QUESTION IMAGE
Question
number is from 0. the absolute value of 3 is
e same distance from 0 on the number line
the opposite of -11 is 11.
| number | opposite | absolute value |
|---|---|---|
| -67 | ||
| -35 | ||
| 3 ½ | ||
| -8 ½ | ||
| 2.9 | ||
| -0.8 | ||
| 2.63 | ||
| -1.72 | ||
| 3 ¾ | ||
| -5 ¼ | ||
| 0.07 | ||
| -0.32 | ||
| 0.47 | ||
| 2.8 | ||
| -9.6 |
Response
To solve for the opposite and absolute value of each number, we use the following rules:
- Opposite of a number: The opposite of a number \( a \) is \( -a \) (and vice versa). For example, the opposite of \( 42 \) is \( -42 \), and the opposite of \( -67 \) is \( 67 \).
- Absolute value of a number: The absolute value of a number \( a \), denoted \( |a| \), is its distance from \( 0 \) on the number line. For a positive number \( a \), \( |a| = a \); for a negative number \( -a \) (where \( a > 0 \)), \( |-a| = a \); and \( |0| = 0 \).
For each number:
| Number | Opposite | Absolute Value |
|---|---|---|
| \( -67 \) | \( 67 \) | \( 67 \) |
| \( -35 \) | \( 35 \) | \( 35 \) |
| \( 3\frac{1}{2} \) | \( -3\frac{1}{2} \) | \( 3\frac{1}{2} \) |
| \( -8\frac{1}{2} \) | \( 8\frac{1}{2} \) | \( 8\frac{1}{2} \) |
| \( 2.9 \) | \( -2.9 \) | \( 2.9 \) |
| \( -0.8 \) | \( 0.8 \) | \( 0.8 \) |
| \( 2.63 \) | \( -2.63 \) | \( 2.63 \) |
| \( -1.72 \) | \( 1.72 \) | \( 1.72 \) |
| \( 3\frac{3}{4} \) | \( -3\frac{3}{4} \) | \( 3\frac{3}{4} \) |
| \( -5\frac{1}{4} \) | \( 5\frac{1}{4} \) | \( 5\frac{1}{4} \) |
| \( 0.07 \) | \( -0.07 \) | \( 0.07 \) |
| \( -0.32 \) | \( 0.32 \) | \( 0.32 \) |
| \( 0.47 \) | \( -0.47 \) | \( 0.47 \) |
| \( 2.8 \) | \( -2.8 \) | \( 2.8 \) |
| \( -9.6 \) | \( 9.6 \) | \( 9.6 \) |
of Key Calculations:
- Opposite: Multiply the number by \( -1 \). For example, \( \text{opposite of } 42 = 42 \times (-1) = -42 \), and \( \text{opposite of } -67 = -67 \times (-1) = 67 \).
- Absolute Value: If the number is positive, its absolute value is itself. If negative, remove the negative sign. For example, \( |-67| = 67 \) (since distance from \( 0 \) is \( 67 \)) and \( |42| = 42 \).
This table summarizes the opposite and absolute value for each given number.
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of Key Calculations:
- Opposite: Multiply the number by \( -1 \). For example, \( \text{opposite of } 42 = 42 \times (-1) = -42 \), and \( \text{opposite of } -67 = -67 \times (-1) = 67 \).
- Absolute Value: If the number is positive, its absolute value is itself. If negative, remove the negative sign. For example, \( |-67| = 67 \) (since distance from \( 0 \) is \( 67 \)) and \( |42| = 42 \).
This table summarizes the opposite and absolute value for each given number.