Question
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Local ice cream shop offers a deal on Wednesdays where you can pay $4 for a plane.Ice cream Sunday in a dollar per topping.You choose maximum of 10 topics, which are they following graph?The best models , the cost someone could pay using this offer
Local ice cream shop offers a deal on Wednesdays where you can pay $4 for a plane.Ice cream Sunday in a dollar per topping.You choose maximum of 10 topics, which are they following graph?The best models , the cost someone could pay using this offer
Answers
GPT-4o mini
To determine the maximum cost someone could pay for the ice cream sundae using the local ice cream shop's Wednesday offer, we can break down the cost as follows:
1. **Base Price for a Plain Ice Cream Sundae:** $4
2. **Cost per Topping:** $1
3. **Maximum Number of Toppings:** 10
Now, we can calculate the total cost depending on the number of toppings chosen:
1. **Cost for zero toppings:**
- $4 + ($1 * 0) = $4
2. **Cost for one topping:**
- $4 + ($1 * 1) = $5
3. **Cost for two toppings:**
- $4 + ($1 * 2) = $6
4. **Cost for three toppings:**
- $4 + ($1 * 3) = $7
5. **Cost for four toppings:**
- $4 + ($1 * 4) = $8
6. **Cost for five toppings:**
- $4 + ($1 * 5) = $9
7. **Cost for six toppings:**
- $4 + ($1 * 6) = $10
8. **Cost for seven toppings:**
- $4 + ($1 * 7) = $11
9. **Cost for eight toppings:**
- $4 + ($1 * 8) = $12
10. **Cost for nine toppings:**
- $4 + ($1 * 9) = $13
11. **Cost for ten toppings (maximum):**
- $4 + ($1 * 10) = $14
### Maximum Cost
The maximum cost someone could pay using this offer with 10 toppings would be **$14**.
In a graph representing this situation, you could plot the number of toppings (0 to 10) on the x-axis and the total cost on the y-axis. The relationship would be linear, starting at $4 and increasing by $1 for each additional topping, resulting in a straight line that ends at the maximum cost of $14 when 10 toppings are included.
1. **Base Price for a Plain Ice Cream Sundae:** $4
2. **Cost per Topping:** $1
3. **Maximum Number of Toppings:** 10
Now, we can calculate the total cost depending on the number of toppings chosen:
1. **Cost for zero toppings:**
- $4 + ($1 * 0) = $4
2. **Cost for one topping:**
- $4 + ($1 * 1) = $5
3. **Cost for two toppings:**
- $4 + ($1 * 2) = $6
4. **Cost for three toppings:**
- $4 + ($1 * 3) = $7
5. **Cost for four toppings:**
- $4 + ($1 * 4) = $8
6. **Cost for five toppings:**
- $4 + ($1 * 5) = $9
7. **Cost for six toppings:**
- $4 + ($1 * 6) = $10
8. **Cost for seven toppings:**
- $4 + ($1 * 7) = $11
9. **Cost for eight toppings:**
- $4 + ($1 * 8) = $12
10. **Cost for nine toppings:**
- $4 + ($1 * 9) = $13
11. **Cost for ten toppings (maximum):**
- $4 + ($1 * 10) = $14
### Maximum Cost
The maximum cost someone could pay using this offer with 10 toppings would be **$14**.
In a graph representing this situation, you could plot the number of toppings (0 to 10) on the x-axis and the total cost on the y-axis. The relationship would be linear, starting at $4 and increasing by $1 for each additional topping, resulting in a straight line that ends at the maximum cost of $14 when 10 toppings are included.