1. Chapter 3: Parallel and Perpendicular Lines
Lesson 1: Parallel Lines and Transversals

2. Definitions
Parallel lines ( || )- coplanar lines that do not intersect (arrows on lines indicate which sets are parallel to each other)
Parallel planes- two or more planes that do not intersect
Skew lines- lines that do not intersect but are not parallel (are not coplanar)
Transversal- a line that intersects two or more lines in a plane at different points

3. Frayer Model Alternate Exterior Angles Alternate Interior Angles
Corresponding Angles
Consecutive Interior Angles

4. Pairs of angles formed by parallel lines and a transversal (see graphic organizer for examples)
Exterior angles: outside the two parallel lines
Interior angles: between the two parallel lines
Consecutive Interior angles: between the two parallel lines, on the same side of the transversal
Alternate Exterior angles: outside the two parallel lines, on different sides of the transversal
Alternate Interior angles: between the two parallel lines, on different sides of the transversal
Corresponding angles: one outside the parallel lines, one inside the parallel lines and both on the same side of the transversal

5. A. Name all segments parallel to BC.
B. Name a segment skew to EH.
C. Name a plane parallel to plane ABG.

6. Classify the relationship between each set of angles as alternate interior, alternate exterior, corresponding, or consecutive interior angles
A. 2 and 6
B. 1 and 7
C. 3 and 8
D. 3 and 5

7. A. A group of nature trails is shown
A. A group of nature trails is shown. Identify the sets of lines to which line a is a transversal.
B. A group of nature trails is shown. Identify the sets of lines to which line b is a transversal.
C. A group of nature trails is shown. Identify the sets of lines to which line c is a transversal.

8. Chapter 3: Parallel and Perpendicular Lines
Lesson 2: Angles and Parallel Lines

9. If two parallel lines are cut by a transversal, then… (see graphic organizer)
the alternate interior angles are congruent
the consecutive interior angles are supplementary
the alternate exterior angles are congruent
the corresponding angles are congruent
In a plane, if a line is perpendicular to one of the two parallel lines, then it is also perpendicular to the other line.

10. A. In the figure, m11 = 51. Find m15
A. In the figure, m11 = 51. Find m15. Tell which postulates (or theorems) you used.
B. In the figure, m11 = 51. Find m16. Tell which postulates (or theorems) you used.

11. A. In the figure, a || b and m18 = 42. Find m22.
B. In the figure, a || b and m18 = 42. Find m25.

12. A. ALGEBRA If m5 = 2x – 10, and m7 = x + 15, find x.
B. ALGEBRA If m4 = 4(y – 25), and m8 = 4y, find y.

13. ALGEBRA If m1 = 9x + 6, m2 = 2(5x – 3), and m3 = 5y + 14, find x.
B. ALGEBRA If m1 = 9x + 6, m2 = 2(5x – 3), and m3 = 5y + 14, find y.

14. Chapter 3: Parallel and Perpendicular Lines
Lesson 3: Slopes of Lines

15. Slope The ratio of the vertical rise over the horizontal run
Can be used to describe a rate of change
Two non-vertical lines have the same slope if and only if they are parallel
Two non-vertical lines are perpendicular if and only if the product of their slopes is -1

16. Foldable Step 1: fold the paper into 3 columns/sections
Step 2: fold the top edge down about ½ inch to form a place for titles. Unfold the paper and turn it vertically.
Step 3: title the top row “Slope”, the middle row “Slope-intercept form” and the bottom row “Point-slope form”

17. Slope Rise = 0 zero slope (horizontal line)
Run = undefined (vertical line)
Parallel = same slope
Perpendicular = one slope is the reciprocal and opposite sign of the other
Ex: find the slope of a line containing (4, 6) and (-2, 8)

18. Find the slope of the line.

19. Find the slope of the line.

20. Find the slope of the line.

21. Find the slope of the line.

22. Determine whether FG and HJ are parallel, perpendicular, or neither for F(1, –3), G(–2, –1), H(5, 0), and J(6, 3).
(DO NOT GRAPH TO FIGURE THIS OUT!!)

23. Determine whether AB and CD are parallel, perpendicular, or neither for A(–2, –1),
B(4, 5), C(6, 1), and D(9, –2)

24. A. Graph the line that contains Q(5, 1) and is parallel to MN with M(–2, 4) and N(2, 1).
B. Graph the line that contains (-1, -3) and is perpendicular to MN for M(–3, 4) and N(5, –8)?

25. Chapter 3: Parallel and Perpendicular Lines
Lesson 4: Equations of Lines

26. Slope-intercept form : y = mx + b
Slope and
y-intercept
Two ordered-pairs
(one is y-intercept)
Two ordered-pairs (neither is y-intercept)
m = -4
y-intercept = 7
(4, 1) (0, -2)
(3, 3) (2, 0)
* This should be your middle row on the foldable

27. Slope and one ordered-pair
Point-slope form:
Slope and one ordered-pair
Two ordered-pairs
m = (7, 2)
(8, -2) (-3, -1)
* This should be your bottom row on the foldable

28. Write an equation in slope-intercept form of the line with slope of 6 and y-intercept of –3.

29. Write the equation in slope-intercept form and then
Write an equation in point-slope form of the line whose slope is that contains (–10, 8). Then graph the line.

30. Write an equation in slope-intercept form for a line containing (4, 9) and (–2, 0).

31. Write an equation in point-slope form for a line containing (–3, –7) and
(–1, 3).

34. Chapter 3: Parallel and Perpendicular Lines
Lesson 5: Proving Lines Parallel

35. Two lines are parallel if they are cut by a transversal so that… (see graphic organizer)
Corresponding angles are congruent
Alternate exterior angles are congruent
Consecutive interior angles are supplementary
Alternate interior angles are congruent
They are both perpendicular to the transversal
If given a line and a point not on the line, there is exactly one line through that point that is parallel to the given line

36. A. Given 1  3, is it possible to prove that any of the lines shown are parallel? If so, state the postulate or theorem that justifies your answer.
B. Given m1 = 103 and m4 = 100, is it possible to prove that any of the lines shown are parallel? If so, state the postulate or theorem that justifies your answer.

37. Find ZYN so that || . Show your work.

38. A. Given 9  13, which segments are parallel?
B. Given 2  5, which segments are parallel?
C. Find x so that AB || HI if m1 = 4x + 6 and m14 = 7x – 27. __
___

39. Perpendicular Lines and Distance
The shortest distance between a line and a point not on the line is the length of the perpendicular line connecting them
Equidistant: the same distance- parallel lines are equidistant because they never get any closer or farther apart
The distance between two parallel lines is the distance between one line and any point on the other line
In a plane, if two lines are equidistant from a third line, then the two lines are parallel to each other