To convert 4488 gallons to cubic feet, you can use the conversion factor of 1 gallon = 0.133680556 cubic feet.
Thus, 4488 gallons is equal to:
4488 gallons * 0.133680556 cubic feet/gallon = 599.529444928 cubic feet
Therefore, 4488 gallons is approximately equal to 599.53 cubic feet.
4488 gal to ft^3
25 answers
Its gotta be one of these:
A)
44.88 ft3
B)
600 ft3
C)
448.8 ft3
D)
60 ft3
A)
44.88 ft3
B)
600 ft3
C)
448.8 ft3
D)
60 ft3
To convert gallons to cubic feet, you can use the conversion factor of 1 gallon = 0.133680556 cubic feet.
Thus, to convert 4488 gallons to cubic feet:
4488 gallons * 0.133680556 cubic feet/gallon = 599.529444928 cubic feet
Rounded to the nearest whole number, the answer would be option B) 600 ft³.
Thus, to convert 4488 gallons to cubic feet:
4488 gallons * 0.133680556 cubic feet/gallon = 599.529444928 cubic feet
Rounded to the nearest whole number, the answer would be option B) 600 ft³.
Kaitlyn borrowed $16,000 from her mother to buy a car. She will repay the loan at the end of 4 years at 7% interest compounded annually. Find the amount she will repay.
To find the amount Kaitlyn will repay, we can use the formula for compound interest:
A = P(1 + r/n)^(nt)
Where:
A = the future value (the amount to be repaid)
P = the principal amount borrowed ($16,000)
r = the annual interest rate as a decimal (7% = 0.07)
n = the number of times interest is compounded per year (since it's compounded annually, n = 1)
t = the number of years (4)
Plugging in the values into the formula:
A = 16000(1 + 0.07/1)^(1*4)
A = 16000(1 + 0.07)^4
A = 16000(1.07)^4
Calculating:
A ≈ 16000(1.310796)
A ≈ 21,012.72
Therefore, Kaitlyn will repay approximately $21,012.72.
A = P(1 + r/n)^(nt)
Where:
A = the future value (the amount to be repaid)
P = the principal amount borrowed ($16,000)
r = the annual interest rate as a decimal (7% = 0.07)
n = the number of times interest is compounded per year (since it's compounded annually, n = 1)
t = the number of years (4)
Plugging in the values into the formula:
A = 16000(1 + 0.07/1)^(1*4)
A = 16000(1 + 0.07)^4
A = 16000(1.07)^4
Calculating:
A ≈ 16000(1.310796)
A ≈ 21,012.72
Therefore, Kaitlyn will repay approximately $21,012.72.
Answers:
Question 2 options:
A)
$68,480.00
B)
$4972.74
C)
$20,972.74
D)
$23,070.01
Question 2 options:
A)
$68,480.00
B)
$4972.74
C)
$20,972.74
D)
$23,070.01
Apologies for the confusion. The correct answer is option C) $20,972.74.
A tank has a capacity of 25,000 cubic feet. How many gallons of water does the tank hold?
Question 3 options:
A)
108 gal
B)
3342 gal
C)
187,000 gal
D)
25,000 gal
Question 3 options:
A)
108 gal
B)
3342 gal
C)
187,000 gal
D)
25,000 gal
To convert cubic feet to gallons, we can use the conversion factor of 1 cubic foot = 7.48052 gallons.
Thus, to find the number of gallons the tank holds:
25000 cubic feet * 7.48052 gallons/cubic foot = 187,013 gallons
Rounded to the nearest whole number, the answer is option C) 187,000 gallons.
Thus, to find the number of gallons the tank holds:
25000 cubic feet * 7.48052 gallons/cubic foot = 187,013 gallons
Rounded to the nearest whole number, the answer is option C) 187,000 gallons.
110.2°C to degrees Fahrenheit
A)
29.2°F
B)
93.2°F
C)
230.4°F
D)
166.4°F
A)
29.2°F
B)
93.2°F
C)
230.4°F
D)
166.4°F
To convert Celsius to Fahrenheit, you can use the formula:
°F = (°C * 9/5) + 32
Plugging in the given temperature of 110.2°C:
°F = (110.2 * 9/5) + 32
°F = (198.36) + 32
°F ≈ 230.36°F
Rounded to one decimal place, the answer is option C) 230.4°F.
°F = (°C * 9/5) + 32
Plugging in the given temperature of 110.2°C:
°F = (110.2 * 9/5) + 32
°F = (198.36) + 32
°F ≈ 230.36°F
Rounded to one decimal place, the answer is option C) 230.4°F.
Use dimensional analysis to convert the unit indicated.
9 in. to cm
A)
0.28 cm
B)
22.86 cm
C)
0.04 cm
D)
3.54 cm
9 in. to cm
A)
0.28 cm
B)
22.86 cm
C)
0.04 cm
D)
3.54 cm
To convert inches to centimeters, we can use the conversion factor of 2.54 centimeters per inch.
Thus, to convert 9 inches to centimeters:
9 inches * 2.54 centimeters/inch = 22.86 centimeters
Therefore, the answer is option B) 22.86 cm.
Thus, to convert 9 inches to centimeters:
9 inches * 2.54 centimeters/inch = 22.86 centimeters
Therefore, the answer is option B) 22.86 cm.
Solve the problem. Round to the nearest tenth if necessary.
The price of a printer was reduced from $400 to $160. What was the percent of decrease?
Question 6 options:
A)
40%
B)
60%
C)
150%
D)
65%
The price of a printer was reduced from $400 to $160. What was the percent of decrease?
Question 6 options:
A)
40%
B)
60%
C)
150%
D)
65%
To find the percent of decrease, we can use the formula:
Percent decrease = [(original price - new price) / original price] * 100%
Given that the original price was $400 and the new price is $160, we can substitute these values into the formula:
Percent decrease = [($400 - $160) / $400] * 100%
Percent decrease = ($240 / $400) * 100%
Percent decrease = 0.6 * 100%
Percent decrease = 60%
Therefore, the percent of decrease is 60%. The answer is option B).
Percent decrease = [(original price - new price) / original price] * 100%
Given that the original price was $400 and the new price is $160, we can substitute these values into the formula:
Percent decrease = [($400 - $160) / $400] * 100%
Percent decrease = ($240 / $400) * 100%
Percent decrease = 0.6 * 100%
Percent decrease = 60%
Therefore, the percent of decrease is 60%. The answer is option B).
Use the multiplication principle of equality to eliminate the fractions or decimals; then solve.
-11q = -88.2 - 1.2q
Question 7 options:
A)
9
B)
8.1
C)
-98
D)
8.0
-11q = -88.2 - 1.2q
Question 7 options:
A)
9
B)
8.1
C)
-98
D)
8.0
To eliminate the fractions or decimals in the equation -11q = -88.2 - 1.2q, we can multiply the entire equation by a common multiple of the denominators. In this case, we can multiply by 10 to eliminate the decimals:
-11q * 10 = -88.2 * 10 - 1.2q * 10
-110q = -882 - 12q
Next, we can combine the like terms by adding 12q to both sides of the equation:
-110q + 12q = -882
-98q = -882
Finally, we can solve for q by dividing both sides of the equation by -98:
q = (-882) / (-98)
q = 9
Therefore, the solution to the equation is q = 9. The answer is option A).
-11q * 10 = -88.2 * 10 - 1.2q * 10
-110q = -882 - 12q
Next, we can combine the like terms by adding 12q to both sides of the equation:
-110q + 12q = -882
-98q = -882
Finally, we can solve for q by dividing both sides of the equation by -98:
q = (-882) / (-98)
q = 9
Therefore, the solution to the equation is q = 9. The answer is option A).
Solve the problem. Assume that simple interest is being calculated in each case. Round your answer to the nearest cent.
John Lee's savings account has a balance of $4682. After 30 months, what will the amount of interest be at 5.2% per year?
Question 8 options:
A)
$243.46
B)
$608.66
C)
$273.47
D)
$156.07
John Lee's savings account has a balance of $4682. After 30 months, what will the amount of interest be at 5.2% per year?
Question 8 options:
A)
$243.46
B)
$608.66
C)
$273.47
D)
$156.07
To calculate the amount of interest, we can use the formula for simple interest:
Interest = Principal * Rate * Time
Given:
Principal (P) = $4682
Rate (R) = 5.2% per year = 5.2/100 = 0.052 (decimal)
Time (T) = 30 months = 30/12 = 2.5 years
Plugging in the values into the formula:
Interest = $4682 * 0.052 * 2.5
Interest ≈ $608.65
Rounded to the nearest cent, the amount of interest will be approximately $608.66.
Therefore, the answer is option B) $608.66.
Interest = Principal * Rate * Time
Given:
Principal (P) = $4682
Rate (R) = 5.2% per year = 5.2/100 = 0.052 (decimal)
Time (T) = 30 months = 30/12 = 2.5 years
Plugging in the values into the formula:
Interest = $4682 * 0.052 * 2.5
Interest ≈ $608.65
Rounded to the nearest cent, the amount of interest will be approximately $608.66.
Therefore, the answer is option B) $608.66.
Solve the problem. Assume that simple interest is being calculated in each case. Round your answer to the nearest cent.
Allan borrowed $5800 from his father to buy a car. He repaid him after 7 months with interest of 10% per year. Find the total amount he repaid.
Question 9 options:
A)
$338.33
B)
$6090.00
C)
$6380.00
D)
$6138.33
Allan borrowed $5800 from his father to buy a car. He repaid him after 7 months with interest of 10% per year. Find the total amount he repaid.
Question 9 options:
A)
$338.33
B)
$6090.00
C)
$6380.00
D)
$6138.33
To calculate the total amount Allan repaid, we need to add the principal amount borrowed to the interest he paid.
Given:
Principal (P) = $5800
Rate (R) = 10% per year = 10/100 = 0.1 (decimal)
Time (T) = 7 months = 7/12 = 0.5833 (in years)
To calculate the interest, we use the formula:
Interest = Principal * Rate * Time
Interest = $5800 * 0.1 * 0.5833
Interest ≈ $338.32
To find the total amount repaid, we add the principal and interest together:
Total amount repaid = Principal + Interest
Total amount repaid ≈ $5800 + $338.32
Total amount repaid ≈ $6138.32
Therefore, the answer is option D) $6138.33.
Given:
Principal (P) = $5800
Rate (R) = 10% per year = 10/100 = 0.1 (decimal)
Time (T) = 7 months = 7/12 = 0.5833 (in years)
To calculate the interest, we use the formula:
Interest = Principal * Rate * Time
Interest = $5800 * 0.1 * 0.5833
Interest ≈ $338.32
To find the total amount repaid, we add the principal and interest together:
Total amount repaid = Principal + Interest
Total amount repaid ≈ $5800 + $338.32
Total amount repaid ≈ $6138.32
Therefore, the answer is option D) $6138.33.
Solve the problem.
From a point on a straight road, two cars are driven in opposite directions, one at 25 miles per hour and the other at 24 miles per hour. In how many hours will they be 245 miles apart?
Question 10 options:
A)
4 hours
B)
Not enough information
C)
5 hours
D)
6 hours
From a point on a straight road, two cars are driven in opposite directions, one at 25 miles per hour and the other at 24 miles per hour. In how many hours will they be 245 miles apart?
Question 10 options:
A)
4 hours
B)
Not enough information
C)
5 hours
D)
6 hours
To find the time it takes for the two cars to be 245 miles apart, we can use the formula for distance:
Distance = Rate * Time
Let's denote the time it takes for this distance to be covered as t.
For the first car traveling at 25 miles per hour:
Distance covered by the first car = 25t
For the second car traveling at 24 miles per hour:
Distance covered by the second car = 24t
Since they are traveling in opposite directions, the sum of their distances will be equal to the total distance between them, which is 245 miles:
25t + 24t = 245
49t = 245
t = 245 / 49
t = 5
Therefore, it will take 5 hours for the two cars to be 245 miles apart. The answer is option C) 5 hours.
Distance = Rate * Time
Let's denote the time it takes for this distance to be covered as t.
For the first car traveling at 25 miles per hour:
Distance covered by the first car = 25t
For the second car traveling at 24 miles per hour:
Distance covered by the second car = 24t
Since they are traveling in opposite directions, the sum of their distances will be equal to the total distance between them, which is 245 miles:
25t + 24t = 245
49t = 245
t = 245 / 49
t = 5
Therefore, it will take 5 hours for the two cars to be 245 miles apart. The answer is option C) 5 hours.
Solve the problem. Round your answer to the nearest cent.
Sumi Kato's savings account has a balance of $2363. After 11 years what will the amount of interest be at 2.5% compounded annually?
Question 12 options:
A)
$743.46
B)
$726.46
C)
$2599.30
D)
$737.46
Sumi Kato's savings account has a balance of $2363. After 11 years what will the amount of interest be at 2.5% compounded annually?
Question 12 options:
A)
$743.46
B)
$726.46
C)
$2599.30
D)
$737.46
To calculate the amount of interest, we can use the formula for compound interest:
A = P(1 + r/n)^(nt) - P
Where:
A = the future value (the amount including the interest)
P = the principal amount ($2363)
r = the annual interest rate as a decimal (2.5% = 0.025)
n = the number of times interest is compounded per year (since it's compounded annually, n = 1)
t = the number of years (11)
Plugging in the values into the formula:
A = 2363(1 + 0.025/1)^(1*11) - 2363
A = 2363(1.025)^11 - 2363
Calculating:
A ≈ 2363(1.317472)
A ≈ 3108.62
To find the amount of interest, we subtract the principal from the future value:
Interest = A - P = 3108.62 - 2363 ≈ $745.62
Rounded to the nearest cent, the amount of interest will be approximately $745.62.
Therefore, the answer is not provided in the given options.
A = P(1 + r/n)^(nt) - P
Where:
A = the future value (the amount including the interest)
P = the principal amount ($2363)
r = the annual interest rate as a decimal (2.5% = 0.025)
n = the number of times interest is compounded per year (since it's compounded annually, n = 1)
t = the number of years (11)
Plugging in the values into the formula:
A = 2363(1 + 0.025/1)^(1*11) - 2363
A = 2363(1.025)^11 - 2363
Calculating:
A ≈ 2363(1.317472)
A ≈ 3108.62
To find the amount of interest, we subtract the principal from the future value:
Interest = A - P = 3108.62 - 2363 ≈ $745.62
Rounded to the nearest cent, the amount of interest will be approximately $745.62.
Therefore, the answer is not provided in the given options.