QUESTION IMAGE
Question
- mark the number line to show how you would find or illustrate | - 4 | and | 3 |.
- put the correct sign between each pair of numbers: >, ≥, <, ≤, =
a. \\(\frac{3}{4}\\) \\(\square\\) -2
b. 5 \\(\square\\) \\(\frac{10}{2}\\)
c. -1 \\(\square\\) 0
d. -3 \\(\square\\) -1
Problem 6
Step1: Recall absolute value definition
The absolute value of a number \( x \), denoted \( |x| \), is the distance of \( x \) from 0 on the number line. So \( | - 4| \) is the distance from -4 to 0, and \( |3| \) is the distance from 3 to 0.
Step2: Find \( | - 4| \)
The distance from -4 to 0 is 4 units (since we move 4 units to the right from -4 to 0). So \( | - 4|=4 \). On the number line, we mark 4 (which is the same as +4) to represent \( | - 4| \).
Step3: Find \( |3| \)
The distance from 3 to 0 is 3 units (we move 3 units to the left from 3 to 0). So \( |3| = 3\). On the number line, we mark +3 to represent \( |3| \).
Step1: Recall number types
\( \frac{3}{4} \) is a positive fraction (greater than 0), and -2 is a negative integer (less than 0).
Step2: Compare positive and negative
Positive numbers are always greater than negative numbers. So \( \frac{3}{4}> - 2 \).
Step1: Simplify \( \frac{10}{2} \)
Simplify the fraction \( \frac{10}{2} \) by dividing 10 by 2. \( \frac{10}{2}=5 \).
Step2: Compare 5 and 5
Since both numbers are equal (5 = 5), we use the equal sign.
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To illustrate \( | - 4| \), mark the point at \( + 4 \) (since \( | - 4|=4 \)) on the number line. To illustrate \( |3| \), mark the point at \( + 3 \) (since \( |3| = 3\)) on the number line.