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Relations and Functions

Relations and Functions. Section 1-6 and 1.7. Review. A relation is a pairing of input values with output values. A relation may be viewed as ordered pairs , mapping design , table , equation , or written in sentences x -values are inputs, domain, independent variable, cause

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Relations and Functions

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  1. Relations and Functions Section 1-6 and 1.7 1-6 Relations and Functions

  2. Review • A relation is a pairing of input values with output values. • A relation may be viewed as ordered pairs, mapping design, table, equation, or written in sentences • x-values are inputs, domain, independent variable, cause • y-values are outputs, range, dependent variable, effect 1-6 Relations and Functions

  3. Example 1 • What is the domain? • {0, 1, 2, 3, 4, 5} • What is the range? • {-5, -4, -3, -2, -1, 0} 1-6 Relations and Functions

  4. Example 2 4 –5 0 9 –1 Input –2 7 Output • What is the domain? • {4, -5, 0, 9, -1} • What is the range? • {-2, 7} 1-6 Relations and Functions

  5. Is a relation a function? What is a function? According to the textbook, “afunctionis…a relation in which every input is paired with exactly one output” 1/3/2020 7:40 PM 1-6 Relations and Functions 5

  6. Is a relation a function? • Focus on the x-coordinates, when given a relation • If the set of ordered pairs have different x-coordinates, • it IS A function • If the set of ordered pairs have samex-coordinates, • it is NOT a function • Y-coordinates have no bearing in determining functions 1-6 Relations and Functions

  7. Example 1 YES • Is this a function? • Hint: Look only at the x-coordinates :00 1-6 Relations and Functions

  8. Example 2 • Is this a function? • Hint: Look only at the x-coordinates NO :40 1-6 Relations and Functions

  9. –1 2 3 3 1 0 2 3 –2 0 2 –1 3 Example 5 Which mapping represents a function? Choice One Choice Two Choice 1 :40 1-6 Relations and Functions

  10. Example 6 Which mapping represents a function? A. B. B 1-6 Relations and Functions

  11. Example 7 Which situation represents a function? a. The items in a store to their prices on a certain date b. Types of fruits to their colors A fruit, such as an apple, from the domain would be associated with more than one color, such as red and green. The relation from types of fruits to their colors is not a function. There is only one price for each different item on a certain date. The relation from items to price makes it a function. 1-6 Relations and Functions

  12. Vertical Line Test • Vertical Line Test:a relation is a function if a vertical line drawn through its graph, passes through only one point.AKA: “The Pencil Test”Take a pencil and move it from left to right (–x to x); if it crosses more than one point, it is not a function 1-6 Relations and Functions

  13. Vertical Line Test Would this graph be a function? YES 1-6 Relations and Functions

  14. Vertical Line Test Would this graph be a function? NO 1-6 Relations and Functions

  15. Is the following function discrete or continuous? What is the Domain? What is the Range? Discrete 1-6 Relations and Functions

  16. Is the following function discrete or continuous? What is the Domain? What is the Range? continuous 1-6 Relations and Functions

  17. Is the following function discrete or continuous? What is the Domain? What is the Range? continuous 1-6 Relations and Functions

  18. Is the following function discrete or continuous? What is the Domain? What is the Range? discrete 1-6 Relations and Functions

  19. Domain and Range in Real Life The number of shoes in xpairs of shoes can be expressed by the equation y = 2x. What subset of the real numbers makes sense for the domain? Whole numbers What would make sense for the range of the function? Zero and the even numbers 1-6 Relations and Functions

  20. Domain and Range in Real Life The number of shoes in xpairs of shoes can be expressed by the equation y = 2x. What is the independent variable? The # of pairs of shoes. What is the dependent variable? The total # of shoes. 1/3/2020 7:40 PM 1-6 Relations and Functions 20

  21. Domain and Range in Real Life Mr. Landry is driving to his hometown. It takes four hours to get there. The distance he travels at any time, t, is represented by the function d = 55t (his average speed is 55mph. Write an inequality that represents the domain in real life. Write an inequality that represents the range in real life. 1-6 Relations and Functions

  22. Domain and Range in Real Life Mr. Landry is driving to his hometown. It takes four hours to get there. The distance he travels at any time, t, is represented by the function d = 55t (his average speed is 55mph. What is the independent variable? The time that he drives. What is the dependent variable? The total distance traveled. 1/3/2020 7:40 PM 1-6 Relations and Functions 22

  23. Domain and Range in Real Life Johnny bought at most 10 tickets to a concert for him and his friends. The cost of each ticket was $12.50. Complete the table below to list the possible domain and range. 4 5 6 7 8 9 10 50 62.50 75 87.50 100 112.50 125 What is the independent variable? The number of tickets bought. What is the dependent variable? The total cost of the tickets. 1-6 Relations and Functions

  24. Domain and Range in Real Life Pete’s Pizza Parlor charges $5 for a large pizza with no toppings. They charge an additional $1.50 for each of their 5 specialty toppings (tax is included in the price). Jorge went to pick up his order. They said his total bill was $9.50. Could this be correct? Why or why not? Yes One pizza with 3 toppings cost $9.50 Susan went to pick up her order. They said she owed $10.25. Could this be correct? Why or why not? No One pizza with 4 toppings cost $11 1-6 Relations and Functions

  25. Domain and Range in Real Life Pete’s Pizza Parlor charges $5 for a large pizza with no toppings. They charge an additional $1.50 for each of their 5 specialty toppings (tax is included in the price). What is the independent variable? The number of toppings What is the dependent variable? The cost of the pizza 1/3/2020 7:40 PM 1-6 Relations and Functions 25

  26. Function Notation f(x) means function of x and is read “f of x.” f(x) = 2x + 1 is written in function notation. The notation f(1) means to replacexwith 1 resulting in the function value. f(1) = 2x + 1 f(1) = 2(1) + 1 f(1) = 3 1-6 Relations and Functions

  27. Function Notation Given g(x) = x2 – 3, find g(-2) . g(-2) = x2 – 3 g(-2) = (-2)2 – 3 g(-2) = 1 1-6 Relations and Functions

  28. Function Notation Given f(x) = , the following. a. f(3) b. 3f(x) c. f(3x) f(3x) = 2x2 – 3x f(3x) = 2(3x)2 – 3(3x) f(3x) = 2(9x2) – 3(3x) f(3x) = 18x2 – 9x f(3) = 2x2 – 3x f(3) = 2(3)2 – 3(3) f(3) = 2(9) - 9 f(3) = 9 3f(x) = 3(2x2 – 3x) 3f(x) = 6x2 – 9x 1-6 Relations and Functions

  29. Function Notation Given f(x) = , the following. d. f(-x) f. f(x +3) f(-x) = 2x2 – 3x f(-x) = 2(-x)2 – 3(-x) f(-x) = 2x 2 + 3x f(x+3) = 2x2 – 3x f(x+3) = 2(x+3)2 – 3(x+3) f(x+3) = 2(x2 + 6x + 9) – 3x – 9 f(x+3) = 2x2 + 12x + 18 – 3x – 9 f(x+3) = 2x2 + 9x + 9 e. -f(x) –f(x) = –(2x2 – 3x) –f(x) = –2x2 + 3x 1-6 Relations and Functions

  30. For each function, evaluate f(0), f(1.5), f(-4), 3 f(0) = f(1.5) = f(4) = f(x) = 5 at f(x) = 1 at 4 -1 x = -5 x = 1 x = -1 x = 3 1-6 Relations and Functions

  31. For each function, evaluate f(0), f(1.5), f(-4), -5 f(0) = f(1.5) = f(-4) = f(x) = -5 at 1 1 x = -5 x = 0 1-6 Relations and Functions

  32. 3 -3 positive negative X=-3 x=6 x=10 X=0 x=4 X=-5 x=8 1-6 Relations and Functions

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