# II LawrenceLawson

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```					Algebra II Pre-Test                                     Name:__________________

1. Evaluate: x2 – 3(4 – x) for x = -4   5. Bob has \$96 in his savings account.
a. -40                               If he saves \$4.25 per week, how long
b. -16                               will it take him to have \$300 in his
c. 16                                account?
d. -8                                    a. 28 weeks
b. 48 weeks
c. 63 weeks
2. Which expression is equivalent to           d. 44 weeks
33 x 36?
a. 318
b. 39                            6. Which graphs is the solution for the
c. 96                               inequality 3r – 1 ≤ -4
d. 276                                 a.
-1
b.
3. Write the expression for the                               -1
perimeter of the rectangle below.           c.
-1
X+3            d.
3x - 2                                           -1
a.   4x + 1
b.   8x + 2
c.   3x2 + 1                     7. If y = 3/4x + 2, then what are the
d.   4x2 – 2                        slope and y-intercept?
a. Slope ¾, y-intercept 2
b. Slope 2, y-intercept ¾
c. Slope -4/3, y-intercept -2
4. Solve:             = -18                     d. Slope -3/4, y-intercept 2
a. x = -98
b. x =
8. Write the equation of a line with a
c. x =
slope of 3/2 and a y-intercept of -3.
a. y = -2/3x – 3
d. x =
b. y = -2/3x + 3
c. y = -3x + 3/2
d. y = 3/2x – 3
Algebra II Pre-Test                                          Name:__________________

9. Simplify: 4x(3x – 5y) – 2(x – 3y) –      13. Marcia took a taxicab from her
(2xy – 4y)                                   house to the airport. She had to pay
a. 7x – 2x – 18xy + 2y                   \$2.25 plus \$.85 per mile. The total
b. 12x – 2x – 22xy + 10y                 cost was \$7.35. How many miles
c. 12x2 – 2x – 22xy + 10y                was the taxi trip?
d. 12x2 – 2x – 22xy + 2y                    a. 4 miles
b. 6 miles
c. 7 miles
d. 8.65 miles
10. Simplify: 4x2(3y) – 8x2y
2xy
Assume that x ≠ 0 and y ≠ 0
a. X                                 14. Find the correct value(s) for c in the
b. –2x                                   expression: -14c ≤ 42
c. 2xy                                       a. c ≤ -3
d. 2x                                       b. c ≤ -
c. c ≥ -3
d. c ≤ 3

11. A rectangle has a length of (4x + 6).
15. Determine the slope of the line
Its width is (7x – 2). Write an
pictured.
expression for the perimeter of the
rectangle.
a. 11x + 4
b. 28x – 12
c. 28x2 + 34x – 12
d. 22x + 8

a.   m = 2/3
b.   m = -2/3
12. Solve for x: 3(x – 6) + 7x = 6 – 3x            c.   m= 3/2
a. x = 3                                    d.   m = -3/2
b. x = 1

c. x = -

d. x = - 1
Algebra II Pre-Test                                        Name:__________________

16. Write the equation of the line with   20. What is the value of b in this
passes through the point (2, 5) and       equation? 2/3b – 7 = –5
has a slope of 4.                            a. b = -18
a. y = 4x – 18                            b. b = 3
b. y = 4x – 3                             c. b = 4/3
c. y = 4x + 13                            d. b = -8
d. y = - x +

21. Jose spent \$45 on CD’s. He has \$32
left. Which equation could be used
17. Evaluate: –(x2 – 4y) if x = –3 and
to find out how much Jose had
y = –6
before he bought the CD’s?
a. -15
a. X + 45 = 32
b. 15
b. 45x = 32
c. -33
c. X – 45 = 32
d. 33
d.     = 32

18. Simplify: 9x3 + 15x2 – 6x
3x                    22. The graph below represents the
Assume x ≠ 0                      solution to which inequality?
a. 3x3 + 5x2 – 2x
b. 9x2 + 5x – 2
c. 3x2 + 5x – 2                                              5
d. 3x2 – 5x + 2                           a. 3x + 4 ≤ 19
19. Which expression represents the              b. 3x + 4 ≥ 19
area of the rectangle?                       c. 3x – 4 ≤ 19
3x + 4          d. -3x + 4 ≥ 19
23. Which of the following linear
equations will have a positive slope
2x – 3
when graphed?
a. y = -2/3x + 4
a.   5x + 1                               b. y = -5/2x – 4
b.   6x – 12                              c. y = -3 + 2.4x
c.   5x2 – 9x – 12                        d. y = 7 – 4x
d.   6x2 – x – 12
Algebra II Pre-Test                                       Name:__________________

24. Find the equation of the line        28. Find the correct value for d in the
containing the points (-3, -6) and       expression: -14d = -84
(9, 2)                                       a. d = -6
a. y = 3/2x – 3/2                        b. d = 1176
b. y = 2/3x + 4                          c. d = -1176
c. y = 2/3x – 4                          d. d = 6
d. y = 3/2x + 2

29. A TV repairman earns \$532 in one
25. Simplify:                                week. If the repairman works 38
3(2x – 4) + 5(4 – 3x) – (7 – 4x)         hours, which equation can be used
a. -5x + 1                            to find out how much the repairman
b. –x + 9                             earns per hour?
c. -13x + 15                              a. x + 38 = 532
d. -4x                                    b. x – 38 = 532
c. 38x = 532
d.    = 532

26. Simplify:
(4b2 + 3b – 5) – (2b2 + 5b – 7) –
(-6b2)
30. What is a compound inequality for
a. 6b2 + 2
the sentence below?
b. -2b – 7
Two more than three times a
c. 8b2 – 2b + 7
number is greater than -4 but less
d. -4b2 + 8b – 7
than 15.
a. -4 ≤ 3x ≤ 15
b. -4 <3x + 2 < 15
c. -4 > 3x – 2 > 15
27. Which expression represents the             d. 15 < 2x + 3 < -4
area of the square?

X–3

a.   X2 + 9
b.   2x – 6
c.   4x – 12
d.   X2 – 6x + 9
Algebra II Pre-Test                                              Name:__________________

31. What is the slope of the line passing    34. Simplify:
through the points (-5, -2) and (4, -5)       (7xy – 3x2 – 5y2) – (5x2 – 5xy + 2y2)
a. m = -3                                     a. 2xy + 2x2 – 3y2
b. m = -7                                     b. 2xy + 2x2 – 7y2
c. m = -                                      c. 12xy – 8x2 – 7y2
d. 2xy – 8x2 – 7y2
d. m =
32. Which is the graph of 2x – 3y = 6?

a.                        b                       35. Write the expression for the
.                           perimeter of the square

3m + 2

a.   9m2 + 4
b.   6m + 4
c.   12m + 2
d.   12m + 8
c.                        d
.

36. Solve for X: 6x – 5 = -3x + 30
a. x =
b. x = -5
c. x = 5
33. Simplify: 3x3y5(-4x4y)2                         d. x = -
a. 48x11y7
37. It costs \$115 to join a biking club
b. -48x11y7
and \$25 per month for dues. Matt
c. 48x9y8
has paid the biking club \$290. How
d. -24x9y8
many months has Matt been a
member of the biking club?
a. 7 months
b. 11 months
c. 2 months
d. 3 m
e. onths
Algebra II Pre-Test                                        Name:__________________

38. Which inequality could Mr. Emery
use to figure out what amount, d, he
needs to save each month in order
to have at least \$650 at the end of
two years?
a. 650 ≤ 2(12d)
b. 650 ˂ 2(12d)
c. 650 ≥ 2(12d)
d. 650 ˂ 2(12d)

39. Which is the slope-intercept form of
the line x – 2y = 10?                  42. When simplified, what is
a. y = 2x + 10                         4x(3xy – 5y)?
b. y = 1/2x – 5                            a. 12x2y – 20xy
c. y = 1/2x + 5                            b. 32x3y2
d. y = x – 5                               c. 12x2y – 5y
d. 7x2y – 9xy

40. Simplify: 16x4y6z2
6x2y3z                      43. Which expression represents the
a. 8x2y3                                area of the square whose side
z-2                               measures (6x3y2) units?
b. 8x2y3                                   a. 12x9y4
3z4                                   b. 24x6y4
c. 8x2y2                                   c. 24x12y8
3z-2                                  d. 36x9y4
d. 8x6y9
Z4

41. Which is the graph of 2x + y = 3?      44. If y – 17 = 36, which one is the
inverse operation needed to solve
for y?
a. Subtract 17 from both sides
b. Add 17 to both sides
c. Multiply both sides by 17
Algebra II Pre-Test                                           Name:__________________

d. Divide both sides by 17                 c. X-1
d. X10

45. Golf putters are on sale for \$89.
With sales tax, a putter costs \$96.     49. Which equation best illustrates the
Which equation could be used to             given graph?
find out how much the sales tax is
on the putter?
a. x + 89 = 96
b. x – 89 = 96
c. 89x = 96
d.       = 96
a.   y = 3/2x – 3
b.   y = 2/3x – 3
c.   y = -3/2x – 3
d.   y = -2/3x – 3
46. Solve for x: -13x + 7 ≥ 98
a. x ≥ 7
b. x ≥
50. What is the product of (x – 4) and
c. x ≤                                  (x + 5)?
d. x ≤ –7                                   a. X2 – 20
b. 2x + 1
c. X2 + x – 20
d. X2 – 4x – 20
47. Which is an equation of a line with a
slope of ¼ and a y-intercept of 5?
a. y = ¼ x + 5
b. y = 4x + 5/3                     51. Which expression represents the
c. y = ¼ x – 5                          area of a rectangle whose length
d. y = 4x – 5/3                         measures (6a2b3) units and width
measures (4a5b4) units?
a. 10a7b7
b. 24a7b7
48. Simplify: x2(x5)2(x-4)                         c. 24a10b12
a. X5                                       d. 20a10b12
b. X8
Algebra II Pre-Test                                       Name:__________________

Write the inequality that expresses
the range of his budget for the TV.
a. 2000 ≤ x ≤ 2500
b. 2000 ≥ x ≥ 2500
52. What is the value of x in the                c. 2000 < x < 2500
following equation? X – 5 = 4x + 4           d. 2000 > x > 2500
a. x = -3
b. x = 3
c. x = -9
d. x = 9                          56. Find the equation of the line
containing the points (5, -2) and
(5, 2).
a. y = 5
53. Simplify:                                     b. x = 5
(3x – 4x3 – 5) + (8x3 – 12 + 9x)              c. y = -2
a. – 16x3 + 11x + 4                       d. x = -2
b. – 12x3 – 6x + 7
c. 4x3 + 12x + 17
d. 4x3 + 12x – 17
57. Which is the slope-intercept of the
line 3x – y = 4?
a. y = 3x + 4
54. You have \$430 and save \$15 each               b. y = -3x + 4
week. Your brother has \$310 and               c. y = 1/3x + 4
saves \$20 each week. How many                 d. y = -1/3x + 4
weeks will it take for you and your
brother to have the same amount in
savings?
a. 6                              58. John needs at least \$225 to pay for
b. 22                                 repairs to his car. He has \$82 saved
c. 24                                 already. He gets paid \$9.50 for
d. 37                                 working at the store. Which
inequality could be used to calculate
the number of hours that John must
work in order to have enough to pay
55. Mr. Farve wants to buy a big screen       for the repairs.
TV. He plans to spend at least                a. 9.50 + 82h ≥ 225
\$2000, but no more than \$2500.                b. 225 – 82 ≥ 9.50h
Algebra II Pre-Test                                         Name:__________________

c. 225 ≥ 9.50h – 82                 62. If 4n + 5 < 21, then which of the
d. 225 ≥ 9.50h + 82                     following is true?
a. n > 4
b. n < 4
c. n ≥ 4
59. Write an expression for the                    d. n ≤ 4
perimeter of a square whose side
measures (7m4n6) units.
a. 28m4n6
b. 28m16n24                         63. What is the slop of the line passing
c. 14m4n6                               through (4, -3) and (4, 3)?
d. 14m16n24                                 a. 0

b.

c.
60. Solve for x: 3 – 3x = -3(5x – 9)
a. x = 1                                  d. Undefined
b. x = -2
c. x = 2
d. x = 4/5
64. Simplify: (3x – 2y)2
a. 9x2 + 4y2
b. 9x2 – 4y2
61. One online music club charges a \$20           c. 9x2 – 12xy + 4y2
monthly fee plus \$1.50 per                    d. 9x2 – 6xy + 4y2
per song but not monthly fee. How
many songs will it take for the cost
to be the same with either club?
65. A pizzeria charges \$5 for a plain
a. 10 songs
cheese pizza plus \$2 for each
b. 20 songs
c. 30 songs
equation could be used to calculate
d. 40 songs
the total cost of a pizza, y, in terms
toppings, x?
a. y = 2x + 5
b. y = 2x – 5
Algebra II Pre-Test            Name:__________________

c. y = 5x + 2
d. y = 5x – 2
66. Simplify:
15a4b4 – 9a3b2 + 21a6b
3a2b
a.

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