The values of h satisfying h - 4 < -2 are -1 and 1, forming the solution set h < 2.
To find the values of h that satisfy the inequality h - 4 < -2, we can isolate h by adding 4 to both sides of the inequality:
h - 4 + 4 < -2 + 4
This simplifies to h < 2. Now, we evaluate this inequality for each given option: -1, 1, and 2.
For h = -1: -1 < 2 (True)
For h = 1: 1 < 2 (True)
For h = 2: 2 < 2 (False)
Therefore, the values of h that satisfy the inequality are -1 and 1. The solution set is h , where h is any real number less than 2.
The question probable may be:
Which values of h satisfy the inequality h - 4 < -2 among the options -1, 1, and 2? Solve the inequality and identify the values of h that make it true. Provide the solution set for the given inequality.