Question
Store A and Store B are advertising canned corn on sale. Store A’s canned corn cost .10 ounce is displayed in the graph. Store B’s canned corn by the equation y=0.13x ounces. Which store has the better buy and by how much
Answers
GPT-4o mini
To compare the prices of the canned corn from Store A and Store B, we first need to understand the pricing structure for both stores.
1. **Store A**: The cost is displayed as $0.10 per ounce.
2. **Store B**: The equation provided is \( y = 0.13x \), where \( y \) represents the total cost and \( x \) represents the number of ounces. This implies that the cost per ounce for Store B is $0.13.
Now we can compare the prices:
- **Store A**: $0.10 per ounce
- **Store B**: $0.13 per ounce
To determine which store has the better deal, we can simply compare the two prices:
- Store A's price ($0.10) is lower than Store B's price ($0.13).
To quantify how much better Store A's price is, we can calculate the difference:
\[
\text{Difference} = \text{Price at Store B} - \text{Price at Store A} = 0.13 - 0.10 = 0.03
\]
Store A offers a better buy compared to Store B by $0.03 per ounce.
1. **Store A**: The cost is displayed as $0.10 per ounce.
2. **Store B**: The equation provided is \( y = 0.13x \), where \( y \) represents the total cost and \( x \) represents the number of ounces. This implies that the cost per ounce for Store B is $0.13.
Now we can compare the prices:
- **Store A**: $0.10 per ounce
- **Store B**: $0.13 per ounce
To determine which store has the better deal, we can simply compare the two prices:
- Store A's price ($0.10) is lower than Store B's price ($0.13).
To quantify how much better Store A's price is, we can calculate the difference:
\[
\text{Difference} = \text{Price at Store B} - \text{Price at Store A} = 0.13 - 0.10 = 0.03
\]
Store A offers a better buy compared to Store B by $0.03 per ounce.