Question
Store 1 Football Cost
Quantity ($) Cost
1 12
2 24
3 36
Two stores have their footballs on sale. Which store has the better buy? What is the cost for a football at Store 1 and Store 2?
(1 point)
Responses
Store 2 has the better buy on footballs. Store 1’s football costs $24, and Store 2’s football costs $9.
Store 2 has the better buy on footballs. Store 1’s football costs $24, and Store 2’s football costs $9.
Store 2 has the better buy on footballs. Store 1’s football costs $12, and Store 2’s football costs $9.
Store 2 has the better buy on footballs. Store 1’s football costs $12, and Store 2’s football costs $9.
Store 1 has the better buy on footballs. Store 2’s football costs $12, and Store 1’s football costs $9.
Store 1 has the better buy on footballs. Store 2’s football costs $12, and Store 1’s football costs $9.
Store 1 has the better buy on footballs. Store 2’s football costs $9, and Store 1’s football costs $3.
Quantity ($) Cost
1 12
2 24
3 36
Two stores have their footballs on sale. Which store has the better buy? What is the cost for a football at Store 1 and Store 2?
(1 point)
Responses
Store 2 has the better buy on footballs. Store 1’s football costs $24, and Store 2’s football costs $9.
Store 2 has the better buy on footballs. Store 1’s football costs $24, and Store 2’s football costs $9.
Store 2 has the better buy on footballs. Store 1’s football costs $12, and Store 2’s football costs $9.
Store 2 has the better buy on footballs. Store 1’s football costs $12, and Store 2’s football costs $9.
Store 1 has the better buy on footballs. Store 2’s football costs $12, and Store 1’s football costs $9.
Store 1 has the better buy on footballs. Store 2’s football costs $12, and Store 1’s football costs $9.
Store 1 has the better buy on footballs. Store 2’s football costs $9, and Store 1’s football costs $3.
Answers
Answered by
GPT-4o mini
To determine which store has the better buy on footballs, we need to find the cost per football at each store.
For Store 1, we can calculate the per football cost:
- 1 football costs $12, so the cost is $12.
- 2 footballs cost $24, so the cost is $24 / 2 = $12 per football.
- 3 footballs cost $36, so the cost is $36 / 3 = $12 per football.
So at Store 1, the cost per football is consistently $12.
Now we look at Store 2. Assuming we don't have the costs from the original question for Store 2, I can't provide an exact cost. However, based on the given responses, it seems that Store 2 indicates a cost of $9 per football.
Comparing the two:
- Store 1: $12 per football
- Store 2: $9 per football
Since $9 (Store 2) is less than $12 (Store 1), we can conclude that **Store 2 has the better buy on footballs.**
Therefore, the correct response is:
**Store 2 has the better buy on footballs. Store 1’s football costs $12, and Store 2’s football costs $9.**
For Store 1, we can calculate the per football cost:
- 1 football costs $12, so the cost is $12.
- 2 footballs cost $24, so the cost is $24 / 2 = $12 per football.
- 3 footballs cost $36, so the cost is $36 / 3 = $12 per football.
So at Store 1, the cost per football is consistently $12.
Now we look at Store 2. Assuming we don't have the costs from the original question for Store 2, I can't provide an exact cost. However, based on the given responses, it seems that Store 2 indicates a cost of $9 per football.
Comparing the two:
- Store 1: $12 per football
- Store 2: $9 per football
Since $9 (Store 2) is less than $12 (Store 1), we can conclude that **Store 2 has the better buy on footballs.**
Therefore, the correct response is:
**Store 2 has the better buy on footballs. Store 1’s football costs $12, and Store 2’s football costs $9.**