First, we need to determine the cost per pound of ground beef at SuperGrocery A.
At SuperGrocery A:
- Cost for 5 pounds = $43.60
- Cost per pound = \( \frac{43.60}{5} = 8.72 \)
So, the cost per pound at SuperGrocery A is $8.72.
Next, we will calculate the cost per pound at SuperGrocery B using the prices from the table provided:
-
For \( x = 2 \) pounds:
- Total cost = $15.12
- Cost per pound = \( \frac{15.12}{2} = 7.56 \)
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For \( x = 2.5 \) pounds:
- Total cost = $18.90
- Cost per pound = \( \frac{18.90}{2.5} = 7.56 \)
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For \( x = 3.5 \) pounds:
- Total cost = $26.46
- Cost per pound = \( \frac{26.46}{3.5} \approx 7.56 \)
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For \( x = 5 \) pounds:
- Total cost = $37.80
- Cost per pound = \( \frac{37.80}{5} = 7.56 \)
Now, we can summarize the cost per pound:
- Cost per pound at SuperGrocery A: $8.72
- Cost per pound at SuperGrocery B: $7.56
Finally, to find how much you would save per pound by buying ground beef at SuperGrocery B instead of SuperGrocery A:
\[ \text{Savings per pound} = \text{Cost per pound at SuperGrocery A} - \text{Cost per pound at SuperGrocery B} = 8.72 - 7.56 = 1.16 \]
Thus, you would save $1.16 per pound by buying your ground beef at SuperGrocery B rather than SuperGrocery A.