| 0 | $0.00 | $0.00 | — | — | $0.00 || 1 | $1.00 | $1.00 | $10.00 | $10.00 | $9.00 || 2 | $1.50 | $0.50 |…

| 0 | $0.00 | $0.00 | — | — | $0.00 || 1 | $1.00 | $1.00 | $10.00 | $10.00 | $9.00 || 2 | $1.50 | $0.50 | $20.00 | $10.00 | $18.50 || 3 | $1.75 | $0.25 | $30.00 | $10.00 | $28.25 || 4 | $2.25 | $0.50 | $40.00 | $10.00 | $37.75 || 5 | $3.50 | $1.25 | $50.00 | $10.00 | $46.50 || 6 | $5.00 | $1.50 | $60.00 | $10.00 | $55.00 |what most likely will happen if the pie maker continues to make additional pies?○ the marginal costs will continue to rise, increasing the total cost, while the marginal revenue remains the same, decreasing the profit earned for each pie.○ the marginal costs will continue to fall, decreasing the total cost, while the marginal revenue remains the same, increasing the profit earned for each pie.○ the marginal costs will continue to rise, increasing the total cost, while the marginal revenue remains the same, increasing the profit earned for each pie.○ the marginal costs will continue to fall, decreasing the total cost, while the marginal revenue remains the same, decreasing the profit earned for each pie.
Answer
Brief Explanations:
First, analyze the table: the third column shows marginal cost (MC). From 1 to 6 pies, MC goes $1.00 → $0.50 → $0.25 → $0.50 → $1.25 → $1.50, so after the 3rd pie, MC is rising and this upward trend is consistent. The fourth column shows total revenue, so marginal revenue (MR) is $\frac{$20-$10}{2-1}=$10$, $\frac{$30-$20}{3-2}=$10$, etc., so MR stays constant at $10. Profit per pie is MR - MC; as MC rises while MR stays the same, profit per pie decreases, and total cost will rise because each additional pie adds a higher (or rising) marginal cost.
Answer:
The marginal costs will continue to rise, increasing the total cost, while the marginal revenue remains the same, decreasing the profit earned for each pie.