Final answer:
The inequality representing all possible combinations of shirts (x) and jeans (y) Ella can buy with $250 is 3x + 8y ≤ 250, where 'x' is the number of shirts and 'y' is the number of jeans.
Step-by-step explanation:
The question focuses on a budget constraint scenario where Ella's mother gave her $250 to spend on clothes, with shirts priced at $3 and jeans priced
To represent all possible combinations of shirts (x) and jeans (y) that Ella can buy without exceeding her budget, we can use the following inequality: 3x + 8y ≤ 250
And, this inequality represents the total cost of the shirts and jeans Ella wants to buy, which must be less than or equal to the $250 her mom gave her to spend.
Since shirts cost $3 and jeans cost $8, the total cost is given by 3x + 8y, where x is the number of shirts and y is the number of jeans.
Therefore, the inequality 3x + 8y ≤ 250represents all possible combinations of shirts and jeans that Ella can buy.