Jeopardy v 2 0 This version includes a

Jeopardy v 2. 0 This version includes a new macro that removes the questions (this makes it so the program will run appropriately regardless of your Power. Point version). First: in order to use this program, you need to enable macros. To do this, go to the Tools menu, select Macros, and then select Security. You will be shown a screen with various levels of security. Choose the radio button next to Medium and click OK. Then, close this file and re-open it. When it opens, it will ask if you want to enable macros. Click on “Enable”. To use this, simply edit the names of the categories to fit what you need, and then enter your questions (and answers) on the appropriate slides. Once you’ve entered all the questions, run the show. You must hit the “Start Game” button on this page (it will make sure all the questions appear). Click on the question chosen and that slide will come up. Click again to start the timer. When the timer reaches 0, click again and the answer will pop up. When the question has been answered, click the word “Back” in the lower right hand corner to bring yourself back to the main page. Once there, click the name of the team that got it right and enter the point value of the question. The score will be updated! That’s it! Comments? Suggestions? Email: rmayers@richmond. k 12. va. us P. S. This is, of course, a free program, but if you happen to feel like rewarding hard work with a little money, feel free to Pay. Pal some cash to ryan. mayers@gmail. com. Start Game

Domain & Range Translations Team 1 © 2006 by Mr. Mayers Mixed Review Team 2 Linear Models Team 3 Inequalities Direct Variation Team 4

Category 1, 100 Find the domain and range and state if the following relation is a function. R = {(2, 1), (-4, 5), (1, 7), (2, -3), (-1, 2)} Domain: {2, -4, 1, 2, -1} Range: {1, 5, 7, -3, 2} It is a function Back

Category 2, 100 Write the equation of the translation of y = |x| if the graph is moved down four units. Y = |x| - 4 Back

Category 3, 100 Write the equation for the line that goes through the point (-1, 3) and parallel to y = 2 x + 1 Y = 2 x + 5 Back

Category 4, 100 The cost of producing 4 units is $204. 80. The cost of producing 8 units is $209. 60. Write the linear model. How much does it cost to produce 12 units? Y = 1. 2 x + 200; $214. 40 Back

Category 5, 100 You need to make at least 150 sandwiches for a picnic. You are making tuna sandwiches and ham sandwiches. Write an inequality for the number of sandwiches you can make. Does the point (90, 80) satisfy the inequality? X + y ≥ 150 Yes, the sum of 90 and 80 is more than 150 Back

Category 6, 100 Determine whether y varies directly with x. If so, find k. 3 y = 2 x - 3 no Back

Category 1, 200 Draw a mapping diagram for the relation R = {(-3, 2), (-1, 0), (1, 2), (3, 4)} Domain: {-3, -1, 1, 3} Range: {0, 2, 4} Yes, it is a function Back

Category 2, 200 Write the equation that is the translation of y = |x| right 2 and down 3. Y = |x – 2| - 3 Back

Category 3, 200 What is the vertex of the function y = |-2 x – 5| - 3 Vertex: (-5/2, -3) Back

Category 4, 200 Suppose an airplane descends at a rate of 300 ft/min from an elevation of 8000 ft. Write and graph an equation to model the plane’s elevation as a function of the time it has been descending. Interpret the intercept at which the graph intersects the vertical axis. D = -300 t + 8000 The intercept (0, 8000) shows that the elevation was 8000 ft when the descent began. Back

Category 5, 200 Write an inequality for the graph if you have a dashed line and it is shaded below the line. The boundary line is -2 x – 3 y = 6 -2 x – 3 y < 6 Back

Category 6, 200 For the following direct variation, find the constant of variation. Then find the value of y when x = -5. Y = 17 when x = -4 K = -17/4; -21 1/4 Back

Category 1, 300 Is the following graph a function? See Slide #1 in SMART Document yes Back

Category 2, 300 Compare the graphs of the pair of functions. Describe how the graph of the second function relates to the graph of the first function. Y = -3|x| and y = -3 |x| + 3. The second function is the graph of y = -3|x| moved _____________. Up 3 units Back

Category 3, 300 Write two linear equations that can be used to graph y = |x – 3| Y = x – 3 and y = -x + 3 Back

Category 4, 300 An art expert visited a gallery and jotted down her guesses for the selling price of five different paintings. Then, she checked the actual prices. The data points (guess, actual) show the results, where each number is in thousands of dollars {(12, 11), (7, 8. 5), (10, 12), (5, 3. 8), (9, 10)}. Write the equation of the line. Y = 10/9 x – 2/3 Back

Category 5, 300 A salesperson sells two models of vacuum cleaners. One brand sells for $150 each, and the other sells for $200 each. The salesperson has a weekly sales goal of at least $1800. Write an inequality that models the situation. 150 x + 200 y ≥ 1800 Back

Category 6, 300 The perimeter (P) of a square varies directly as the length of a side (s) of the square. Write the equation. Find k. Find how long a side of the square must be for the perimeter to be 16 cm. P = 4 s K=4 16 cm Back

Category 1, 400 Give the domain and range of the graph of y = |x|. Domain: All Real Numbers Range: y ≥ 0 Back

Category 2, 400 The equation y = ½ x + 2 is translated from a parent function. Write the equation of the parent function. Then find the number of units and direction of translation. 2 units up Back

Category 3, 400 What is the slope of the equation 2 x + 7 y = 18? M = -2/7 Back

Category 4, 400 There were 174 words typed in 3 minutes. There were 348 words typed in 6 minutes. Find the linear model. How many words will be typed in 8 minutes? Y = 58 x; 464 words Back

Category 5, 400 Write an inequality for the graph in slide #6. Y ≤ |x| + 1 Back

Category 6, 400 A 15 minute long-distance telephone call costs $. 90. The cost varies directly as the length of the call. Write an equation that relates the cost to the length of the call. How long is a call that costs $1. 32? Y = 0. 06 x; 22 min. Back

Category 1, 500 Give the domain and range of the graph of y = √x. Domain X ≥ 0; Range y ≥ 0 Back

Category 2, 500 Write the equation that is the translation of y = -2|x| left 1 and up 3. Y = -2|x + 1| + 3 Back

Category 3, 500 Write the equation of the line that passes through the point (2, 2) and is perpendicular to y = 6/7 x – 1/2 Y = -7/6 x + 13/3 Back

Category 4, 500 After 5 months the number of subscribers to a newspaper was 5730. After 7 months the number of subscribers to the newspaper was 6022. Find the linear model. How many subscribers to the newspaper will there be after 10 months. Y = 146 x + 5000; 6460 subscribers Back

Category 5, 500 Write the inequality for the graph. The boundary line is y = -2. It is shaded below the line and has a dashed line. Y < -2 Back

Category 6, 500 The diameter of a tree varies direction as its age. A 15 year old tree is 3. 75 in. in diameter. How old will the tree be when it is 25 in. in diameter? 100 years old Back