Final answer:
To solve the compound inequality -33 < -7n - 12 ≤ -26, break it down into two separate inequalities: -33 < -7n - 12 and -7n - 12 ≤ -26. Solve each inequality separately and combine the solutions to get n < 3 and n ≥ 2, resulting in -3 < n ≤ 3.
Step-by-step explanation:
To solve the compound inequality -33 < -7n - 12 ≤ -26, we need to break it down into two separate inequalities: -33 < -7n - 12 and -7n - 12 ≤ -26.
For the first inequality, we can solve it as follows:
- -7n - 12 > -33
- -7n > -33 + 12
- -7n > -21
- n < -21/-7
- n < 3
For the second inequality, we can solve it as follows:
- -7n - 12 ≤ -26
- -7n ≤ -26 + 12
- -7n ≤ -14
- n ≥ -14/-7
- n ≥ 2
Combining the solutions, we have n < 3 and n ≥ 2.
Therefore, the solution to the compound inequality is -3 < n ≤ 3. Therefore, the correct answer is C. -3 < n ≤ 3.