10. Undefined 38. T; Alt Ext Angles 12. -1 39. T; Corr Angles

1. 10. Undefined 38. T; Alt Ext Angles 12. -1 39. T; Corr Angles 14. M = 150, average speed of 150 mi/h 40. F; Same-Side Int Angles 16. neither 18. M = 1150/2400 ≈ 0.5, average change in elevation is 0.5 m per kilometer 20. -1 22. -4/9 24. Lines have same slope so they are either parallel or same line 26. A 28. C 29. JK is vertical line 30. JK is horizontal line 31. Slope AB = slope CD = 1 Distance formula for the four sides = 6√2 Slope BC = slope AD = -1 A. opposite sides have same slope so parallel B. slopes of 2 consecutive sides are opp. reciprocals so consecutive sides are  C. All sides have the same length so they are 

2. Warm Up Substitute the given values of m, x, and y into the equation y = mx + b and solve for b. 1. m = 2, x = 3, and y = 0 Solve each equation for y. 3. y –6x = 9 b = –6 2.m = –1, x = 5, and y = –4 b = 1 y = 6x + 9 4. 4x –2y = 8 y = 2x – 4

3. The equation of a line can be written in many different forms. The point-slopeand slope-intercept forms of a line are equivalent. Because the slope of a vertical line is undefined, these forms cannot be used to write the equation of a vertical line.

4. Example 1A: Write the equation of each line in the given form. the line with slope 6 through (3, –4) in point-slope form Point-slope form y – y1 = m(x – x1) y – (–4) = 6(x – 3) Substitute 6 for m, 3 for x1, and -4 for y1. y + 4 = 6(x – 3)

5. Example 1B: Write the equation of each line in the given form. the line through (–1, 0) and (1, 2) in slope-intercept form Find the slope. Slope-intercept form y = mx + b 0 = 1(-1) + b Substitute 1 for m, -1 for x, and 0 for y. 1 = b Write in slope-intercept form using m = 1 and b = 1. y = x + 1

6. 5 5 Substitute for m, 3 for x1, and 0 for y1. y – 0 = (x – 3) 3 3 5 y = (x - 3) 3 Example 1C: Write the equation of each line in the given form. the line with the x-intercept 3 and y-intercept –5 in point slope form Use the point (3,-5) to find the slope. y – y1 = m(x – x1) Point-slope form Simplify.

7. The equation is given in the slope-intercept form, with a slope of and a y-intercept of –3. Plot the point (0, –3) and then rise 2 and run 1 to find another point. Draw the line containing the points. run 1 rise 2 (0, –3) Example 2a Graph each line. y = 2x – 3

8. The equation is given in the point-slope form, with a slope of through the point (–2, 1). Plot the point (–2, 1)and then rise –2 and run 3 to find another point. Draw the line containing the points. rise –2 (–2, 1) run 3 Example 2b Graph each line.

9. (0, –4) Example 2c Graph each line. y = –4 The equation is given in the form of a horizontal line with a y-intercept of –4. The equation tells you that the y-coordinate of every point on the line is –4. Draw the horizontal line through (0, –4).