Algebra Final Exam
Name: __________________________
COLLEGE ALGEBRA MIDTERM STUDY GUIDE
QUARTER 1 / SEMESTER 1
30 Multiple Choice Questions
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I. Problem Solving and Critical Thinking
• Estimation, graphs, and mathematical models
• Problem solving
II. Algebraic Expressions
• Evaluating expressions
• Distributive property
• Combining like terms
• Translating from word problems to expressions
III. Algebraic Linear Equations
• Solving one step and two-step equations including fractions
• Solving multi-step equations with distributive property and combining like terms
• Solving multi-step equations with variables on both sides of the equation
• Solving multi-step equations with no solutions or infinite solutions
• Solving literal equations
• Applications of linear equations
IV. Functions
• Function notation
• Evaluating functions
• Vertical line test
• Function mapping
• Domain and range
Problem Solving and Critical Thinking
1. Write an algebraic rule for the total number of tiles, T, in terms of the figure, n.
[pic]
A. n2 + 4
B. 2n + 2
C. 2(n + 1)
D. 3n + 2
2. Write an algebraic rule for the total number of tiles, T, in terms of the figure, n.
[pic]
A. n + 1
B. n(n + 1)
C. 3n
D. n2 + 1
3. Which equation best describes the relationship between the values of x and y shown in the table?
|x |y |
|-1 |-7 |
|0 |-5 |
|2 |-1 |
|4 |3 |
A. y = x – 5
B. y = 2x – 5
C. y = 3x – 7
D. y = 4x – 7
Algebraic expressions
4. Two enterprising college students decide to start a business. They will make up and deliver helium balloon bouquets for special occasions. It will cost them $39.99 to buy a machine to fill the balloons with helium.
They estimate that it will cost them $2.00 to buy the balloons, helium and ribbons needed to make each balloon bouquet. Which of the following expressions could be used to model the total cost for producing b balloon bouquets?
A. $2.00b + $39.99
B. $37.99b
C. $39.99b + $2.00
D. $41.99b
5. A plumber charges $13.50 per hour for a plumbing job that requires more than 3 hours to complete. For any job requiring 3 hours or less, there is a flat charge of $40.50. If h represents the number of hours the job requires, which of the following expressions gives the charge, in dollars, for a job requiring more than 3 hours to complete?
A. 13.5h + 40.5
B. 13.5h
C. 13.5h – 40.5
D. 40.5
6. You help in the school cafeteria by emptying the trash barrels. You are paid $4 for each day you work. Let d be the number of days you work in a month. Which of the following expressions represent your pay for that month, in dollars?
A. d4
B. [pic]
C. 4 + d
D. 4d
7. What is the value of the expression (x – y)2 when x = 5 and y = -1?
A. 4
B. 16
C. 24
D. 36
8. If a = -[pic], b = 4, and d = -3, what is the value of [pic]?
A. -25[pic]
B. -6
C. 75
D. 102
9. What is the value of [pic] if x = 6?
A. -3
B. 3
C. 6
D. 9
10. For all x, 5 – 3(x – 4) = ?
A. -3x + 17
B. -3x – 7
C. -3x + 1
D. -3x – 4
11. (6x – 4) – (2x + 8) is equivalent to:
A. 4(x + 4)
B. 4(x – 1)
C. 4(x – 3)
D. 4(x – 12)
12. The expression (3x2 + 5x – 12) – 2(x2 + 4x +9) is equivalent to which of the following:
A. x2 – 3x – 30
B. x2 + 13x + 6
C. 5x2 + x – 18
D. x2 + 3x – 21
Algebraic Linear Equations
13. A Fahrenheit temperature F can be approximated by doubling the Celsius temperature C and adding 32. Which of the following expresses this approximation method?
A. F = [pic]C + 32
B. F = 2C + 32
C. F = 2(C + 32)
D. F = C2 + 32
14. Roy is saving to buy a new bike, which costs $258. He has $16 towards this purchase. Express how much more Roy needs in the form of an equation.
A. x + 258 = 16
B. x – 16 = 258
C. x = 258 + 16
D. x + 16 = 258
15. Solve for r: 3r + 2 – r = -4
A. 3
B. -3
C. 4
D. -4
16. Patricia pays $1.19 each to download songs to her MP3 player. If n is the number of downloaded songs, which equation represents the cost C in dollars?
A. C = 1.19n
B. n = 1.19C
C. C = 1.19 ÷ n
D. C = n + 1.1
17. Solve the equation[pic].
A. [pic]
B. [pic]
C. [pic]
D. [pic]
18. An equation is shown below:
-2x + 9 = -17
What is the solution to the equation?
A. x = -13
B. x = -4
C. x = 4
D. x = 13
19. If a + b = 6, then [pic]
A. 3
B. 7
C. 10
D. 14
20. Solve for y: 3x – 4y = 12
A. y = 3x – 4
B. [pic]
C. [pic]
D. 3x – 4y = 12
21. The sum of one fifth of a number and three is equal to half of the number. What is the number?
A. 5
B. 10
C. 15
D. 20
22. Given y + 36 = 102, y + 14 = ? (Hint: solve for y first, then find y + 14)
A. 66
B. 76
C. 80
D. 124
23. When n basketball uniforms are purchased, the cost, C, of each uniform is given by the equation[pic]. If the cost of each uniform was $60, how many uniforms were purchased?
A. 5
B. 6
C. 8
D. 13
E. 26
Functions
24. What is the value of f(2) if f(x) = [pic]?
A. [pic]
B. 15
C. 125
D. 500
25. What are the domain and range for the relation[pic].
A. Domain = {all real numbers}
Range = {all real numbers}
B. Domain = {all real numbers ≠ 5}
Range = {all real numbers}
C. Domain = {all real numbers ≠ −5}
Range = {all real numbers}
D. Domain = {all real numbers}
Range = {all real numbers ≠ 5}
26. If f(x) = 3x – 2, find f(8) – f(-5)
A. 7
B. 9
C. 37
D. 39
27. If f(x) = 2x – 4 find f(q + 1):
A. 2q + 4
B. 2q + 2
C. 2q – 6
D. 2q – 2
28. If f(x) = -4x2 + 15, then f(-3) = ?
A. -21
B. -9
C. 39
D. 51
29. Find the range of the function given the domain: f(x) = 5 – 4x; domain = {-1, 0, 1}
A. {1, 5, 3}
B. {9, 5, 1}
C. {9, 5, 3}
D. {1, 5, 5}
30. A function g(x) = [pic]. For which value of x will g(x) = 0?
A. x = [pic]
B. x = -1
C. x = [pic]
D. x = 0
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