Answer: The result is 0 > 2
Step-by-step explanation: Let's solve the inequality:
1/2h + 2 > 1/2h + 4
To isolate 'h,' we can start by subtracting 2 from both sides of the inequality:
1/2h + 2 - 2 > 1/2h + 4 - 2
1/2h > 1/2h + 2
Now, subtract 1/2h from both sides to simplify:
1/2h - 1/2h > 1/2h + 2 - 1/2h
0 > 2
The result is 0 > 2, which is not a true statement. In fact, it's always false. Therefore, there is no solution for this inequality. In other words, there are no values of 'h' that make the original inequality 1/2h + 2 > 1/2h + 4 true. The inequality is inconsistent, suggesting that there are no values of 'h' that satisfy this inequality.