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MATH 082 FINAL - PRACTICE TEST #3 Revised 06/23/09

Give all answers in simplest form.

1.  Simplify 4 (9x – 3) – (7 – 2x) – 2 + x

2.  Simplify. Write all answers without negative or zero exponents.

3.  Solve for x: 7 – 2 (x + 8) + 9x = -3

4.  Solve for x: + = –

5.  Solve the inequality and graph the solution 15 – 6x < 9

6.  Solve for V if PV = nRT. Given P = 50, n = 5, R = 16, and T = 0.125

7.  Graph the line 4x – 2y = 8

8.  Graph the line y =

9.  Find the slope of the line passing through the points (-1,5) and (2,-7)

10.  Write the equation of the line that passes through the points (-2, 5) and (3 , -15).

11.  Multiply

12.  Simplify:

13.  Multiply:

In problems 14 & 15, solve the system of equations.

14. 3x + y = 1

-6x -4y = -10

15. 3x + 10y = -7

-5x – 2y = -3

16. Simplify:

Math 082 Final - Practice Test #3 cont.

17. a) Write the following in Scientific Notation: 0.00058

b)  Convert to decimal notation.

c)  Multiply. Give your answer in scientific notation form.

18. Factor completely:

19. Factor completely:

20. Factor completely:

21. Solve by factoring:

22. Translate into an equation using one variable and solve: the difference of five times a number and three is nine added to the product of two and the number.

23.  I bought 4 T-shirts and 4 pairs of sweatpants from Target for a total of $148. My friend bought 6 T-shirts and 5 pairs of sweatpants from Target for a total of $200. Set up a system of equations that models the situation and solve the system to find how much each T-shirt and pair of sweatpants cost.

24.  Solve for

25. The slope of a line is 3 and one point on a line is (2, 3). Find the equation of the line

and write the answer in slope-intercept form.

26.  Solve by graphing:

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Math 082 Final - Practice Test #3 cont.

PRACTICE TEST SOLUTIONS

1. 4 (9x – 3) – (7 – 2x) – 2 + x

36x – 12 – 7 + 2x – 2 + x Distribute the 4 and -1

39x – 21 Combine like terms

2.

3. 7 – 2(x + 8) + 9x = -3

7 – 2x – 16 + 9x = -3 Distribute the -2

-9 + 7x = -3 Combine like terms

7x = 6 Add 9 to both sides of the equation

x = Divide both sides of the equation by 7

4. + = – ;

Find the common denominator. Then multiply each term of the equation by the common denominator.

12 · + 12 · = 12 · – 12 ·

4x + 9 = 2x – 30 Subtract a 2x from both sides of the equation.

2x + 9 = -30 Subtract a 9 from both sides of the equation.

2x = -39

x = Divide both sides of the equation by 2.

5. 15 – 6x < 9

-6x < -6 Subtract 15 from both sides

x > 1 Divide both sides by -6 and flip inequality symbol.

6. 50 . V = 5 . 16 . (0.125) Substitute all given values into the equation.

50V = 10 Multiply 5 . 16 . (0.125)

V = Divide both side of the equation by 50.

V = 0.2 Write the fraction in lowest terms

Math 082 Final - Practice Test #3 cont.

7. Graph the line 4x – 2y = 8; Find the x- and y- intercepts.

x / y
0 / -4
2 / 0

To find ordered pairs, choose a value for x or y,

then substitute this value into the equation to solve

for the missing value of the variable.

8. Graph y =

y-intercept: (0,5)

m =

Graph the line using the Slope and Y-intercept:

The slope of the line is -½ and the y-intercept is 5. Plot the y-intercept (0, 5). Then use the slope to find other points on the line. Starting at (0, 5) fall 1 and run 4 (Move down 1 and right 2). Repeat this (Move down 1 and right 2) to find additional points on the line.

9. m =

10. First, calculate the slope. m = = = = -4

Then, use the point (-2 , 5) in y = -4x + b to solve for b.

y = mx + b 5 = -4(-2) + b 5 = 8 + b

-8 -8

-3 = b Equation: y = -4x – 3

Math 082 Final - Practice Test #3 cont.

11.

12.

13.

14. 3x + y = 1 6x + 2y = 2 Multiply by 2 3x + 4 = 1

-6x – 4y = -10 -6x – 4y = -10 Add down 3x = -3


-2y = -8 Divide by -2 on both sides of the equation x = -1

y = 4 Substitute y = 4 into the original equation to find x.

Solution: (-1, 4)

15. 3x + 10y = -7 3x + 10y = -7 3(1) + 10y = -7

-5x – 2y = -3 -25x – 10y = -15 Multiply by 5 and Add down 3 + 10y = -7


-22x = -22 Divide both sides of the equation by -22 10y = -10

x = 1 Substitute x = 1 into the original equation to find y. y = -1 Solution: (1, -1)

16.

17. a) 0.00058 = 5.8 x 10-4

b)

c)

18. Use the difference of two square formula,

19. Greatest Common Factor = 2ab

Factor 2ab from each term

20. Factor using AC Method; a = 1, b = -4, c = -45 -

Math 082 Final - Practice Test #3 cont.

21.

Factor using AC Method

set each factor equal to zero

x = 4 x = -3

22. let x=the number, translate the statement into mathematical equation:

,

23. Let x = the cost of one T-shirt

y = the cost of one pair of sweatpants

4x + 4y = 148 -24x -24y = -888 Multiply by -6 4x + 4(22) = 148

6x + 5y = 200 24x +20y = 800 Multiply by 4, and add the two equations 4x + 88 = 148

-4y = -88 Divide both sides of the equation by -4 4x = 60

y = 22 Substitute y = 22 into the original equation to find x x =15

The cost of one T-shirt = x = $15

The cost of one pair of sweatpants = y = $22

24.

Subtract 4x from both sides of the equation

divide both sides of the equation by 6

25. ,

, since

Then, use the point (2 , 3) in y = 3x + b to solve for b.

3  = (3)(2) + b,

3  = 6 + b, subtract 6 from both sides of the equation

-3 = b Equation: y = 3x –3

26. Graph the lines of the two equations, then determine the intersection point of two lines.

solution: