Problem Set 18: Rational Functions

1. What is the fundamental difference in the algebraic representation of a polynomial function and a rational function?

2. What is the fundamental difference in the graphs of polynomial functions and rational functions?

3. If the graph of a rational function has a removable discontinuity, what must be true of the functional rule?

4. Can a graph of a rational function have no vertical asymptote? If so, how?

5. Can a graph of a rational function have no x-intercepts? If so, how?

For the following exercises, find the domain of the rational functions.

6. f(x)=x1x+2

7. f(x)=x+1x21

8. f(x)=x2+4x22x8

9. f(x)=x2+4x3x45x2+4

For the following exercises, find the domain, vertical asymptotes, and horizontal asymptotes of the functions.

10. f(x)=4x1

11. f(x)=25x+2

12. f(x)=xx29

13. f(x)=xx2+5x36

14. f(x)=3+xx327

15. f(x)=3x4x316x

16. f(x)=x21x3+9x2+14x

17. f(x)=x+5x225

18. f(x)=x4x6

19. f(x)=42x3x1

For the following exercises, find the x– and y-intercepts for the functions.

20. f(x)=x+5x2+4

21. f(x)=xx2x

22. f(x)=x2+8x+7x2+11x+30

23. f(x)=x2+x+6x210x+24

24. f(x)=942x23x212

For the following exercises, describe the local and end behavior of the functions.

25. f(x)=x2x+1

26. f(x)=2xx6

27. f(x)=2xx6

28. f(x)=x24x+3x24x5

29. f(x)=2x2326x2+13x5

For the following exercises, find the slant asymptote of the functions.

30. f(x)=24x2+6x2x+1

31. f(x)=4x2102x4

32. f(x)=81x2183x2

33. f(x)=6x35x3x2+4

34. f(x)=x2+5x+4x1

For the following exercises, use the given transformation to graph the function. Note the vertical and horizontal asymptotes.

35. The reciprocal function shifted up two units.

36. The reciprocal function shifted down one unit and left three units.

37. The reciprocal squared function shifted to the right 2 units.

38. The reciprocal squared function shifted down 2 units and right 1 unit.

For the following exercises, find the horizontal intercepts, the vertical intercept, the vertical asymptotes, and the horizontal or slant asymptote of the functions. Use that information to sketch a graph.

39. p(x)=2x3x+4

40. q(x)=x53x1

41. s(x)=4(x2)2

42. r(x)=5(x+1)2

43. f(x)=3x214x53x2+8x16

44. g(x)=2x2+7x153x214+15

45. a(x)=x2+2x3x21

46. b(x)=x2x6x24

47. h(x)=2x2+x1x4

48. k(x)=2x23x20x5

49. w(x)=(x1)(x+3)(x5)(x+2)2(x4)

50. z(x)=(x+2)2(x5)(x3)(x+1)(x+4)

For the following exercises, write an equation for a rational function with the given characteristics.

51. Vertical asymptotes at x = 5 and = –5, x-intercepts at (2,0) and (1,0), y-intercept at (0,4)

52. Vertical asymptotes at x=4 and x=1, x-intercepts at (1,0) and (5,0), y-intercept at (0,7)

53. Vertical asymptotes at x=4 and x=5, x-intercepts at (4,0) and (6,0), Horizontal asymptote at y=7

54. Vertical asymptotes at x=3 and x=6, x-intercepts at (2,0) and (1,0), Horizontal asymptote at y=2

55. Vertical asymptote at x=1, Double zero at x=2, y-intercept at (0,2)

56. Vertical asymptote at x=3, Double zero at x=1, y-intercept at (0,4)

For the following exercises, use the graphs to write an equation for the function.

57.
Graph of a rational function with vertical asymptotes at x=-3 and x=4.

58.
Graph of a rational function with vertical asymptotes at x=-3 and x=4.

59.
Graph of a rational function with vertical asymptotes at x=-3 and x=3.

60.
Graph of a rational function with vertical asymptotes at x=-3 and x=4.

61.
Graph of a rational function with vertical asymptote at x=1.

62.

Graph of a rational function with vertical asymptote at x=-2.

63.
Graph of a rational function with vertical asymptotes at x=-3 and x=2.

64.
Graph of a rational function with vertical asymptotes at x=-2 and x=4.

For the following exercises, make tables to show the behavior of the function near the vertical asymptote and reflecting the horizontal asymptote

65. f(x)=1x2

66. f(x)=xx3

67. f(x)=2xx+4

68. f(x)=2x(x3)2

69. f(x)=x2x2+2x+1

For the following exercises, use a calculator to graph f(x). Use the graph to solve f(x)>0.

70. f(x)=2x+1

71. f(x)=42x3

72. f(x)=2(x1)(x+2)

73. f(x)=x+2(x1)(x4)

74. f(x)=(x+3)2(x1)2(x+1)

For the following exercises, identify the removable discontinuity.

75. f(x)=x24x2

76. f(x)=x3+1x+1

77. f(x)=x2+x6x2

78. f(x)=2x2+5x3x+3

79. f(x)=x3+x2x+1

For the following exercises, express a rational function that describes the situation.

80. A large mixing tank currently contains 200 gallons of water, into which 10 pounds of sugar have been mixed. A tap will open, pouring 10 gallons of water per minute into the tank at the same time sugar is poured into the tank at a rate of 3 pounds per minute. Find the concentration (pounds per gallon) of sugar in the tank after t minutes.

81. A large mixing tank currently contains 300 gallons of water, into which 8 pounds of sugar have been mixed. A tap will open, pouring 20 gallons of water per minute into the tank at the same time sugar is poured into the tank at a rate of 2 pounds per minute. Find the concentration (pounds per gallon) of sugar in the tank after t minutes.

For the following exercises, use the given rational function to answer the question.

82. The concentration C of a drug in a patient’s bloodstream t hours after injection in given by C(t)=2t3+t2. What happens to the concentration of the drug as t increases?

83. The concentration C of a drug in a patient’s bloodstream t hours after injection is given by C(t)=100t2t2+75. Use a calculator to approximate the time when the concentration is highest.

For the following exercises, construct a rational function that will help solve the problem. Then, use a calculator to answer the question.

84. An open box with a square base is to have a volume of 108 cubic inches. Find the dimensions of the box that will have minimum surface area. Let x = length of the side of the base.

85. A rectangular box with a square base is to have a volume of 20 cubic feet. The material for the base costs 30 cents/ square foot. The material for the sides costs 10 cents/square foot. The material for the top costs 20 cents/square foot. Determine the dimensions that will yield minimum cost. Let x = length of the side of the base.

86. A right circular cylinder has volume of 100 cubic inches. Find the radius and height that will yield minimum surface area. Let x = radius.

87. A right circular cylinder with no top has a volume of 50 cubic meters. Find the radius that will yield minimum surface area. Let x = radius.

88. A right circular cylinder is to have a volume of 40 cubic inches. It costs 4 cents/square inch to construct the top and bottom and 1 cent/square inch to construct the rest of the cylinder. Find the radius to yield minimum cost. Let x = radius.