Final answer:
To solve the equation 4|x - 5| + 20 = 60, subtract 20, divide by 4, and consider both positive and negative cases of the absolute value, resulting in the solutions x = 15 and x = -5.
Step-by-step explanation:
To solve the equation 4|x - 5| + 20 = 60, follow these steps:
- Subtract 20 from both sides of the equation to isolate the absolute value expression: 4|x - 5| = 40.
- Divide both sides by 4 to further isolate the absolute value: |x - 5| = 10.
- Now, consider the two possible cases for the absolute value:
- Case 1: x - 5 = 10, which simplifies to x = 15.
- Case 2: x - 5 = -10, which simplifies to x = -5.
Therefore, the solutions to the equation are x = 15 and x = -5.