Asked by Dino cat
Store 2 Football Cost
Cost y quantity x
1(1,9)
2(2,18)
3(3,27)
4(4,36)
Store 1 Football Cost
Quality, cost
1, 12
2, 24
3, 36
Two stores have their foolballs on sare. Which store has the better buy? What is the cost for a football at Store 1 and Store 27
(1 point)
Store 2 has the better buy on foolballs Store 1's football costs $24, and Storm 7's football costs. 50
Storm 2 has the better buy on footballs Store 1's football costs $12. and Store 2's football costs $9
Store 1 has the beftir buy on footballs Store 2's football costs $12, and Store T's football costs 10
Store 1 has the better buy an foottials. Stare 25 fotball costs 59, and Store 1's football costs $3
Cost y quantity x
1(1,9)
2(2,18)
3(3,27)
4(4,36)
Store 1 Football Cost
Quality, cost
1, 12
2, 24
3, 36
Two stores have their foolballs on sare. Which store has the better buy? What is the cost for a football at Store 1 and Store 27
(1 point)
Store 2 has the better buy on foolballs Store 1's football costs $24, and Storm 7's football costs. 50
Storm 2 has the better buy on footballs Store 1's football costs $12. and Store 2's football costs $9
Store 1 has the beftir buy on footballs Store 2's football costs $12, and Store T's football costs 10
Store 1 has the better buy an foottials. Stare 25 fotball costs 59, and Store 1's football costs $3
Answers
Answered by
GPT-4o mini
To determine which store has the better buy for footballs, we will analyze the prices per football for both stores.
**Store 2 Football Cost:**
- 1 football: $9
- 2 footballs: $18 – thus, cost per football = $18 / 2 = $9
- 3 footballs: $27 – thus, cost per football = $27 / 3 = $9
- 4 footballs: $36 – thus, cost per football = $36 / 4 = $9
So, at Store 2, the cost per football is consistently **$9**.
**Store 1 Football Cost:**
- 1 football: $12
- 2 footballs: $24 – thus, cost per football = $24 / 2 = $12
- 3 footballs: $36 – thus, cost per football = $36 / 3 = $12
At Store 1, the cost per football is consistently **$12**.
### Conclusion:
Store 2 has the better buy on footballs since their cost per football is **$9**, which is cheaper than Store 1's cost of **$12**.
### Cost of a Football:
- Store 1's football costs **$12**.
- Store 2's football costs **$9**.
Based on the information provided, here is the correct option from what you've listed:
**Store 2 has the better buy on footballs. Store 1's football costs $12, and Store 2's football costs $9.**
**Store 2 Football Cost:**
- 1 football: $9
- 2 footballs: $18 – thus, cost per football = $18 / 2 = $9
- 3 footballs: $27 – thus, cost per football = $27 / 3 = $9
- 4 footballs: $36 – thus, cost per football = $36 / 4 = $9
So, at Store 2, the cost per football is consistently **$9**.
**Store 1 Football Cost:**
- 1 football: $12
- 2 footballs: $24 – thus, cost per football = $24 / 2 = $12
- 3 footballs: $36 – thus, cost per football = $36 / 3 = $12
At Store 1, the cost per football is consistently **$12**.
### Conclusion:
Store 2 has the better buy on footballs since their cost per football is **$9**, which is cheaper than Store 1's cost of **$12**.
### Cost of a Football:
- Store 1's football costs **$12**.
- Store 2's football costs **$9**.
Based on the information provided, here is the correct option from what you've listed:
**Store 2 has the better buy on footballs. Store 1's football costs $12, and Store 2's football costs $9.**