1. Practice for Proofs of: Parallel Lines Proving AIA, AEA, SSI, SSE only
By Mr. Erlin
Tamalpais High School
10/05/2010
Note: Blue slides match scaffolded notes handout

2. Statement Reason QED Prove: 4  5 Alternate Interior Angles are 
Given:
Alternate Interior Angles are  1 2 p 3 4
Prove: 4  5 5 6
Statement Reason q
p is parallel to q
r is a transversal to p, q
1 and 5 are Corresponding Angles
1  5
1 and 4 are Vertical Angles
1  4
4  1
4  5
Given
Definition of Corresponding Angles
If then
Definition of Vertical Angles
If Vertical Angles, then 
Symmetric Prop 
Transitive Prop 
parallel
transversal
corresponding
angles are congruent
QED

3. Statement Reason QED Prove: 4  5 Alternate Interior Angles are 
Given:
Alternate Interior Angles are  1 2 p 3 4
Prove: 4  5 5 6
Statement Reason q
p is parallel to q
r is a transversal to p, q
1 and  ____ are Corresponding Angles
1  5
____ and 4 are Vertical Angles
____________
4  _______
___________
Given
Definition of _____________ Angles
If ______ then _______
Definition of ______ Angles
If Vertical Angles, then 
Symmetric Prop 
Transitive Prop 
QED

4. Statement Reason QED Prove: 4  5 Alternate Interior Angles are 
Given:
Alternate Interior Angles are  1 2 p 3 4
Prove: 4  5 5 6
Statement Reason q
p is parallel to q
r is a transversal to p, q
1 and  ____ are Corresponding Angles
1  5
____ and 4 are Vertical Angles
____________
4  _______
___________
Given
Definition of _____________ Angles
If ______ then _______
Definition of ______ Angles
If Vertical Angles, then 
Symmetric Prop 
Transitive Prop  5
Corresponding
parallel
transversal
corresponding
angles are congruent 1
Vertical
1  4 1
4 5
QED

5. Statement Reason QED Prove: 3  6 Alternate Interior Angles are  l
Given:
Alternate Interior Angles are  2 l 3
Prove: 3  6 6
Statement Reason m
l is parallel to m
t is a transversal to l & m
6 and  ____ are Corresponding Angles
6  2
____ and 3 are Vertical Angles
_____  ______
6  _______
___________
Given
Definition of _____________ Angles
If ______ then _______
Definition of ______ Angles
If Vertical Angles, then 
Transitive Prop 
Symmetric Prop 
QED

6. Statement Reason QED Prove: 3  6 Alternate Interior Angles are  l
Given:
Alternate Interior Angles are  2 l 3
Prove: 3  6 6
Statement Reason m
l is parallel to m
t is a transversal to l & m
6 and  ____ are Corresponding Angles
6  2
____ and 3 are Vertical Angles
_____  ______
6  _______
___________
Given
Definition of _____________ Angles
If ______ then _______
Definition of ______ Angles
If Vertical Angles, then 
Transitive Prop 
Symmetric Prop  2
Corresponding
parallel
transversal
corresponding
angles are congruent
Vertical 2
 3 3
3 6
QED

7. Statement Reason QED Prove: 1  8 Alternate Exterior Angles are 
Given: 1 2 p 3 4
Prove: 1  8 5 6
Statement Reason q 7 8
p is parallel to q
r is a transversal to p, q
1 and 5 are Corresponding Angles
1  5
5 and 8 are Vertical Angles
5  8
1  8
Given
Definition of Corresponding Angles
If then
Definition of Vertical Angles
If Vertical Angles, then 
Transitive Prop 
parallel
transversal
corresponding
angles are congruent
QED

8. Statement Reason QED Prove: 1  8 Alternate Exterior Angles are 
Given: 1 2 p 3 4
Prove: 1  8 5 6
Statement Reason q 7 8
p is parallel to q
r is a transversal to p, q
1 and 5 are Corresponding Angles
1  5
5 and 8 are Vertical Angles
5  8
1  8
_________
________ of ____________ ________
If then
__________ of _________ _________
If ________, then ______
_____________________
QED

9. Statement Reason QED Prove: 3 & 5 are supplementary
Same Side Interior Angles are Supplementary
Given: 1 2
Prove:
3 & 5 are supplementary p 3 4 5 6
Statement Reason q
p is parallel to q
r is a transversal to p, q
1 and 5 are Corresponding Angles
1  5
3 and 1 are Linear Pair
3 & 1 are Supplementary
m3 + m1 = 180
m1 = m5
m3 + m5= 180
3 & 5 are Supplementary
Given
Definition of Corresponding Angles
If then
Definition of Linear Pair
If Linear Pair, then Supplementary
Definition of Supplementary (or if supplementary then 180)
Definition of Congruent Angles
Substitution Prop of Equality
Definition of Supplementary
parallel
transversal
corresponding
angles are congruent
QED

10. Statement Reason QED Prove: 3 & 5 are supplementary
Same Side Interior Angles are Supplementary
Given: 1 2
Prove:
3 & 5 are supplementary p 3 4 5 6
Statement Reason q
p is parallel to q
r is a __________ to p, q
1 and 5 are _________________ Angles
____  ____
3 and 1 are ________
__ & __ are Supplementary
m3 + m1 = ______
m1 = m5
m3 + m5= 180
3 & 5 are ___________
_________
Given
__________ of Corresponding Angles
If then
Definition of ____________
If Linear Pair, then ____________
__________ of Supplementary
Definition of Congruent Angles
__________ Prop of Equality
Definition of Supplementary
parallel
transversal
corresponding
angles are congruent
QED

11. Statement Reason QED Prove: 6 & 4 are supplementary
Same Side Interior Angles are Supplementary
Given: 2
Prove:
6 & 4 are supplementary l 4 m 6
Statement Reason
l // m; t is a __________ to l & m
6 & 2 are ___________ Angles
____  ____
m6 = m2
2 & 4 form ________
__ & __ are Supplementary
m2 + m4 = ______
m6 + m4= 180
6 & 4 are ___________
_________
______ of Corresponding Angles
If then
Definition of Congruent Angles
Definition of ____________
If Linear Pair, then ____________
__________ of Supplementary
__________ Prop of Equality
Definition of Supplementary
parallel
transversal
_________
angles are _________
QED

12. Statement Reason QED Prove: 6 & 4 are supplementary
Same Side Interior Angles are Supplementary
Given: 2
Prove:
6 & 4 are supplementary l 4 m 6
Statement Reason
l // m; t is a __________ to l & m
6 & 2 are ___________ Angles
____  ____
m6 = m2
2 & 4 form ________
__ & __ are Supplementary
m2 + m4 = ______
m6 + m4= 180
6 & 4 are ___________
transversal
Given
_________
______ of Corresponding Angles
If then
Definition of Congruent Angles
Definition of ____________
If Linear Pair, then ____________
__________ of Supplementary
__________ Prop of Equality
Definition of Supplementary
corresponding
Defin.
parallel
transversal
_________
angles are _________
congruent
corresponding
Linear Pair
Linear Pair
supplementary
180
Definition
Substitution
Supplementary
QED

13. Statement Reason QED Prove: 3 & 5 are supplementary
Same Side Interior Angles are Supplementary
Given: 1 2
Prove:
3 & 5 are supplementary p 3 4 5 6
Statement Reason q
________________
1 and 5 are ______________________
_______________
3 and 1 are ___________
3 & 1 are _____________
m3 + m1 = _______
m1 = m_____
___________= 180
______________________
Given
Definition of Corresponding Angles
If then
Definition of Linear Pair
If Linear Pair, then Supplementary
Definition of Supplementary
Definition of Congruent Angles
Substitution Prop of Equality
parallel
transversal
corresponding
angles are congruent
QED