Question
Jimmy’s knitwear sold a total of 54 scarves over 6 days equally. At the same rate, number of carves sold in 3 days will be __________.
- 27
- 26
- 24
- 25
Hint:
The unitary method is a technique for solving a problem by first finding the value of a single unit, and then finding the necessary value by multiplying the single unit value.
The correct answer is: 27
Here, it is given that Jimmy's knitwear sold 54 scarves in 6 days. We have to find the number of scarves sold in 3 days.
We have, Number of scarves sold in 6 days = 54.
Number of scarves sold in 1 day = 54/6 =9.
Number of scarves sold in 3 days = 9 × 3 =27.
Hence, the correct option is A.
We can find the number of scarves sold in 3 days by dividing the number of scarves sold in 6 days by 2.
Related Questions to study
Harvest market sells a crate of 15 pounds of Florida apples for $12. The unit rate is $ per pounds is ________.
Cost per pound multiplied by total number of pound gives the total cost.
Harvest market sells a crate of 15 pounds of Florida apples for $12. The unit rate is $ per pounds is ________.
Cost per pound multiplied by total number of pound gives the total cost.
Analyze the table below and answer the questions that follow.
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text.](data:image/png;base64,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)
Find the unit rate of Burger king in $ per ounces.
Cost per ounce multiplied by total number of ounces gives the total cost.
Analyze the table below and answer the questions that follow.
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text.](data:image/png;base64,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)
Find the unit rate of Burger king in $ per ounces.
Cost per ounce multiplied by total number of ounces gives the total cost.
Analyze the table below and answer the questions that follow.
![Error converting from MathML to accessible text.](data:image/png;base64,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)
Find the unit rate of Wendy’s in ounces per $.
Number of ounces per dollar multiplied with total number of ounces gives the total cost.
Analyze the table below and answer the questions that follow.
![Error converting from MathML to accessible text.](data:image/png;base64,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)
Find the unit rate of Wendy’s in ounces per $.
Number of ounces per dollar multiplied with total number of ounces gives the total cost.
Analyze the table below and answer the questions that follow.
![Error converting from MathML to accessible text.](data:image/png;base64,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)
Find the unit rate of Mc Donald’s in ounces per $.
Number of ounces per dollar multiplied with total number of ounces gives the total cost.
Analyze the table below and answer the questions that follow.
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)
Find the unit rate of Mc Donald’s in ounces per $.
Number of ounces per dollar multiplied with total number of ounces gives the total cost.
If the weight of 7 books is 120 lbs. Weight of 28 books is ________.
We can find the weight by 28 books by multiplying the weight of 7 books by 4.
If the weight of 7 books is 120 lbs. Weight of 28 books is ________.
We can find the weight by 28 books by multiplying the weight of 7 books by 4.
Cost of 8 dozen of bananas is $10. Cost of 24 dozen of bananas is ___________.
We can multiply the cost of 8 dozen bananas by 3 and get the cost of 24 dozen bananas.
Cost of 8 dozen of bananas is $10. Cost of 24 dozen of bananas is ___________.
We can multiply the cost of 8 dozen bananas by 3 and get the cost of 24 dozen bananas.
Jenny packed 108 eggs in 9 cartons. At the same rate, 540 eggs can be packed in _________ cartons.
We can find the number of cartons required for 540 eggs by multiplying the number of cartons required for 108 eggs by 5.
Jenny packed 108 eggs in 9 cartons. At the same rate, 540 eggs can be packed in _________ cartons.
We can find the number of cartons required for 540 eggs by multiplying the number of cartons required for 108 eggs by 5.
George’s plane climbs 450 feet in 40 seconds. Altitude scaled by the plane keeping same speed in 4 minutes is ________.
We can also find the height scaled in 4 minutes by multiplying the height scaled in 40 seconds by 6.
George’s plane climbs 450 feet in 40 seconds. Altitude scaled by the plane keeping same speed in 4 minutes is ________.
We can also find the height scaled in 4 minutes by multiplying the height scaled in 40 seconds by 6.