All SAT Math Resources
Example Questions
Example Question #10 : How To Find The Part From The Whole With Percentage
What is 16% of 32?
There are two ways to solve this problem.
First, we can convert the given percentage to a decimal and multiple by the whole.
16% = 0.16
Secondly, we could set up a proportion. We are given the whole from which a percentage is taken, so we can say:
To solve, cross multiply and simplify.
Example Question #33 : Percentage
An artist's new album sold copies on its release date. If the U.S. makes up of these sales, how many copies were sold on that day in the U.S.?
Let's set up a proportion to solve this problem, where represents the number of copies sold in the U.S. Remember that we can express as a fraction.
Now, we can solve for the unknown by cross-multiplying.
Example Question #11 : Whole And Part
Jane called one thousand times to tell you she's sorry. If you saw she was calling and let your phone go to voicemail of the time, how many voicemails would you have received if she left one each time?
None of the given answers
To solve this problem, we can set up a proportion. Remember we can express percentages as fractions. Let represent the number of voicemails.
Now, we can cross-multiply and solve for the unknown.
Example Question #11 : Whole And Part
is what percentage of
Cannot be determined
To solve this we need to set up a proportion.
Now we cross multiply
Divide by 180.
Example Question #1 : How To Find The Whole From The Part With Percentage
David's trip expenses are pictured in the above pie chart (numbers = % of his total expenses). If he spent $75 on taxis, how much did he spend on hotel and souvenirs combined?
$225
$40
$200
$175
$250
$200
David spent $75 on taxis, which were 15% of his total expenses on the trip. He therefore spent 75(100/15) = $500 on the trip altogether. The hotel and souvenirs make up 35% + 5% = 40% of his total expenses. 40% of 500 is $200.
Example Question #72 : Percentage
30% of what number is 20?
Solve to the nearest hundredth.
1.5
None of the other answers
66.67
0.67
150%
66.67
This is a very basic form percentage question. This can be rewritten:
0.3 * x = 20
(Remember, the word "of" in a word problem indicates multiplication, while the word "is" indicates an equals sign).
Solve for x: x = 20 / 0.3 = 66.67
Example Question #2 : How To Find The Whole From The Part With Percentage
A toy is on sale for 43% off. Its sale price is $21.37. What is the full price?
None of the available answers
An algebraic expression for this item is:
Example Question #3 : How To Find The Whole From The Part With Percentage
Twenty-six students planned to contribute an equal amount to purchase a gift for their teacher. After 18 students had paid, they had collected $76.50. What is the total price of the gift?
If $76.50 had been collected after 18 students had paid, we can determine how much each student contributed:
$76.50/18 = $4.25 per student
Now we can multiply this by the total number of students (26) to get the full price of the gift:
26 x $4.25 = $110.50
Example Question #81 : Percentage
If of is , then what is of ?
50
200
100
20
10
50
The first part of the problem tells us that x% of 20 is 50. We can model x% as x/100 or 0.01x. To find x% of 20, we can multiply 0.01x and 20. In other words, we can write the following equation:
(0.01x)(20) = 50
Divide both sides by 20.
0.01x = 2.5
Divide both sides by 0.01.
x = 250.
The question then asks us to find 20% of x. We can represent 20% as 0.2, and we know that x is 250. Therefore,
20% of 250 = 0.2(250) = 50.
The answer is 50.
Example Question #82 : Percentage
If of a number is , what is of the number?
Let x be the number in question.
Then 2/3 * x = 18.
x = 18 * 3/2 = 27
Now find 1/9 of 27:
1/9 * 27 = 3
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