Answer:
Explanation:
To solve a compound inequality of the form "s + 4 < -5 OR 2 + s >= 4", we can solve each inequality separately and then combine the solutions to get the final solution.
For the inequality "s + 4 < -5", we can solve it by moving all the terms to the left-hand side of the inequality sign:
s + 4 - 4 < -5 - 4
s < -9
For the inequality "2 + s >= 4", we can solve it by moving all the terms to the left-hand side of the inequality sign:
2 + s - 2 >= 4 - 2
s >= 2
The solution to the compound inequality "s + 4 < -5 OR 2 + s >= 4" is the set of all values of s that satisfy either of these two inequalities. This is shown graphically by the shaded region in the graph below:
[Graph not provided] not doing a graph use desmos to graph it
We can see from the graph that the solution to the compound inequality is all values of s that are less than -9 or greater than or equal to 2.
I hope this helps! Let me know if you have any questions.