Compare absolute values
In grade 6 you learned that the absolute value `|x|` means the distance of the number from zero. So it is always non-negative.
In grade 7 we go further and compare two absolute values with each other. It is intuitive, but easy to slip up if you confuse the original numbers with their absolute values.
Example
`|−5|` ? `|3|`
First compute the absolute values:
- `|−5| = 5` (distance of −5 from zero).
- `|3| = 3`.
Now compare: `5 > 3`, so `|−5| > |3|`. Even though −5 < 3.
Where is the trap?
Negative numbers sit "to the left" of zero on the number line. `−5` is farther from zero than `3`, even if it is "smaller" in the usual ordering.
Rule: when comparing absolute values, ignore the signs — only look at the distance from zero.
Tips
- Compute `|a|` and `|b|` separately, then compare.
- Turn a negative into a positive in your head: `|−5|` is just `5`.
- Very typical case: one number positive, the other negative. The positive often "loses" if the negative is far from zero.
Typical problems
| comparison | absolute values | answer | ||||
| ` | −7 | ` vs ` | 4 | ` | 7 vs 4 | `>` |
| ` | −3 | ` vs ` | 3 | ` | 3 vs 3 | `=` |
| ` | −2 | ` vs ` | −9 | ` | 2 vs 9 | `<` |
| ` | 0 | ` vs ` | −4 | ` | 0 vs 4 | `<` |