To solve this problem proportionally, let's set up the proportion based on what we know. Milly sells 8 boxes every 3 days. We want to determine how many days (x) it will take her to sell 56 boxes.
We can set up the proportion like this:
\[ \frac{8 \text{ boxes}}{3 \text{ days}} = \frac{56 \text{ boxes}}{x \text{ days}} \]
This means that:
- 8 boxes corresponds to 3 days,
- 56 boxes corresponds to \(x\) days.
Here’s the correct form of the proportion you asked for:
8 boxes / 3 days = 56 boxes / x days
Now, to solve for \(x\):
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Cross-multiply: \(8 \cdot x = 56 \cdot 3\)
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Calculate the right side: \(56 \cdot 3 = 168\)
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So, the equation now is: \(8x = 168\)
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Divide both sides by 8: \(x = \frac{168}{8} = 21\)
Therefore, Milly will take 21 days to sell 56 boxes of Girl Scout cookies.
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