To determine which row does not have the same ratio of gallons to cups, we first need to figure out the ratio for each row.
- Row 1: 1327 gallons and cups: \( \frac{1327}{1} \)
- Row 2: 2545 gallons and cups: \( \frac{2545}{1} \)
- Row 3: 3972 gallons and cups: \( \frac{3972}{1} \)
- Row 4: 1090 gallons and cups: \( \frac{1090}{1} \)
However, these numbers seem more likely to represent cup values. To determine the ratio of gallons to cups across all rows, we can assume each row reflects the number of cups corresponding to 1 gallon (since the table does not clearly specify). Thus, we need to convert these values to gallons:
- 1 gallon = 16 cups
So to compare ratios, we will convert each cups value into gallons:
- Row 1: \( \frac{1327}{16} \)
- Row 2: \( \frac{2545}{16} \)
- Row 3: \( \frac{3972}{16} \)
- Row 4: \( \frac{1090}{16} \)
Now, let’s find the simplest form of each fraction:
- Row 1: \( 1327 , \text{cups} = \frac{1327}{16} \approx 82.9375 \)
- Row 2: \( 2545 , \text{cups} = \frac{2545}{16} \approx 159.0625 \)
- Row 3: \( 3972 , \text{cups} = \frac{3972}{16} \approx 248.25 \)
- Row 4: \( 1090 , \text{cups} = \frac{1090}{16} \approx 68.125 \)
Now we can check which values are similar or follow a ratio.
Looking closely at the approximated values, Row 2 and Row 3 are significantly higher compared to Row 1 and Row 4. In fact, Row 4 seems to have the lowest value compared to the other three rows.
Thus, Row 4 (1090 cups) does not share a similar ratio with the others.
Therefore, the answer is Row 4.
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