Which ratio is equivalent to this one?
2/3
Select the correct answer.
Question 1 options:
6:9
3:6
6:10
25 answers
The correct answer is 6:9.
Solve the problem.
The bank offers two kinds of checking accounts. Account A charges a fee of $.20 for each check that is written and has no monthly service charge. Account B charges $.10 for each check and has a monthly service charge of $1.50. Which account would cost less if a person were to write 20 checks in a month?
Select the correct answer.
Question 2 options:
Account A
Account B
The bank offers two kinds of checking accounts. Account A charges a fee of $.20 for each check that is written and has no monthly service charge. Account B charges $.10 for each check and has a monthly service charge of $1.50. Which account would cost less if a person were to write 20 checks in a month?
Select the correct answer.
Question 2 options:
Account A
Account B
To determine which account would cost less if a person were to write 20 checks in a month, we need to calculate the total cost for each account.
For Account A:
Total cost = (number of checks) * (cost per check)
Total cost = 20 * $0.20 = $4.00
For Account B:
Total cost = (number of checks) * (cost per check) + (monthly service charge)
Total cost = (20 * $0.10) + $1.50 = $2.00 + $1.50 = $3.50
Therefore, Account B would cost less if a person were to write 20 checks in a month.
For Account A:
Total cost = (number of checks) * (cost per check)
Total cost = 20 * $0.20 = $4.00
For Account B:
Total cost = (number of checks) * (cost per check) + (monthly service charge)
Total cost = (20 * $0.10) + $1.50 = $2.00 + $1.50 = $3.50
Therefore, Account B would cost less if a person were to write 20 checks in a month.
Which ratio is equivalent to this one?
9/10
Select the correct answer.
Question 3 options:
18:20
16:20
19:20
9/10
Select the correct answer.
Question 3 options:
18:20
16:20
19:20
The correct answer is 18:20.
Write this ratio another way.
11 over 12
Type the correct answer.
11 over 12
Type the correct answer.
The ratio "11 over 12" can be written as:
11:12
11:12
Write this ratio another way.
11\ 12
Type the correct answer.
11\ 12
Type the correct answer.
The ratio "11 over 12" can also be written as:
11/12
11/12
Write this ratio another way.
11
----
12
Type the correct answer.
11
----
12
Type the correct answer.
The ratio "11 over 12" can also be written as:
11:12
11:12
Question 5 options:
Solve the problem.
Use the calorie chart to determine how many calories Macy consumed when she drank 1/2 a cup of milk with her breakfast.
Calories Macy's Breakfast
1 banana 100 1/2 banana
8 oz. orange juice 100 6 oz. orange juice
1 cup corn flakes 112 3/4 cup corn flakes
3/4 cup milk 126 1/2 cup milk
Blank Space__________calories
Solve the problem.
Use the calorie chart to determine how many calories Macy consumed when she drank 1/2 a cup of milk with her breakfast.
Calories Macy's Breakfast
1 banana 100 1/2 banana
8 oz. orange juice 100 6 oz. orange juice
1 cup corn flakes 112 3/4 cup corn flakes
3/4 cup milk 126 1/2 cup milk
Blank Space__________calories
To determine the number of calories Macy consumed when she drank 1/2 a cup of milk, we can look at the information given in the chart:
1/2 cup milk: ??? calories
From the chart, we can see that 3/4 cup milk has 126 calories.
To find out how many calories there are in 1/2 cup of milk, we can set up a proportion:
(3/4 cup milk) / (126 calories) = (1/2 cup milk) / (x calories)
Cross-multiplying, we have:
(3/4 cup milk) * (x calories) = (1/2 cup milk) * (126 calories)
Simplifying the equation, we get:
3 * x = 63
Dividing both sides by 3, we find:
x = 21
Therefore, 1/2 cup of milk contains 21 calories.
1/2 cup milk: ??? calories
From the chart, we can see that 3/4 cup milk has 126 calories.
To find out how many calories there are in 1/2 cup of milk, we can set up a proportion:
(3/4 cup milk) / (126 calories) = (1/2 cup milk) / (x calories)
Cross-multiplying, we have:
(3/4 cup milk) * (x calories) = (1/2 cup milk) * (126 calories)
Simplifying the equation, we get:
3 * x = 63
Dividing both sides by 3, we find:
x = 21
Therefore, 1/2 cup of milk contains 21 calories.
Solve the problem.
Betty's Bakery sells doughnut holes at $2.00 for 5 boxes. Shari's Sweets sells 6 boxes of doughnut holes for $2.30. Which store has the better buy?
Betty's Bakery sells doughnut holes at $2.00 for 5 boxes. Shari's Sweets sells 6 boxes of doughnut holes for $2.30. Which store has the better buy?
To determine which store has the better buy, we need to compare the prices per box of doughnut holes at each store.
Betty's Bakery:
Cost of 5 boxes = $2.00
Price per box = $2.00 / 5 = $0.40 per box
Shari's Sweets:
Cost of 6 boxes = $2.30
Price per box = $2.30 / 6 ≈ $0.3833 per box (rounded to four decimal places)
Comparing the price per box, we can see that Betty's Bakery sells doughnut holes for $0.40 per box, while Shari's Sweets sells them for approximately $0.3833 per box. Therefore, Betty's Bakery has the better buy since they offer a lower price per box of doughnut holes.
Betty's Bakery:
Cost of 5 boxes = $2.00
Price per box = $2.00 / 5 = $0.40 per box
Shari's Sweets:
Cost of 6 boxes = $2.30
Price per box = $2.30 / 6 ≈ $0.3833 per box (rounded to four decimal places)
Comparing the price per box, we can see that Betty's Bakery sells doughnut holes for $0.40 per box, while Shari's Sweets sells them for approximately $0.3833 per box. Therefore, Betty's Bakery has the better buy since they offer a lower price per box of doughnut holes.
Solve the problem.
Use the calorie chart to determine how many calories Macy consumed when she ate 1/2 of a banana.
Calories Macy's Breakfast
1 banana 100 1/2 banana
8 oz. orange juice 100 6 oz. orange juice
1 cup corn flakes 112 3/4 cup corn flakes
3/4 cup milk 126 1/2 cup milk
Blank Space__________calories
Use the calorie chart to determine how many calories Macy consumed when she ate 1/2 of a banana.
Calories Macy's Breakfast
1 banana 100 1/2 banana
8 oz. orange juice 100 6 oz. orange juice
1 cup corn flakes 112 3/4 cup corn flakes
3/4 cup milk 126 1/2 cup milk
Blank Space__________calories
To determine the number of calories Macy consumed when she ate 1/2 of a banana, we can look at the information given in the chart:
1/2 banana: ??? calories
From the chart, we can see that 1 banana has 100 calories.
To find out how many calories there are in 1/2 of a banana, we can set up a proportion:
(1 banana) / (100 calories) = (1/2 banana) / (x calories)
Cross-multiplying, we have:
(1 banana) * (x calories) = (1/2 banana) * (100 calories)
Simplifying the equation, we get:
x = 100/2
x = 50
Therefore, 1/2 of a banana contains 50 calories.
1/2 banana: ??? calories
From the chart, we can see that 1 banana has 100 calories.
To find out how many calories there are in 1/2 of a banana, we can set up a proportion:
(1 banana) / (100 calories) = (1/2 banana) / (x calories)
Cross-multiplying, we have:
(1 banana) * (x calories) = (1/2 banana) * (100 calories)
Simplifying the equation, we get:
x = 100/2
x = 50
Therefore, 1/2 of a banana contains 50 calories.
Question 8 options:
Solve the problem.
Carlos wants to have an enlargement made of a photo he took at Niagara Falls. The negative is 1.5 centimeters by 2.2 centimeters. What will the width of the enlargement be if its length is 22 centimeters?
Blank Space__________centimeters
Solve the problem.
Carlos wants to have an enlargement made of a photo he took at Niagara Falls. The negative is 1.5 centimeters by 2.2 centimeters. What will the width of the enlargement be if its length is 22 centimeters?
Blank Space__________centimeters
To determine the width of the enlargement, we can set up a proportion using the dimensions of the negative:
Width of negative: 1.5 centimeters
Length of negative: 2.2 centimeters
Width of enlargement: ??? centimeters
Length of enlargement: 22 centimeters
We can set up the following proportion:
(Width of negative) / (Length of negative) = (Width of enlargement) / (Length of enlargement)
Substituting the given values, we have:
1.5 / 2.2 = (Width of enlargement) / 22
Cross-multiplying, we get:
1.5 * 22 = 2.2 * (Width of enlargement)
33 = 2.2 * (Width of enlargement)
To solve for the width of the enlargement, we divide both sides by 2.2:
Width of enlargement = 33 / 2.2
Width of enlargement ≈ 15
Therefore, the width of the enlargement will be approximately 15 centimeters.
Width of negative: 1.5 centimeters
Length of negative: 2.2 centimeters
Width of enlargement: ??? centimeters
Length of enlargement: 22 centimeters
We can set up the following proportion:
(Width of negative) / (Length of negative) = (Width of enlargement) / (Length of enlargement)
Substituting the given values, we have:
1.5 / 2.2 = (Width of enlargement) / 22
Cross-multiplying, we get:
1.5 * 22 = 2.2 * (Width of enlargement)
33 = 2.2 * (Width of enlargement)
To solve for the width of the enlargement, we divide both sides by 2.2:
Width of enlargement = 33 / 2.2
Width of enlargement ≈ 15
Therefore, the width of the enlargement will be approximately 15 centimeters.
Question 9 options:
Write this ratio another way.
120 \ 150
Type the correct answer.
Write this ratio another way.
120 \ 150
Type the correct answer.
The ratio "120 over 150" can also be written as:
120/150
120/150
Question 9 options:
Write this ratio another way.
120 over 150
Type the correct answer.
Write this ratio another way.
120 over 150
Type the correct answer.
The ratio "120 over 150" can also be written as:
120:150
120:150
Question 10 options:
Find the unit rate.
800 people per 20 square miles
Blank Space__________people per square mile
Find the unit rate.
800 people per 20 square miles
Blank Space__________people per square mile
To find the unit rate, we divide the given quantity by the denominator. In this case, we divide 800 people by 20 square miles:
Unit rate = 800 people / 20 square miles
Simplifying the division, we get:
Unit rate = 40 people per square mile
Therefore, the unit rate is 40 people per square mile.
Unit rate = 800 people / 20 square miles
Simplifying the division, we get:
Unit rate = 40 people per square mile
Therefore, the unit rate is 40 people per square mile.