Question 10/Multiple Choice Worth 1 points) (01.04 MC) Jasmine wants to use her savings of 1,128 to buy video games and movies. The total price of the movies she bought was 72 The video games cost 43 each. Choose the inequality that would be used to solve for the maximum number of video games Jasmine can buy with her savings. 43+72xleqslant 1,128 43+72xgeqslant 1,128 43x+72geqslant 1,128 43x+72leqslant 1,128

## Step 1
Jasmine has a total of $$1,128 to spend on video games and movies. She has already spent$$ 72 on movies. The remaining amount of money she has to spend on video games is therefore $1,128 - 72 = 1,056$.

## Step 2
Each video game costs $$43. Therefore, the total cost of video games Jasmine can buy is represented by the expression \(43x\), where \(x\) is the number of video games. ## Step 3 The total amount of money Jasmine can spend on video games and movies is$$ 1,128. Therefore, the sum of the cost of video games and movies should not exceed $$1,128. ## Step 4 The inequality that represents this situation is \(43x + 72 \leq 1,128\). This inequality states that the total cost of video games and movies (which is \(43x + 72\)) should be less than or equal to$$ 1,128.