SAT Math Multiple Choice Practice Test 17

Test Information 22 questions 26 minutes

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SAT math multiple choice practice test 17. This test contains 22 SAT math problem solving questions with detailed explanations. This SAT math problem solving practice test is provided by cracksat.net.

1. If , what is the value of x?

A. 3
B. 7
C. 11
D. 17
E. 25

2. Erica spends \$.95 each day for her newspaper subscriptions. She would like to determine the approximate amount she spends during the month of July, which has 31 days. Which of the following would provide her with the best estimate?

A. \$.50 × 30
B. \$1.00 × 30
C. \$1.50 × 30
D. \$.50 × 35
E. \$1.00 × 35

3. In the figure above, lines l, m, and n intersect in a single point. What is the value of w + x?

A. 40
B. 70
C. 90
D. 130
E. 140

4. Let the function g be defined by the equation . What is the value of g (5)?

A. 8
B. 11
C. 15
D. 19
E. 23

5. If , which of the following equations expresses the fact that when the difference between x and y is multiplied by their sum, the product is 18?

A. B. C. D. E. 6. If , what is the value of x?

A. 3
B. 9
C. 27
D. 36
E. 81

7. Chris buys a chocolate bar and a pack of gum for \$1.75. If the chocolate bar costs \$.25 more than the pack of gum, how much does the pack of gum cost?

A. \$.25
B. \$.50
C. \$.75
D. \$1.00
E. \$1.50

8. 40% of 80 is what percent of 96?

A. 20%
B. 30%
C. 33 %
D. 50%
E. 66 %

9. If l, m, and n are positive integers greater than 1, , and , then which of the following must be true?

A. B. C. D. E. 10. According to the graph above, ABC Company showed the greatest change in profits between which 2 years?

A. 1996 and 1997
B. 1997 and 1998
C. 1998 and 1999
D. 1999 and 2000
E. 2000 and 2001

11. In a 9th-grade class, 12 students play soccer, 7 students play tennis, and 9 students play lacrosse. If 4 students play exactly two of the three sports and all other students play only one, how many students are in the class?

A. 28
B. 24
C. 20
D. 18
E. 16

12. The point (14, 14) is the center of a circle, and (2, 9) is a point on the circle. What is the length of the diameter of the circle?

A. 24
B. 26
C. 50
D. 144π
E. 169π

13. The population of Boomtown doubles every 18 months. In January of 2000, its population was exactly 12,000. At this rate, approximately when should the population reach 96,000?

A. January 2003
B. July 2004
C. January 2006
D. July 2007
E. January 2012

14. In how many different ways can five students of different heights be arranged in a line if the tallest student cannot be on either end?

A. 24
B. 25
C. 72
D. 96
E. 120

15. In the figure above, and . If a, b, and c are all integers, what is the greatest possible value of b?

A. 43
B. 46
C. 60
D. 86
E. 89

16. In the figure above, ΔACF is equilateral, with sides of length 4. If B, D, and E are the midpoints of their respective sides, what is the sum of the areas of the shaded regions?

A. B. C. D. E. 17. Given the graph of above, which of the following sets represents all values of x for which ?

A. all real numbers
B. C. D. E. 18. If a is a number chosen randomly from set X and b is a number chosen randomly from set Y, what is the probability that ab is greater than 20 but less than 50?

A. B. C. D. E. 19. If and , what is the value of a + b?

A. 6
B. 7
C. 11
D. 12
E. 13

20. Given the graph of y = f (x) above, which of the following represents the graph of ?

A. B. C. D. E. 21. In the figure above, what is the value of 2x?

A. 36
B. 72
C. 90
D. 108
E. 132

22. If , then x could be

A. -6
B. -2
C. 0
D. 4
E. 6

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