1. Slope & y-intercept on the Coordinate Plane Return to Table of Contents Day 2

2. Imagine trying to tell a person how to draw a line on the Cartesian Plane. Consider this graph of the Cartesian Plane, also called a Coordinate Plane or XY-Plane.

3. y x 2 4 6 8 10 -2 -4 -6 -8 -10 246 8 10 -2-4 -6 -8 -10 0 You only need a few facts about a line to completely describe it: · Its y-intercept (where it crosses the y-axis) "b" · Its slope (how much it rises or falls) "m" · y = mx + b The Equation of a Line

4. The y-intercept ("b")of a line is the point where the line intercepts the y-axis. In this case, the y-intercept of the line is +4. The y-intercept This is the ordered pair (0,4). y x 2 4 6 8 10 -2 -4 -6 -8 -10 246 8 10 -2-4 -6 -8 -10 0

5. 11What is the y-intercept of this line? b = 6 Answer (click me)

6. b = -4 12What is the y-intercept of this line? Answer (click me)

7. 13What is the y-intercept of this line? b = 8 Answer (click me)

8. y x 2 4 6 8 10 -2 -4 -6 -8 -10 246 8 10 -2-4 -6 -8 -10 0 14What is the x-intercept of this line? (-4,0) Answer (click me)

9. (3,0) 15What is the x-intercept of this line? Answer (click me)

10. 16What is the x-intercept of this line? (-6,0) Answer (click me)

11. 17The graph of the equation x + 3y = 6 intersects the y-axis at the point whose coordinates are A(0,2) B(0,6) C(0,18) D(6,0) From the New York State Education Department. Office of Assessment Policy, Development and Administration. Internet. Available from www.nysedregents.org/IntegratedAlgebra; accessed 17, June, 2011.

12. Defining Slope on the Coordinate Plane Return to Table of Contents

13. "Steepness" and "Position" of a Line

14. y x 2 4 6 8 10 -2 -4 -6 -8 -10 246 8 10 -2-4 -6 -8 -10 0 An infinite number of lines can pass through the same location on the y- axis...they all have the same y-intercept. Examples of lines with a y- intercept of ____ are shown on this graph. What's the difference between them (other than their color)? Consider this...

15. y x 2 4 6 8 10 -2 -4 -6 -8 -10 246 8 10 -2-4 -6 -8 -10 0 The lines all have a different slope. Slope is the steepness of a line. Compare the steepness of the lines on the right. Slope can also be thought of as the rate of change. The Slope of a Line

16. y x 2 4 6 8 10 -2 -4 -6 -8 -10 246 8 10 -2-4 -6 -8 -10 0 The red line has a positive slope, since the line rises from left to the right. The Slope of a Line run rise

17. y x 2 4 6 8 10 -2 -4 -6 -8 -10 246 8 10 -2-4 -6 -8 -10 0 The orange line has a negative slope, since the line falls down from left to the right. The Slope of a Line rise run

18. y x 2 4 6 8 10 -2 -4 -6 -8 -10 246 8 10 -2 -4 -6 -8 -10 0 The purple line has a slope of zero, since it doesn't rise at all as you go from left to right on the x-axis. The Slope of a Line

19. The black line is a vertical line. It has an undefined slope, since it doesn't run at all as you go from the bottom to the top on the y-axis. rise 0 = undefined

20. 18Is the slope of the following graph positive, negative, zero, or undefined? Apositive Bnegative Czero Dundefined

21. 19Is the slope of the following graph positive, negative, zero, or undefined? Apositive Bnegative Czero Dundefined

22. 20Is the slope of the following graph positive, negative, zero, or undefined? Apositive Bnegative Czero Dundefined

23. 21Is the slope of the following graph positive, negative, zero, or undefined? Apositive Bnegative Czero Dundefined

24. 22Is the slope of the following graph positive, negative, zero,or undefined Apositive Bnegative Czero Dundefined

25. 23 Apositive Bnegative Czero Dundefined Is the slope of the following graph positive, negative, zero, or undefined?

26. 24Is the slope of the following graph positive, negative, zero, or undefined? Apositive Bnegative Czero Dundefined

27. 25 Apositive Bnegative Czero Dundefined Is the slope of the following graph positive, negative, zero, or undefined?

28. While we can quickly see if the slope of a line is positive, negative or zero...we also need to determine how much slope it has...we have to measure the slope of a line. Measuring the Slope of a Line

29. The slope of the line is just the ratio of its rise over its run. The symbol for slope is "m". So the formula for slope is: Measuring the Slope of a Line slope = rise run

30. The slope is the same anywhere on a line, so it can be measured anywhere on the line. Measuring the Slope of a Line slope = rise run Keep in mind the direction: · Up (+) Down (-) · Right (+) Left (-)

31. For instance, in this case we measure the slope by using a run from x = 0 to x = +6: a run of 6. During that run, the line rises from y = 0 to y = 8: a rise of 8. Measuring the Slope of a Line slope = rise run m = 8 6 4 3

32. But we get the same result with a run from x = 0 to x = +3: a run of 3. During that run, the line rises from y = 0 to y = 4: a rise of 4. Measuring the Slope of a Line slope = rise run m = 4 3

33. But we can also start at x = 3 and run to x = 6 : a run of 3. During that run, the line rises from y = 3 to y = 7: a rise of 4. slope = rise run m = 4 3 Measuring the Slope of a Line

34. But we can also start at x = -6 and run to x = 0: a run of 6. During that run, the line rises from y = -8 to y = 0: a rise of 8. Measuring the Slope of a Line slope = rise run m = 8 6 4 3

35. How is the slope different on this coordinate plane? The line rises 8, however the run goes left 6 (negative). Therefore, it is said to have a negative slope Measuring the Slope of a Line slope = rise run m = 8 -6 m = -4 3 * most often the negative sign is placed in the numerator

36. 26What's the slope of this line?

37. 27What's the slope of this line?

38. 28What's the slope of this line?

39. 29What's the slope of this line?

40. 30What's the slope of this line?

41. A-20 B0 C20 Dundefined 31What's the slope of this line?

42. 32In the diagram below, what is the slope of the line passing through points A and B? A-2 B2 C-1/2 D1/2 From the New York State Education Department. Office of Assessment Policy, Development and Administration. Internet. Available from www.nysedregents.org/IntegratedAlgebra; accessed 17, June, 2011 A B.

43. 33A straight line with slope 5 contains the points (1,2) and (3,K). Find the value of K. [The use of the accompanying grid is optional.] From the New York State Education Department. Office of Assessment Policy, Development and Administration. Internet. Available from www.nysedregents.org/IntegratedAlgebra; accessed 17, June, 2011.

44. Tables and Slope Return to Table of Contents

45. xy -3 05 311 How can slope and the y-intercept be found within the table? · Look for the change in the y-values · Look for the change in the x-values · Write as a ratio (simpified) - this will be the "slope" · Determine the corresponding y-value to the x-value of 0 - this will be the "y-intercept"

46. xy -3 05 311 +6 +3 6363 = 2 is the slope 5 is the y-intercept

47. -4 is the y-intercept is the slope xy 5-5 0-4 -5-3 Determine the slope and y-intercept from this table. click to reveal answer

48. 34 xy -25 03 21 What is the slope?

49. 35 xy -12 1-4 34 What is the y-intercept? You may have to do a little extra work for this one...

50. 36 xy -12 1-4 34 What is the slope?

51. 37 xy -310 -28 6 What is the y-intercept? You may have to do a little extra work for this one...

52. 38 xy -310 -28 6 What is the slope?