0 to 5 units is represented below.