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2-1 Functions

2-1 Functions. What is a Function?. Definition: __________________________ ___________________________________ The x values of a function are called the ____________________ and all the y values are called the _________________ ___________________________________

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2-1 Functions

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  1. 2-1 Functions

  2. What is a Function? Definition: __________________________ ___________________________________ The x values of a function are called the ____________________ and all the y values are called the _________________ ___________________________________ X is called the “______________________” while y is the “______________________”

  3. Well, what would a non function look like? • Equations that would not be functions: • _____________________________________________________ • _____________________________________________________

  4. Domain? What was that? -the x values. The easiest way to define the domain ___________ _________________________________________ _________________________________________ ________________________________________ • _____________________________________ b) ____________________________________ Either is acceptable.

  5. Examples: Find the Domain of each

  6. Function Notation The algebraic expression is a function. There are LOTS of functions out there (any equation you can dream up where an x will produce only one y value is a function) but I am going to use this one for now. To show that something IS a function, it is written like this: Don’t worry! ____________________________ _______________________________________

  7. OK – how do we use it? Lets use the sample from before. 1. Given find f(1), f(-2) and f(0). The function is simply an instruction of what to do to x. ___________________________________ Plug 1 in for all x’s and solve for y and put as a ordered pair (x,y) f(1)= f(-2)= f(0)=

  8. Examples Find the domain of 3. 4. 5.

  9. 2.2 Graphing Lines Going from an equation to a picture

  10. What methods can I use to graph line? • ___________________________ ___________________________ ___________________________ ___________________________ ___________________________ Please graph 2x + 3y = 6

  11. What method can I use to graph line? 2. _____________________________ _____________________________ Lets review slope for a minute

  12. SLOPE • Slope = Please graph y = -3x +4

  13. Parallel Lines Perpendicular Lines Horizontal Lines Vertical Lines Special Things

  14. Other Review Items ____________ ____________ ____________

  15. 2.3 Equations of Lines Going the other direction – from a picture to the equation

  16. There are 3 standard forms of equations • Slope intercept form ______________ • Standard form ______________ ____________________________ 3. Point slope form

  17. So, what do you need to have to find the equation of the line? Lets try one: Slope=2 and the y-int = 5

  18. Convert y = 1.5 x – 6 to standard form. • ________________________________ • __________________________________ 2. Convert 10x – 2y = 3 to slope/intercept

  19. Find the equation of the line that has Slope = 3, y intercept = 10 Slope = 3, x intercept = 10 Slope = 3, passes through (10, 10)

  20. Parallel to -4x + 2y = 10 and passes through (-1, -1) 7. Parallel to x + 2y = 1 and passes through the point of intersection of the lines y = 3x – 2 and y = 2x + 1.

  21. Triangle ABC has vertices A(-4,-2) L(2,8) G(6,2) • Write the equation of AL

  22. Triangle ABC has vertices A(-4,-2) L(2,8) G(6,2) • Find the equation of the perpendicular bisector • of LG. • Steps: • ___________________ • ___________________ • ____________________ • 3. ________________ L G A

  23. Triangle ABC has vertices A(-4,-2) L(2,8) G(6,2) • Find the equation of the altitude to AG • Steps: • 2. ________________ L G A

  24. 2-4 A Variety of Graphs Piecewise Functions

  25. What are Piecewise Functions? Piecewise functions are defined ___________________________________ ___________________________________ ___________________________________ ___________________________________

  26. Graphing absolute Values

  27. How will we graph? ______________________________ ______________________________ ______________________________ ______________________________ ______________________________

  28. Graphing Absolute Value • _______________________________________ __________________________________________ __________________________________________ __________________________________________ • ______________________________________ _________________________________________ _________________________________________ _________________________________________

  29. Examples 1. 2.

  30. The next kind of piecewise function The form of this function is similar to this: This looks worse than it is. Essentially the function is split into multiple functions based on particular domains. ______________________________ ________________________________________

  31. _____________________________________ • _____________________________________ • x y x y x y

  32. 2-4 Graphing Day 2 Greatest Integer Function

  33. The Greatest Integer Function y = [x] Rounding down to the nearest integer

  34. So, what will each “point” look like? ______________________________ 4 3 2 1 1 2 3 4 5

  35. Shifts of Greatest integer Graphs Add/Subtract inside _______________________ Add/Subtract outside _______________________ Multiply/Divide inside: _______________________ Multiply/Divide outside? _______________________

  36. But how do we graph? You could use the trends to graph. Or, use a mathematical method and then look at what you predict should happen to double check. The mathematical method will work as long as you follow directions!! We’ll do a problem to learn the method.

  37. Method • ______________________________ _________________________________

  38. 3. _____________________________________ _______________________________________ 4. Graph 3 2 1 -1 1 2 3

  39. Lets try another one Graph 4. Graph 3 2 1 -1 1 2 3

  40. 2-5 Systems of Equations Finding a solution that works for multiple equations

  41. Warm Up Please graph on one set of axes the following:

  42. Solutions for multiple equations? That is, where 2 lines intersect. How can 2 lines intersect?

  43. What methods have you already learned for finding where 2 line intersect? • _______________________________________ • _______________________________________ __________________________________________ __________________________________________ • _______________________________________ __________________________________________ __________________________________________

  44. What method do you have to use? Unless specified (i.e. follow directions) you may use ANY method you want.  I want you to be happy. Examples:

  45. Steps to solve 3 Equations 3 Variables 1. __________________________________ 2. __________________________________ 3. ___________________________________ 4. ___________________________________ 5. ___________________________________

  46. A golfer scored only 4’s and 5’s in a round of 18 holes. His score was 80. How many of each score did he have?

  47. 2. Tuition plus Room/Board at a local college is $24,000. Room/Board is $400 more than one-third the tuition. Find the tuition.

  48. 3. Mr. Tem bought 7 different shirts for the coaches of his baseball team. The blue long sleeved shirts cost $30 each and the white short sleeved shorts cost $20 each. If he paid a total of $160, how many of each shirt did he buy??

  49. 4.. Rob invests money, some at 10% and some at 20% earning $20 in interest per year. Had the amounts invested been reversed, he would have received $25 in interest. How much has he invested all together?

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