Tony was asked to bring root beer for root beer floats to the end of year class party. He is only given so much money for his budget. He finds a 64 oz. bottle for $3.20. What is the unit rate price per ounce?(1 point) Responses $5.00 $5.00 $0.50 $0.50 $1.00 $1.00 $0.05
To find the unit rate price per ounce, we need to divide the total cost by the number of ounces in the bottle.
Total cost of the bottle: $3.20
Number of ounces in the bottle: 64 oz
Unit rate price per ounce = Total cost / Number of ounces
= $3.20 / 64 oz
Calculating the division:
Unit rate price per ounce = $0.05
Therefore, the unit rate price per ounce is $0.05.
Gloria is making flower arrangements for a wedding. She has a total of 112 flowers and 14 vases to fill. What is the unit rate of flowers per vase?(1 point) Responses 10 flowers 10 flowers 6 flowers 6 flowers 14 flowers 14 flowers 8 flowers
To find the unit rate of flowers per vase, we need to divide the total number of flowers by the number of vases.
Total number of flowers: 112 flowers
Number of vases: 14 vases
Unit rate of flowers per vase = Total number of flowers / Number of vases
= 112 flowers / 14 vases
Calculating the division:
Unit rate of flowers per vase = 8 flowers
Therefore, the unit rate of flowers per vase is 8 flowers.
Manny is making almond muffins for a mid-day snack. He makes 36 muffins and uses 4 cups of almonds. What is the unit rate of muffins per cup of almonds that he is using?(1 point) Responses 8 muffins 8 muffins 12 muffins 12 muffins 9 muffins 9 muffins 19 of a muffin
To find the unit rate of muffins per cup of almonds, we need to divide the total number of muffins by the number of cups of almonds used.
Total number of muffins: 36 muffins
Number of cups of almonds: 4 cups
Unit rate of muffins per cup of almonds = Total number of muffins / Number of cups of almonds
= 36 muffins / 4 cups
Calculating the division:
Unit rate of muffins per cup of almonds = 9 muffins
Therefore, the unit rate of muffins per cup of almonds that Manny is using is 9 muffins.
Ruby is making friendship bracelets. She has a total of 156 beads to make bracelets for 12 friends. If she uses all of the beads, what is the unit rate of beads per bracelet?(1 point) Responses 15 beads 15 beads 13 beads 13 beads 10 beads 10 beads 12 beads
To find the unit rate of beads per bracelet, we need to divide the total number of beads by the number of friends she is making bracelets for.
Total number of beads: 156 beads
Number of friends: 12 friends
Unit rate of beads per bracelet = Total number of beads / Number of friends
= 156 beads / 12 friends
Calculating the division:
Unit rate of beads per bracelet = 13 beads
Therefore, the unit rate of beads per bracelet is 13 beads.
Question Justin starts going to a new fitness class. His smart watch tracks a total of 72 active minutes in the week. If he attended the class 3 times, what is the unit rate of active minutes per class?(1 point) Responses 22 minutes 22 minutes 24 minutes 24 minutes 25 minutes 25 minutes 27 minutes
To find the unit rate of active minutes per class, we need to divide the total number of active minutes by the number of classes attended.
Total number of active minutes: 72 minutes
Number of classes attended: 3 classes
Unit rate of active minutes per class = Total number of active minutes / Number of classes
= 72 minutes / 3 classes
Calculating the division:
Unit rate of active minutes per class = 24 minutes
Therefore, the unit rate of active minutes per class is 24 minutes.
Rosie buys her favorite hot chocolate from a hot chocolate shop. She pays $5.00 and gets a 20 oz. cup. What is the unit rate price per ounce for her hot chocolate?(1 point)
To find the unit rate price per ounce for Rosie's hot chocolate, we need to divide the total cost by the number of ounces in the cup.
Total cost: $5.00
Number of ounces in the cup: 20 oz
Unit rate price per ounce = Total cost / Number of ounces
= $5.00 / 20 oz
Calculating the division:
Unit rate price per ounce = $0.25
Therefore, the unit rate price per ounce for Rosie's hot chocolate is $0.25.
Oscar is training to compete in a cross country meet at his school. In a week he runs a total of 7 miles in 84 minutes. What is the unit rate of minutes per mile?(1 point)
To find the unit rate of minutes per mile, we need to divide the total number of minutes by the number of miles.
Total number of minutes: 84 minutes
Number of miles: 7 miles
Unit rate of minutes per mile = Total number of minutes / Number of miles
= 84 minutes / 7 miles
Calculating the division:
Unit rate of minutes per mile = 12 minutes
Therefore, the unit rate of minutes per mile for Oscar's training is 12 minutes.
Valerie buys a new car. She can drive 288 miles on a full tank of gas. If her car holds 16 gallons of gasoline, what is the unit rate of miles per gallon?(1 point)
To find the unit rate of miles per gallon, we need to divide the total number of miles by the number of gallons of gas.
Total number of miles: 288 miles
Number of gallons of gas: 16 gallons
Unit rate of miles per gallon = Total number of miles / Number of gallons
= 288 miles / 16 gallons
Calculating the division:
Unit rate of miles per gallon = 18 miles
Therefore, the unit rate of miles per gallon for Valerie's car is 18 miles.
Liam decides to make a New Year's goal to read more books. One year later, he has read a total of 36 books. What is the unit rate of book per month that he read?(1 point
To find the unit rate of book per month that Liam read, we need to divide the total number of books by the number of months.
Total number of books: 36 books
Number of months: 12 months
Unit rate of books per month = Total number of books / Number of months
= 36 books / 12 months
Calculating the division:
Unit rate of books per month = 3 books
Therefore, the unit rate of books per month that Liam read is 3 books.
The grocery store is having a sale on apples. If you buy 8 pounds and it costs $16.00, what is the unit rate of price per pound?(1 point)
To find the unit rate of price per pound, we need to divide the total cost by the number of pounds.
Total cost: $16.00
Number of pounds: 8 pounds
Unit rate of price per pound = Total cost / Number of pounds
= $16.00 / 8 pounds
Calculating the division:
Unit rate of price per pound = $2.00
Therefore, the unit rate of price per pound for the apples is $2.00.
Find the quotient of 9/10 and 2/3 .(1 point) Responses 18/30 Start Fraction 18 over 30 End Fraction 27/20 Start Fraction 2/7 over 20 End Fraction 30/18 Start Fraction 30 over 18 End Fraction 20/27
To divide fractions, we need to multiply the first fraction by the reciprocal of the second fraction.
The reciprocal of 2/3 is 3/2.
9/10 ÷ 2/3 = 9/10 * 3/2
Multiplying the numerators and denominators:
(9 * 3) / (10 * 2) = 27/20
Therefore, the quotient of 9/10 and 2/3 is 27/20.
What is 3/10÷13?(1 point) Responses 3/30 Start Fraction 3 over 30 End Fraction 10 10 9/10 Start Fraction 9 over 10 End Fraction 10/9
To divide a fraction by a whole number, we can write the whole number as a fraction with a denominator of 1.
3/10 ÷ 13 = 3/10 ÷ 13/1
To divide by a fraction, we can multiply by its reciprocal.
3/10 ÷ 13/1 = 3/10 * 1/13
Multiplying the numerators and denominators:
(3 * 1) / (10 * 13) = 3/130
Therefore, 3/10 ÷ 13 is equal to 3/130.
What is 3/10÷13?(1 point) Responses 3/30 Start Fraction 3 over 30 End Fraction 10 10 9/10 Start Fraction 9 over 10 End Fraction 109
To divide a fraction by a whole number, we can write the whole number as a fraction with a denominator of 1.
3/10 ÷ 13 = 3/10 ÷ 13/1
To divide by a fraction, we can multiply by its reciprocal.
3/10 ÷ 13/1 = 3/10 * 1/13
Multiplying the numerators and denominators:
(3 * 1) / (10 * 13) = 3/130
Therefore, 3/10 ÷ 13 is equal to 3/130.
What is 3/10÷1/3?(1 point) Responses 3/30 Start Fraction 3 over 30 End Fraction 10 10 9/10 Start Fraction 9 over 10 End Fraction 109
To divide a fraction by another fraction, we multiply the first fraction by the reciprocal of the second fraction.
3/10 ÷ 1/3 = 3/10 * 3/1
Multiplying the numerators and denominators:
(3 * 3) / (10 * 1) = 9/10
Therefore, 3/10 ÷ 1/3 is equal to 9/10.
Stacy is painting her bedroom. She is able to paint 3/4 of the bedroom in 3 hours. At this rate, how long will it take her to paint the entire room?(1 point) Responses
To find out how long it will take Stacy to paint the entire room, we can set up a proportion using the ratios of the fraction of the room painted to the time it takes.
The proportion is:
(3/4 of the room) / 3 hours = (1 whole room) / x hours
To solve for x, we can cross multiply:
(3/4) * x = 3 * 1
Multiplying both sides:
3x/4 = 3
To isolate x, we multiply both sides by 4/3:
3x = 4 * 3
3x = 12
Finally, dividing both sides by 3:
x = 12/3
x = 4
Therefore, it will take Stacy 4 hours to paint the entire room.
Miguel is returning from a trip. In 4 hours, he has driven 2/3 of the total distance. He wants to know how long the total drive will take. At this rate, what is the total time it will take him to reach his destination?(1 point)
To find out the total time it will take Miguel to reach his destination, we can set up a proportion using the ratios of the fraction of the distance driven to the time it took.
The proportion is:
(2/3 of the distance) / 4 hours = (1 whole distance) / x hours
To solve for x, we can cross multiply:
(2/3) * x = 4 * 1
Multiplying both sides:
2x/3 = 4
To isolate x, we multiply both sides by 3/2:
2x = 4 * 3
2x = 12
Finally, dividing both sides by 2:
x = 12/2
x = 6
Therefore, it will take Miguel a total of 6 hours to reach his destination.
ris is asked to sweep the gymnasium floor after a basketball game. This requires her to push a sweeper from one end of the gym to the other and repeating the pattern until she has covered the entire floor. She completes 2/3 of the floor in 1/3 of an hour. At this rate, how long will it take her to complete the entire floor?(1 point)
To find out how long it will take Kris to complete the entire floor, we can set up a proportion using the ratios of the fraction of the floor completed to the time it takes.
The proportion is:
(2/3 of the floor) / (1/3 hour) = (1 whole floor) / x hours
To solve for x, we can cross multiply:
(2/3) * x = (1/3) * 1
Multiplying both sides:
2x/3 = 1/3
To isolate x, we multiply both sides by 3/2:
(2x/3) * (3/2) = (1/3) * (3/2)
2x/2 = 1/2
x = 1/2
Therefore, it will take Kris 1/2 hour to complete the entire floor.
Find the quotient of 1/2 and 12/7 .(1 point)
To divide a fraction by another fraction, we multiply the first fraction by the reciprocal of the second fraction.
1/2 ÷ 12/7 = 1/2 * 7/12
Multiplying the numerators and denominators:
(1 * 7) / (2 * 12) = 7/24
Therefore, the quotient of 1/2 and 12/7 is 7/24.