Baker 1 bakes the same number of cookies each hour she works. She baked 1,200 cookies in a 6-hour period of working. Baker 2 bakes 250 cookies each hour. Compare the proportional relationships. Which baker bakes fewer cookies per hour? (1 point)
Baker bakes fewer cookies per hour.
Baker 1 bakes 1,200 cookies in 6 hours, which means 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.
Animal 1 takes 10 steps every minute. Animal 2 takes 22 steps every 2 minutes. Compare these proportional relationships. Which animal takes more steps per minute? (1 point)
Animal
minute.
Animal 1 takes 10 steps every minute.
Animal 2 takes 22 steps every 2 minutes.
To compare the two proportions, we need to determine the steps per minute for Animal 2.
Since Animal 2 takes 22 steps every 2 minutes, we can divide 22 by 2 to find the steps per minute for Animal 2:
22 steps / 2 minutes = 11 steps per minute.
Therefore, Animal 2 takes more steps per minute compared to Animal 1, which takes 10 steps per minute.
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)
144)
Mark as Complete
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 of the two brands.
Unfortunately, the tables that show the prices of buying different amounts of the two brands of sugar are not provided in the question. Therefore, without this information, we cannot calculate how much money per pound Suman will save if he buys the Sweet Sugar brand.
Please provide the necessary information for us to be able to answer the question accurately.
Sweet Sugar
Weight (Ibs.) Price ($)
2.5
0.75
15.0
4.50
30.0
9.00
100.0
30.00
Super Sugar
Weight (Ibs.) Price ($)
3.75
1.16
10.0
3.10
25.0
7.75
110.0
34.10
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 = Price ($) / Weight (lbs.)
For example, for 2.5 lbs of Sweet Sugar, the price per pound would be:
Price per pound = 0.75 / 2.5 = 0.30 ($0.30 per pound)
Similarly, we can calculate the price per pound for all the other weights listed for Sweet Sugar.
We can also do the same calculations for Super Sugar:
For example, for 3.75 lbs of Super Sugar:
Price per pound = 1.16 / 3.75 = 0.31 ($0.31 per pound)
Similarly, we can calculate the price per pound for all the other weights listed for Super Sugar.
By comparing the price per pound for both brands, you can determine how much money per pound Suman will save if he buys the Sweet Sugar brand.
The answer
Apologies for the confusion. 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 of both brands.
For Sweet Sugar:
- Price per pound for 2.5 lbs: 0.75 / 2.5 = $0.30 per pound
- Price per pound for 15.0 lbs: 4.50 / 15.0 = $0.30 per pound
- Price per pound for 30.0 lbs: 9.00 / 30.0 = $0.30 per pound
- Price per pound for 100.0 lbs: 30.00 / 100.0 = $0.30 per pound
For Super Sugar:
- Price per pound for 3.75 lbs: 1.16 / 3.75 = $0.31 per pound
- Price per pound for 10.0 lbs: 3.10 / 10.0 = $0.31 per pound
- Price per pound for 25.0 lbs: 7.75 / 25.0 = $0.31 per pound
- Price per pound for 110.0 lbs: 34.10 / 110.0 = $0.31 per pound
From these calculations, we can see that both brands have the same price per pound, which is $0.30 or $0.31, depending on the weight. Therefore, Suman will not save any money per pound if he buys the Sweet Sugar brand in this scenario.