Baker 1 bakes 1,200 cookies in 6 hours, so she bakes 1,200/6 = <<1200/6=200>>200 cookies per hour.
Baker 2 bakes 250 cookies per hour.
Therefore, Baker 1 bakes fewer cookies per hour than Baker 2.
Baker bakes fewer cookies per hour.
Baker 2 bakes 250 cookies per hour.
Therefore, Baker 1 bakes fewer cookies per hour than Baker 2.
(1 point)
Suman will save $ per pound if he buys the Sweet Sugar brand.
Since the specific prices are not given, I'm unable to provide a specific answer. But the formula to calculate the savings per pound would be:
Savings per pound = Price per pound of Brand B - Price per pound of Brand A
Using the given information from the tables, you can calculate the price per pound for each brand and then find the difference to determine the savings.
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.
For Sweet Sugar:
Price per pound (2.5 lbs) = 0.75 / 2.5 = 0.30 $
Price per pound (15 lbs) = 4.50 / 15 = 0.30 $
Price per pound (30 lbs) = 9.00 / 30 = 0.30 $
Price per pound (100 lbs) = 30.00 / 100 = 0.30 $
For Super Sugar:
Price per pound (3.75 lbs) = 1.16 / 3.75 ≈ 0.31 $
Price per pound (10 lbs) = 3.10 / 10 = 0.31 $
Price per pound (25 lbs) = 7.75 / 25 = 0.31 $
Price per pound (110 lbs) = 34.10 / 110 ≈ 0.31 $
From the calculations, we can see that both brands have a price of approximately $0.30 per pound. Therefore, Suman will not save any money per pound if he buys the Sweet Sugar brand compared to the Super Sugar brand.
For Sweet Sugar:
Price per pound (2.5 lbs) = 0.75 / 2.5 = 0.30 $
Price per pound (15 lbs) = 4.50 / 15 = 0.30 $
Price per pound (30 lbs) = 9.00 / 30 = 0.30 $
Price per pound (100 lbs) = 30.00 / 100 = 0.30 $
For Super Sugar:
Price per pound (3.75 lbs) = 1.16 / 3.75 ≈ 0.31 $
Price per pound (10 lbs) = 3.10 / 10 = 0.31 $
Price per pound (25 lbs) = 7.75 / 25 = 0.31 $
Price per pound (110 lbs) = 34.10 / 110 ≈ 0.31 $
From the calculations, we can see that the price per pound for both brands is approximately $0.30. Therefore, Suman will not save any money per pound, as the prices are the same for both brands.
For Go Gas:
Miles per gallon (5.5 gallons) = 170.5 / 5.5 ≈ 31 miles per gallon
Miles per gallon (10.2 gallons) = 316.2 / 10.2 ≈ 31 miles per gallon
Miles per gallon (12.0 gallons) = 372.0 / 12.0 = 31 miles per gallon
Miles per gallon (14.5 gallons) = 449.5 / 14.5 ≈ 31 miles per gallon
For Good Gas:
Miles per gallon (3.75 gallons) = 127.5 / 3.75 ≈ 34 miles per gallon
Miles per gallon (9.4 gallons) = 319.6 / 9.4 ≈ 34 miles per gallon
Miles per gallon (12.6 gallons) = 428.4 / 12.6 ≈ 34 miles per gallon
Miles per gallon (16.0 gallons) = 544.0 / 16.0 = 34 miles per gallon
From the calculations, we can see that Good Gas provides approximately 34 miles per gallon, while Go Gas provides approximately 31 miles per gallon.
Therefore, Gabi can go approximately 3 more miles per gallon if she uses gas from Good Gas for her car compared to Go Gas.