Use the graph shown to determine whether each system is consistent or inconsistent and if it is independent or dependent.
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1 Use the graph shown to determine whether each system is consistent or inconsistent and if it is independent or dependent. 12. y = 3x + 4 y = 3x 4 These two equations do not intersect, so they are inconsistent. 13. y = 3x 4 y = 3x 4 The two equations intersect at exactly one point, so they are consistent and independent x y = 4 y = 3x + 4 Write the first equation in slope intercept form to determine which line it is on the graph. The two equations are identical, so the system is consistent and dependent. esolutions Manual - Powered by Cognero Page 1
2 15. 3x y = 4 3x + y = 4 Write the two equations in slope intercept form to determine which lines they are on the graph. The graphs of the two equations intersect at exactly one point, so the system is consistent and independent. esolutions Manual - Powered by Cognero Page 2
3 Graph each system and determine the number of solutions that it has. If it has one solution, name it. 21. x + 2y = 3 x = 5 Rearrange the first equation into slope-intercept form. The graphs intersect at one point, so there is one solution. The lines appear to intersect at (5, 1). You can check this by substituting 5 for x and 1 for y. So, the solution is (5, 1). esolutions Manual - Powered by Cognero Page 3
4 22. 2x + 3y = 12 2x y = 4 The graphs intersect at one point, so there is one solution. The lines appear to intersect at (3, 2). You can check this by substituting 3 for x and 2 for y. So, the solution is (3, 2). esolutions Manual - Powered by Cognero Page 4
5 23. 2x + y = 4 y + 2x = 3 These two lines are parallel, so they do not intersect. Therefore, there is no solution. esolutions Manual - Powered by Cognero Page 5
6 24. 2x + 2y = 6 5y + 5x = 15 The two lines are the same line. Therefore, there are infinitely many solutions. esolutions Manual - Powered by Cognero Page 6
7 25. SCHOOL DANCE Akira and Jen are competing to see who can sell the most tickets for the Winter Dance. On Monday, Akira sold 22 and then sold 30 per day after that. Jen sold 53 one Monday and then sold 20 per day after that. a. Write equations for the number of tickets each person has sold. b. Graph each equation. c. Solve the system of equations. Check and interpret your solution. a. Let x represent the number of days and let y represent the number of tickets sold. Number of tickets sold by each equals tickets sold per day times the number of days plus the number of tickets sold initially Akira: y = 30x + 22; Jen: y = 20x + 53 b. Graph y = 30x + 22 and y = 20x Choose appropriate scales for the horizontal and vertical axes. c. The graphs appear to intersect at (3.1, 115) Use substitution to check this. Since the answer works in both equations, (3.1, 115) is the solution to the system of equations. For less than 3 days Jen will have sold more tickets. After about 3 days Jen and Akira will have sold the same number of tickets. For 4 days or more, Akira will have sold more tickets. esolutions Manual - Powered by Cognero Page 7
8 Graph each system and determine the number of solutions that it has. If it has one solution, name it. 38. The two lines are the same line. Therefore, there are infinitely many solutions. esolutions Manual - Powered by Cognero Page 8
9 39. These two lines are parallel, so they do not intersect. Therefore, there is no solution. esolutions Manual - Powered by Cognero Page 9
10 40. The graphs intersect at one point, so there is one solution. The lines intersect at (1, 1). esolutions Manual - Powered by Cognero Page 10
11 51. OPEN ENDED Write three equations such that they form three systems of equations with y = 5x 3. The three systems should be inconsistent, consistent and independent, and consistent and dependent, respectively. Sample answers: y = 5x + 3; y = 5x 3; 2y = 10x 6 The first equation is parallel to the original equation, so there is no intersection, which makes the system inconsistent. The second equation has one intersection, which makes the system consistent and independent. The last equation is the same as the original equation, which makes the system consistent and dependent. esolutions Manual - Powered by Cognero Page 11
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