Question

Which of the following inequalities is represented by the number line shown below?

\[ -2 \leq x \leq 5 \]

• A. \( |4x - 6| \leq 14 \)
• B. \( |5x - 5| \geq 25 \)
• C. \( 5x \leq 25 \)
• D. \( 4x \geq -8 \)
• E. \( |3x - 12| \leq 6 \)

Hint:

When an inequality involves a bounded interval like \([-a, b]\), look for an absolute value inequality of the form \(|mx + c| \leq k\).

Answer 1

The Correct Option is A

Step 1: Recall the form of inequality from number line.
The interval is \(-2 \leq x \leq 5\). This is a bounded inequality that should match an absolute value condition.

Step 2: Check option (A).
\(|4x - 6| \leq 14\) expands to: \[ -14 \leq 4x - 6 \leq 14 \] \[ -8 \leq 4x \leq 20 \quad \Rightarrow \quad -2 \leq x \leq 5 \] This exactly matches the given interval.
Step 3: Check others quickly.
- (B) would give values outside the interval.
- (C) gives \(x \leq 5\), but no lower bound.
- (D) gives \(x \geq -2\), but no upper bound.
- (E) simplifies to \(2 \leq x \leq 6\), which is incorrect.
Hence, only (A) is correct.
Final Answer: \[ \boxed{|4x - 6| \leq 14} \]