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Equations
Inequalities
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100

Solve for x.

3(x – 2) – 5x = -2x – 6

All Real #'s

100

Solve the inequality and graph it on a # line.

3 < x + 7 < 11    

-4 < x < 4

(see graph)

100

Evaluate f(3) if    

 f(x)  = x2

9

100

 Find the equation of the line that passes through the points (-6, 4) and (-3, -2)

y = -2x - 8

100

How many solutions does the following system have?

y = 2x -5

15 + 3y = 6x

Infinitely Many

200

Solve for x.

3(x + 4) – x = 2(x – 6)    

No Solution.

200

Solve and graph the compound inequality on a # line.

5x-5 > -7x -5 or 3x + 5 x -1

x </= -3 or x > 0

(See Graph)

200

Evaluate h(x) =  -4(x + 3)

Find X if h(x) = -8        

x = -1

200

Write the equation of the line that is parallel to 2x – 3y = 9 and passes through the point (-2, -4)

y = 2/3x - 8/3

200

Solve using any method:

y = 7 - 2x    

-2x - y = 6    

No Solution

300

Solve for W

3/4w + 8 = 1/3w – 7

36

300

Graph the system of Inequalities.

12 - 3x </= 2y

-12 + 3x>3y

See Graph

300

What is the domain and range of the function:

(see graph)

Domain: (-infinity, infinity)

Range: (-infinity, infinity)

300

The graph of the equation 2x + 6y = 4 passes through point (x, -2).  What is the value of x?

x = 8

300

Solve the system using any method:

-2x + 16y = -34

   x - 8y  =  17    

Infinite Solutions

400

Pennie, Sarah, and Tanya are on the same basketball team.  Pennie scored twice as much as Sarah and Tanya scored three less than Sarah.  If they scored 37 points in all, how many did they each score?



Pennie = 20

Sarah = 10

Tanya = 7

400

Keith has $500 in a savings account at the beginning of the summer. He wants to have at least $200 in the account by the end of the summer. He withdraws $25 each week for food, clothes, and movie tickets.

  • Write an inequality that represents Keith's situation.
  • How many weeks can Keith withdraw money from his account? Justify your answer.

200 </= 500 - 25x

x </= 12

400

What is the domain and range of the function:

(see graph)

Domain: (-infinity, infinity)

Range: [0, infinity)

400

Write an equation of the line that is perpendicular to the line y = -½x + 5 and passes through the point (6, -10)

y = 2x - 22

400

Solve using any method:

4y -12x = -8

3x = y + 2

Infinite solutions

500

Solve for M.

32(m – 3) + 5 - 54m = 14(m + 1) – 3    

No Solution

500

The points (2, 5) and (-3, -5) lie on the line formed by an inequality.  The points (2, 5) and (0, 0) are both included in the solution set.  Graph the write the inequality.

(see graph)

500

Evaluate  f(8) + g(h(2))  if    

 f(x)  = 2x 

 g(x) = 2x - 4    

 h(x) =  -4(x + 3)

-28

500

Kyle wants to buy a large pizza.  The large pizza plain cost $18.  It then costs $2 for each topping he adds.

  1. Write an equation to represent this situation.  

  1. What is the total cost of the pizza, if he gets 7 toppings?

  2. If Kyle only has $30, what is the largest amount of toppings he can add?


1. y = 18 + 2x

2. #32

3. 6 toppings

500

At a recreation facility, 3 members and 3 non-members pay a total of $180 to take an aerobics class.  A group of 5 members and 3 non-members pay $210 to take the same class.  How much does it cost members and nonmembers to take an aerobics class?

members = $15 

non-members = $45