CONFIDENTIAL 1 Geometry Proving Lines Parallel. CONFIDENTIAL 2 Warm Up Identify each of the following: 1) One pair of parallel segments 2) One pair of.

CONFIDENTIAL 1

GeometryGeometry

Proving Lines Proving Lines ParallelParallel

CONFIDENTIAL 2

Warm UpWarm Up

Identify each of the following:

1) One pair of parallel segments 2) One pair of skew segments

3) One pair of perpendicular segmentsA

B C

D

E

CONFIDENTIAL 3

Proving lines ParallelProving lines Parallel

The converse of a theorem is found by exchanging the hypothesis and conclusion. The converse of a theorem is not automatically true. If it is true, it

must be stated as postulate or proved as a separate theorem.

CONFIDENTIAL 4

POSTULATE: If two coplanar lines are cut by a transversal so that a pair of corresponding angles

are congruent, then the two lines are parallel.

Converse of Corresponding angle postulateConverse of Corresponding angle postulate

1 2

1

2

m

n

HYPOTHESIS:

CONCLUSION: m || n

CONFIDENTIAL 5

Using the Converse of Corresponding angle postulateUsing the Converse of Corresponding angle postulate

Use the converse of Corresponding Angles postulate and the given information to show that l || m.

1 2 l

m

3 4

5 6

7 8

/1 = /5 /1 = /5 are Corresponding Angles.

l || m Converse of Corr. /s Angles postulate.

A) /1 = /5

CONFIDENTIAL 6

B) m/4 = (2x + 10)0, m/8 = (3x - 55)0, x = 65

1 2 l

m

3 4

5 6

7 8

m/4 = 2(65) + 10 = 140 Substitute 65 for x.

m/8 = 3(65) – 55 = 140 Substitute 65 for x.

m/4 = m/8 Trans. prop. of equality

/4 = /8 Def. of cong. angles.


CONFIDENTIAL 7

Use the converse of Corresponding Angles postulate and the given information to show that p || q.

Now you try!

1 2 3 45 6 7 8

p q

t

1a) m/1 = m/3

1b) m/7 = (4x + 25)0, m/5 = (5x + 12)0, x = 13

CONFIDENTIAL 8

Through a point P not on line l, there is exactly one line parallel to l.

Parallel postulateParallel postulate

The converse of Corresponding Angles postulate is used to construct parallel lines. The parallel postulate

guarantees that for any line l, you can always construct through a point that is not on l.

CONFIDENTIAL 9

Construction of Parallel linesConstruction of Parallel lines

Draw a line l and a point P not on l.

Draw a line m through P that intersects l. Label the angle 1.

l

P

l

P

l

m1

Construct an angle congruent to /1 at P. By the converse of corresponding angle postulate, l || m.

STEP1:STEP1:

STEP2:

STEP3: l

P

l

m1 2

n

CONFIDENTIAL 10

THEOREM: If two coplanar lines are cut by a transversal so that a pair of Alternate interior angles


Converse of Alternate interior angles theoremConverse of Alternate interior angles theorem

1

2

m

n

HYPOTHESIS:

CONCLUSION: m || n

Proving lines parallel

CONFIDENTIAL 11



Converse of Alternate exterior angles theoremConverse of Alternate exterior angles theorem

3 4

3

4

m

n

HYPOTHESIS:

CONCLUSION: m || n

CONFIDENTIAL 12

THEOREM: If two coplanar lines are cut by a transversal so that a pair of Same side interior angles

are supplementary, then the two lines are parallel.

Converse of Same side interior angles theoremConverse of Same side interior angles theorem

5

6

m

n

HYPOTHESIS:

CONCLUSION: m || n

m/5 = m/6 = 1800

CONFIDENTIAL 13


Proof

1

2

m

n

3

Given: /1 = /2

Prove: l || m

Proof: It is given that /1 = /2. Vertical angles are congruent, so /1 = /3. By the Transitive property of Congruence, /2 = /3. So, l || m by the Converse of Corresponding Angle Postulate.

CONFIDENTIAL 14

1 2 3 48 7 6 5

r s

t

Determining whether lines are parallelDetermining whether lines are parallel

Use the given information and the theorems you have learnt to show that r || s.

/2 = /6 /2 = /6 are Alternate interior Angles.

r || s Converse of Alt. int. Angles theorem.

A) /2 = /6

CONFIDENTIAL 15

B) m/6 = (6x + 18)0, m/7 = (9x + 12)0, x = 10



m/6 + m/7 = 78 + 12 = 180 /6 and /7 are same-side interior angles.

l || m Converse of same-side interior angles theorem.

1 2 3 48 7 6 5

r s

t

CONFIDENTIAL 16

Proving lines parallelProving lines parallel


r || sGiven: l || m, /1 = /3

Prove: r || p

Proof:

l

mm

p

r

1

2

3

Statements Reasons

1. l || m 1. Given

2. /1 = /2 2. corr. Angles Post.

3. /1 = /3 3. Given

4. /2 = /3 4. trans. prop. Of congruency

5. r || p 5. conv. Of Alt ext angles thm.

CONFIDENTIAL 17

Given: /1 = /4, /3 and /4 are supplementary.

Prove: l || m

Now you try!

ll m n

1 23

4

CONFIDENTIAL 18

During a race, all members of a rowing team should keep the oars parallel on each side. If m/1 = (3x + 13)0, m/2 = (5x - 5)0, x

= 9, show that the oars are parallel.

Sports ApplicationSports Application

1

2

A line through the center of the boat forms a transversal to the two oars on each side of the boat.

/1 and /2 are corresponding angles./1 and /2 are corresponding angles.

If /1 = /2, then the oars are parallel.

m/6 = 3(9) + 13 = 40

m/7 = 5(9) - 5 = 40

Substitute 10 for x in each expression.

m/1 = m/2, /1 = /2.

The corresponding angles are congruent, so the oars are parallel by the converse of corresponding angles postulates.

CONFIDENTIAL 19

Now you try!

1

2

4) Suppose the corresponding angles on the opposite side of the boat measure (4y - 2)0 and (3y + 6)0, where y = 8.

Show that the oars are parallel.

CONFIDENTIAL 20

Assessment

Use the converse of Corresponding Angles postulate and the given information to show that p || q.

1 2 8 74 3 5 6

p q

t

1) m/4 = m/5

2) m/1 = (4x + 16)0, m/8 = (5x - 12)0, x = 28

3) m/4 = (6x - 19)0, m/5 = (3x + 14)0, x = 11

CONFIDENTIAL 21


12 3

87 6

54

rs

4) m/1 = m/5

5) m/3 + m/4 = 1800

6) m/3 = m/7

7) m/4 = (13x - 4)0, m/8 = (9x + 16)0, x = 5

8) m/8 = (17x + 37)0, m/7 = (9x - 13)0, x = 6

9) m/2 = (25x + 7)0, m/6 = (24x + 12)0, x = 5

CONFIDENTIAL 22

10) Complete the following 2 column proof:

XX

Y V

W

2

1 3Given: /1 = /2, /3 = /1

Prove: XY || VW

Proof:

Statements Reasons

1. /1 = /2, /3 = /1 1. Given

2. /2 = /3 2. a._______

3.b. ______ 3. c._______

CONFIDENTIAL 23

POSTULATE: If two coplanar lines are cut by a transversal so that a pair of corresponding angles


Converse of Corresponding angle postulateConverse of Corresponding angle postulate

1 2

1

2

m

n

HYPOTHESIS:

CONCLUSION: m || n

Let’s review

CONFIDENTIAL 24

Using the Converse of Corresponding angle postulateUsing the Converse of Corresponding angle postulate

Use the converse of Corresponding Angles postulate and the given information to show that l || m.

1 2 l

m

3 4

5 6

7 8

/1 = /5 /1 = /5 are Corresponding Angles.


A) /1 = /5

CONFIDENTIAL 25

B) m/4 = (2x + 10)0, m/8 = (3x - 55)0, x = 65

1 2 l

m

3 4

5 6

7 8


m/8 = 3(65) – 55 = 140 Substitute 65 for x.

m/4 = m/8 Trans. prop. of equality

/4 = /8 Def. of cong. angles.


CONFIDENTIAL 26

Through a point P not on line l, there is exactly one line parallel to l.

Parallel postulateParallel postulate

The converse of Corresponding Angles postulate is used to construct parallel lines. The parallel postulate

guarantees that for any line l, you can always construct through a point that is not on l.

CONFIDENTIAL 27

Construction of Parallel linesConstruction of Parallel lines

Draw a line l and a point P not on l.

Draw a line m through P that intersects l. Label the angle 1.

l

P

l

P

l

m1

Construct an angle congruent to /1 at P. By the converse of corresponding angle postulate, l || m.

STEP1:STEP1:

STEP2:

STEP3: l

P

l

m1 2

n

CONFIDENTIAL 28



Converse of Alternate interior angles theoremConverse of Alternate interior angles theorem

1

2

m

n

HYPOTHESIS:

CONCLUSION: m || n

Proving lines parallel

CONFIDENTIAL 29




3 4

3

4

m

n

HYPOTHESIS:

CONCLUSION: m || n

CONFIDENTIAL 30

THEOREM: If two coplanar lines are cut by a transversal so that a pair of Same side interior angles

are supplementary, then the two lines are parallel.

Converse of Same side interior angles theoremConverse of Same side interior angles theorem

5

6

m

n

HYPOTHESIS:

CONCLUSION: m || n

m/5 = m/6 = 1800

CONFIDENTIAL 31


Proof

1

2

m

n

3

Given: /1 = /2

Prove: l || m

Proof: It is given that /1 = /2. Vertical angles are congruent, so /1 = /3. By the Transitive property of Congruence, /2 = /3. So, l || m by the Converse of Corresponding Angle Postulate.

CONFIDENTIAL 32

Proving lines parallelProving lines parallel


r || sGiven: l || m, /1 = /3

Prove: r || p

Proof:

l

mm

p

r

1

2

3

Statements Reasons

1. l || m 1. Given

2. /1 = /2 2. corr. Angles Post.

3. /1 = /3 3. Given

4. /2 = /3 4. trans. prop. Of congruency

5. r || p 5. conv. Of Alt ext angles thm.

CONFIDENTIAL 33

You did a great job You did a great job today!today!

CONFIDENTIAL 1 Geometry Proving Lines Parallel. CONFIDENTIAL 2 Warm Up Identify each of the following: 1) One pair of parallel segments 2) One pair of.

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parallel postulate

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