1. Bell Work: Draw the figure that this net depicts.

2. Answer:

4. If the equation of a line is written in slope-intercept form, we can read the slope and y-intercept directly from the equation. y = (slope)x + (y-intercept)

5. The slope-intercept equation of the line graphed is y = 3x – 3.

6. Slope-Intercept Equation: y = mx + b M represents the slope B represents the y-intercept

7. Consider the following graphs and their equations. They both have the same slope equaling 1. The red line though has a y-intercept of zero and the blue line has a y-intercept of 2.

8. In the following graph, they have the same y-intercept of zero, the first graph has a slope of 2 however, while the second graph has a slope of ½. Which graph has the steeper slope?

9. The first graphs slope equals zero and has a y-intercept of 2. The second graph’s slope is undefined and every point has an x-coordinate of -4.

10. A vertical line cannot be expressed in slope-intercept form.

11. Example: Refer to this equation to answer the questions. y = 2/3 x – 4 a) Where does the graph of the equation cross the y-axis? b) Does the line rise to the right or fall to the right?

12. Answer: a) y-axis point = -4 b) Rises to the right

13. Practice: Write the equations of the line. At what point does the line cross the y- intercept?

14. Answer: y = -3x + 4

15. Practice: Graph the equation using the given slope and y-intercept. y = 2/3x – 4

16. Answer:

17. Practice: Graph the equation using the given slope and y-intercept. y = -2x – 3

18. Answer:

19. HW: Lesson 56 #1-30