Solve. \& \( -5|x-4|>-20 \)

To solve the inequality: \[ -5|x - 4| > -20 \] **Step 1: Isolate the Absolute Value** First, divide both sides of the inequality by **-5**. Remember that when you divide or multiply both sides of an inequality by a negative number, you must **reverse the inequality sign**. \[ |x - 4| < \frac{-20}{-5} \] \[ |x - 4| < 4 \] **Step 2: Remove the Absolute Value** The inequality \( |x - 4| < 4 \) means that the expression inside the absolute value, \( x - 4 \), is between -4 and 4. \[ -4 < x - 4 < 4 \] **Step 3: Solve for \( x \)** Add 4 to all parts of the inequality to isolate \( x \): \[ -4 + 4 < x < 4 + 4 \] \[ 0 < x < 8 \] **Conclusion** The solution to the inequality is all real numbers \( x \) such that \( x \) is greater than 0 and less than 8. **Answer:** All real numbers x with x between 0 and 8. In other words, the solution is  0 < x < 8.