Sweet Sugar
Weight (lbs.) Price ($)
2.5 0.75
15.0 4.50
30.0 9.00
100.0 30.00
Super Sugar
Weight (lbs.) Price ($)
3.75 1.16
10.0 3.10.
25.0 7.75
110.0 34.10
Based on the tables showing the price of buying different amounts of two brands of sugar, Suman determined that Sweet Sugar was the better buy based on price alone. How much money per pound will Suman save if he buys the Sweet Sugar brand?(1 point)Suman will save $− per pound if he buys the Sweet Sugar brand.
To determine how much money per pound Suman will save if he buys the Sweet Sugar brand, we need to compare the prices per pound for both brands.
For Sweet Sugar:
Price per pound = Total price / Total weight
= $30.00 / 100.0 lbs
= $0.30 per pound
For Super Sugar:
Price per pound = Total price / Total weight
= $34.10 / 110.0 lbs
= $0.31 per pound
The price per pound for Sweet Sugar is $0.30 and for Super Sugar is $0.31.
Therefore, Suman will save $0.31 - $0.30 = $0.01 per pound if he buys the Sweet Sugar brand.
THX OMG
You're welcome! If you have any more questions, feel free to ask.
Go Gas
Gallons of Gas Miles Driven
5.5 170.5
10.2 316.2
12.0 372.0
14.5 449.5
Good Gas
Gallons of Gas Miles Driven
3.75 127.5
9.4 319.6
12.6 428.4
16.0 544.0
Based on the tables showing the number of miles driven per gallon of gas for two leading gas brands, Gabi determines that she should buy Good Gas instead of Go Gas. How many more miles per gallon can she go if she uses gas from Good Gas for her car?(1 point)Gabi can go ---- more miles per gallon if she uses gas from Good Gas for her car.
To determine how many more miles per gallon Gabi can go if she uses gas from Good Gas instead of Go Gas, we need to compare the miles driven per gallon for both brands.
For Go Gas:
Miles per gallon = Miles driven / Gallons of gas
= 170.5 / 5.5
= 31 miles per gallon
For Good Gas:
Miles per gallon = Miles driven / Gallons of gas
= 127.5 / 3.75
= 34 miles per gallon
The miles per gallon for Go Gas is 31 and for Good Gas is 34.
Therefore, Gabi can go 34 - 31 = 3 more miles per gallon if she uses gas from Good Gas for her car.
A bean plant grows 2 inches in 2 days. A strawberry plant grows 4 inches in 5 days. Compare the two proportional relationships. Assume each plant is growing at a constant rate.
(1 point)Responses:
The strawberry plant has grown 2 inches more than the bean plant.
The strawberry plant has grown 2 inches more than the bean plant.
The bean plant grows at a slower rate because it grows 2 inches while the strawberry plant grows 4 inches.
The bean plant grows at a slower rate because it grows 2 inches while the strawberry plant grows 4 inches.
The strawberry plant grows at a slower rate because it grows 0.8 inches per day while the bean plant grows 1 inch per day.
The strawberry plant grows at a slower rate because it grows 0.8 inches per day while the bean plant grows 1 inch per day.
Both plants are growing every day.
The correct response is:
The strawberry plant has grown 2 inches more than the bean plant.
Last week, Malika’s cat slept 18 hours each day. Her baby slept 91 hours total for the week. Compare the proportional relationship of the number of hours the cat and baby sleep each day.
(1 point)Responses:
The baby slept fewer hours per day than the cat.
The cat and the baby slept the same amount of hours total for the week.
The cat slept fewer hours per day than the baby.
Both the cat and the baby spend less than half the hours of the day sleeping.
To compare the proportional relationship of the number of hours the cat and baby sleep each day, we need to calculate the average number of hours slept per day for each.
For the cat:
Average hours slept per day = Total hours slept / Number of days
= 18 hours / 7 days
= 2.57 hours per day
For the baby:
Average hours slept per day = Total hours slept / Number of days
= 91 hours / 7 days
= 13 hours per day
The average hours slept per day for the cat is 2.57 hours, while for the baby it is 13 hours.
Therefore, the baby slept more hours per day than the cat. Thus, the correct response is:
The baby slept more hours per day than the cat.
Last week, Malika’s cat slept 18 hours each day. Her baby slept 91 hours total for the week. Compare the proportional relationship of the number of hours the cat and baby sleep each day.
(1 point)Responses:
The baby slept fewer hours per day than the cat.
The cat and the baby slept the same amount of hours total for the week.
The cat slept fewer hours per day than the baby.
Both the cat and the baby spend less than half the hours of the day sleeping.
CHOOSE ONE