All SAT Math Resources
Example Questions
Example Question #11 : Statistics
In a certain class, there are are 12 girls and 17 boys. If the average (arithmetic mean) height of the girls is g and the average (arithmetic mean) height of the boys is b, what is the average height of all of the girls and boys in the class?
(12g+17b)/29
29bg
b+g
(b+g)/2
(b+g)/29
(12g+17b)/29
Averages are calculated by the formula: TOTAL SUM FOR THE GROUP/ NUMBER OF ELEMENTS IN THE GROUP. We are told that the average for the 12 girls is g and the average for the 17 boys is b. Our formula for averages tells us that g = TOTAL SUM OF GIRLS’ HEIGHTS / 12 and that b = TOTAL SUM OF BOYS’ HEIGHTS / 17. Rearranging the terms, we see that the TOTAL SUM OF GIRLS’ HEIGHTS = 12g and the TOTAL SUM OF BOYS’ HEIGHTS =17b.
Again using our formula for averages, we see that the average height of all of the boys and girls in the class is given by the TOTAL HEIGHT FOR ALL BOYS AND GIRLS / TOTAL NUMBER OF BOYS AND GIRLS. We know the total height for all boys and girls will be the sum of the total girls' height and the total boys' height, or 12g +17b, and we know that the total number of boys and girls in the class is 12+17=29. Therefore, the average height for all boys and girls in the class is (12g +17b)/29.
Example Question #12 : Data Analysis
If the average (arithmetic mean) of four consecutive odd integers is 32, what is the value of the least of the four integers?
27
33
31
21
29
Example Question #11 : Arithmetic Mean
A class has test results of 98, 86, 72, 88, and 92. What score does Angie have to get on the test in order to make the average a 85?
74
63
60
87.2
90
74
With Angie's score there will be 6 total scores. 60*85(the average) gives a sum of scores as 510. Subtracting the scores of the other students gives a difference of 74. This means that Angie must score a 74 to have the class average be 85.
Example Question #11 : Statistics
If Mary traveled 116 miles on day 1, 130 miles on day 2, 114 miles on day 3. How many miles per day did she average?
120
114
118
116
115
120
To find an average you add all the values and divide by the number of values. 116+114+130 = 360. 360/3 = 120
Example Question #14 : Statistics
The mean of 12, 14, 18, 20, and x is equal to 14. Solve for x.
12
5
14
20
6
6
- Set up an equation to find the mean (or average) of the series of numbers. (x + 64)/5 = 14 (64 = 12 + 14 + 18 + 20)
- In order to solve for x, first multiply both sides by 5
- x + 64 = 70
- Subtract 64 from both sides.
- x = 6.
Example Question #12 : Arithmetic Mean
The St. Louis area has the following weather:
Monday High Temperature 76 Low Temperature 51
Tuesday High Temperature 82 Low Temperature 62
Wednesday High Temperature 67 Low Temperature 37
What is the difference between the high temperature average and the low temperature average over the three days?
50
65
75
40
25
25
Average = sum of data points ÷ number of data points
High temperature average = (76 + 82 + 67) ÷ 3 = 75
Low temperature average = (51 + 62 + 37) ÷ 3 = 50
The difference between the two averages is 25.
Example Question #15 : Statistics
In the following set of numbers, the arithmetic mean exceeds the mode by how much?
{2, 2, 4, 8, 10, 12, 20, 30}
9
2
8
6
4
9
The arithmetic mean is defined as:
The sum of a list of values divided by the number of values in the list.
Therefore for this problem, the arithmetic mean is:
(2+2+4+8+10+12+20+30) / 8 = (88/8) = 11
The mode is defined as the value that occurs the greatest number of times in a list of values.
In this case, it would be 2.
Therefore, the arithmetic mean (11) exceeds the mode (2) by 9.
Example Question #11 : Statistics
The average for 24 students on a test is 81%. Two more students take the test, averaging 74% between the two of them. What is the total class average (to the closest hundreth) if these two students are added to the 24?
80.46%
77.44%
77.5%
79.12%
81.22%
80.46%
The easiest way to solve this is to consider the total scores as follows:
Group 1: 81 * 24 = 1944
Group 2: 74 * 2 = 148
Therefore, the total percentage points earned for the class is 148 + 1944 = 2092. The new class average will be 2092/26 or 80.46. (For our purposes, this is 80.46%.)
Example Question #21 : How To Find Arithmetic Mean
Twenty students scored an average of 83% on a test. After three more took the exam, the class average was exactly 84%. Which of the following is a possible set of scores for these three students?
72%, 90%, 98%
92%, 96%, and 98%
84%, 92%, and 96%
88%, 92%, 100%
None of the other answers
84%, 92%, and 96%
Let's think of the exams in terms of 100 points for a 100%. This means that the first 20 students received 20 * 83 or 1660 points.
Now, we must figure out how many points would be necessary for 23 students to have an average of exactly 84%. That would be found using the equation for a mean:
x / 23 = 84 → x = 1932
That means that our 3 students had to get a total of 1932 – 1660, or 272 points. The only answer that matches that among our answers is 84%, 92%, and 96%.
Example Question #2971 : Sat Mathematics
If a = 2b = 4c = 8d, what is the average of a, b, c, and d, in terms of a?
15a/32
19a/4
15a/16
4a
a/8
15a/32
Convert each term, so a = a, b = a/2, c = a/4, and d = a/8
so then the average would be (a + a/2 + a/4 + a/8)/4
= (8a/8 + 4a/8 + 2a/8 + a/8)/4
= (15a/8)/4 = 15a/32