1. Algebra unit 4: Graphs of equations and functions
Unit 4 PowerPoint

2. The coordinate Plane

3. The coordinate plane Review
Overview
4 quadrants
Labeled with x and y axis
X axis is horizontal
Y axis is vertical
Labeled with coordinates (x, y)

4. Labeling points
Label the points
(4, 3)
(-1, 0)
(-2, - 3)
(2, - 3)

5. Hidden Message Activity
Complete the coordinate plane activity to reveal the secret message.

6. Graphs of Linear Equations

7. General graph of a linear function
When you hear linear, what do you think of?
What do you think a linear function will look like?

8. Graphing a Linear Equation
A taxi fare costs more the further you travel. Taxi’s charge a fee on top of the per-mile charge to cover hire of the vehicle. For our example, the taxi charges a set fee of $3, plus $.80 per mile traveled. Write an equation and graph the solutions.

9. Graphing a Linear Equation
Equation: y = $ $.80x
Where y is total cost and x is miles traveled.
Graph:
1- make a t-chart
2- pick x- values to plug in
3- calculate the y- values
4- plot the points
5- draw the line

10. Graphing a Linear Equation
A small business has a debt of $500,000 incurred from start-up costs. It predicts that it can pay off the debt at a rate of $85,000 per year according to the equation governing years in business (X) and debt measure in thousands of dollars (y).
Y = -85x + 500
Graph the equation and use the graph to predict when the debt will be fully paid.

11. Graphing A linear equation
Y = 3x + 2
Y = - 4x + 5
Y = .5x – 1.5

12. Graphs of Horizontal and Vertical Lines
How would you graph the two following lines?
Y = 3
X = - 4

13. Horizontal and vertical lines
“Mad-cabs” have an unusual offer going on. They are charging $7.50 for a taxi ride of any length within the city limits. Graph the function that relates the cost of hiring the taxi (y) to the length of the journey in miles (x).

14. Using and interpreting Linear graphs
Use the graph to convert:
70 F to C
0 F to C
30 C to F
0 C to F

15. Activity Grab a laptop and go to this website:
You are going to save the zogs using your equation tools. See what level you can get too.

16. Graphing Using Equations

17. What is a linear function?
How many times will the line cross the x-axis? What about the y-axis?

18. X- and Y- Intercepts
X-intercept: where the line touches/crosses the x axis (where the y value will be zero.)
Y-intercept: where the line touches/crosses the y axis (where the x value will be zero.)

19. Slope- intercept form of an equation

20. Slope-intercept form of an equation
Y = mx + b
Where x and y are your coordinate points
M is your slope
B is your y-intercept (where the line touches the y-axis)

21. Slope-Intercept Form What is the slope, what is the y-intercept?
Y = 5x + 3
Y = -12x – 4
Y = x + 1.5

22. Slope- intercept form
To find slope: calculate the rise and run of a line

23. Finding slope from a graph
Find the rise and the run, then divide the two (Rise / Run)
Example:

24. Slopes of horizontal and vertical lines

25. Determining Slope given two points on a line
Given two points (x1, y1) and (x2, y2)
𝑠𝑙𝑜𝑝𝑒= 𝑦 2 − 𝑦 1 𝑥 2 − 𝑥 1

26. Finding Slope given two points
Given the points:
(19, -16) and (-7, -15)
(-4, 7) and (-6, -4)

27. Linear functions in real-life

28. What is the importance?
What would be the importance of the y- intercept in the example below:
A taxi fare costs more the further you travel. Taxi’s charge a fee on top of the per-mile charge to cover hire of the vehicle. For our example, the taxi charges a set fee of $3, plus $.80 per mile traveled. Write an equation and graph the solutions.

29. What is the importance?
Farmer Ali had a well on his property 200 feet deep. When the well went dry, he hired a company to drill the well deeper. He used the equation d= -75t – 200 to find the depth of the well, d, using the number of days the company drilled, t.
What is the slope of the line?
What does the slope represent in the context of the problem?

30. What is the importance?
Pierce the plumber charges $25 for a service call. He uses the equation C = 50h + 25 to determine the charge of his services, C, after working h hours.
What is the slope of the line?
What does the slope represent in the context of the problem?
What is the y-intercept of the line?
What does the y-intercept represent in the context of the problem?

31. Finding intercepts in slope intercept form
To find intercepts in slope intercept form:
Plug in 0 for x to find the y-intercept
Plug in 0 for y to find the x-intercept

32. graphing intercepts in slope intercept form
Once you have determined the intercepts of the graph, plot them and draw a line between the two.

33. Example
Y = 2x – 3

34. Standard form of an equation

35. Finding intercepts in standard form
To find intercepts in standard form,
Plug in 0 for x to find the y-intercept
Plug in 0 for y to find the x-intercept

36. graphing intercepts in standard form
Once you have determine the intercepts of the graph, plot them and draw a line between the two.

37. Example
4x – 3y = 12

38. Graphing Practice Worksheet