2. Math Jeopardy

3. F $100 F $200 E $300 E $400 Abs $500 Abs $100 LF $200 LF $300 LF $400 SP $500 SP $100 LP $200 LP $300 LP $400 LP $500 LP $100 LP $200 LP $300 LP $400 SofE $500 M $100 LofE $200 I&C $300 I&C $400 I&C $500 Frac/ Eqn/ Abs Eqn/ Abs Value/ Abs Value/ Lin Fn/ Lin Fn/ Scat Plots Scat Plots Scat Plots/ Scat Plots/ Lin Program. Lin Program. Lin Prog/ Lin Prog/ Sys of Eqn Sys of Eqn Mat/ Laws/ Mat/ Laws/ Inv & Comp Inv & Comp

4. Fractions for $100

5. Fractions for $200

6. Solve 3x – 4 = 2x – 4 Equations for $300

7. Solve 4(x – 2) + 1= 2x - 7 Equations for $400

8. Solve 2 | 3x + 1| + 6 = 3 Absolute Value for $500

9. Solve |2x + 1| = 5 Absolute Value for $100

10. Find the slope of a line that goes through (-1, 4) & (3, 2) Linear Functions for $200

11. Write the equation for the line that goes through (0,4) and has a slope of -5 Linear Functions for $300

12. Write an equation in standard form for a line that goes through (-1,3) and (0,4) Linear Functions for $400

13. Find the correlation for the line of best fit {(0,4), (2,6), (4,8)} Scatter Plot for $500

14. What is correlation? Scatter Plot for $100

15. What are constraints? Linear Programming for $200

16. The refining process requires the production of at least 2 gal of gas for each gal of fuel oil. To meet demands, at least 3 million gal of fuel oil will need to be produced. The demand for gas is not more than 6.4 million gal. If gas is selling for $1.90/ gal and fuel oil sells for $1.50/gal, how much of each should be produced in order to maximize revenue? Linear Programming for $300

17. Cabinet X costs $10 per unit, requires 6 sq ft of floor space, and holds 8 cubic ft of files. Cabinet Y costs $20 per unit, requires 8 sq ft of floor space, and holds 12 cubic ft of files. You Have been given $140 for this purchase, though you don't have to spend that much. The office has room for no more than 72 sq ft of cabinets. How many of which model should you buy, in order to maximize storage volume? Linear Programming for $400

18. If you vertices are at (1,4), (2,6) and (3, 9) and the equation is f(x,y)= x – 2y. Where does the maximum and minimum occur? Linear Programming for $500

19. What is the first step to Solve a linear programming Problem? Linear Programming for $100

20. Linear Programming for $200 Where are the maximum Or minimum located?

21. 4 Find the maximum if the equation is f(x,y)=3x-2y. Linear Programming for $300

22. Find the maximum if the Equation is f(x,y) = -2x + 4y Linear Programming for $400

23. System of Equations for $500Solve 5x + 2y = 10 4y = -10x + 20

24. Multiply: 3 2 4 -1 0 -3 -2 0 Matrix for $100

25. Laws of Exponents for $200Simplify: (3x -4 y 4 ) -2

26. Inverse and Composite for $300 Find the inverse of F(x) = 3x + 2

27. Inverse and Composite for $400 If f(x) = 2x + 1 and g(x) = 3x, Find (f°g)(x).

28. Inverse and Composite for $500 If f(x) = 3x 2 + x and g(x) = x – 1, Find (f°g)(x).