Transitive Property of Equality Variation 2

Angle Symmetry Example 2

Distance Property 2

Distance Property 1

Collinear Then 180

Subtract Both Sides

Add Term to Both Sides 6

Subtract Both Sides 2

Add Term to Both Sides 7

Transitive Property of Equality Variation 1

Vertical Angles

Angle Addition Theorem

Collinear Angles Property 9

Collinear Angles B

Exterior Angle B

Collinear Angles Property 10

Collinear Angles Property 3

Collinear Angles Property 3 B

Collinear Angles Property 3 C

alternate interior angles then parallel

ParallelThenAIA

Parallelthenaiashort

Parallel Then Aia Short Mirror

Angle Symmetry 4

Angle Symmetry Example

If Parallelogram Diagonal Then Congruent Triangles

If Parallelogram Then Sides Congruent B

If Parallelogram Then Sides Congruent B2

Square is Equilateral

If Parallelogram Then Sides Congruent

Transitive Property of Equality Variation 3

Distance Property 5

Square is Equilateral 2

Square is Equilateral 3

Distance Property 6

Congruent Triangles to Angles

Aiathenparallelshort

Congruent Triangles to Angles 2

Parallel Then Parallelogram

If Sides Congruent Then Parallelogram

If Sides Congruent Then Parallelogram 2

If Sides Congruent Then Parallelogram 3

If Equilateral Then Rhombus

Square is Rhombus

Parallel Then Aia Short Mirror 3

Angle Symmetry 2

Angle Symmetry 3

Parallel Then Aia Short 3

Angle Symmetry Property 5

Triangles Inside Rhombus

Sides of Rhombus Congruent 4

Diagonal Bisects Rhombus 2

Parallel Then Aia 2

Converse of the Supplementary Angles Theorem

Commutative Property Example 2

Commutative Property Variation 1

Substitution Example 10

Supplementary Then 180

Parallel Then Interior Supplementary

Paralleltheninteriorshort

Subtraction Example 2

Add Number to Both Sides

Add Number to Both Sides 2

Rectangle Right Angles 2

Angle Addition Theorem 2

Multiplicative Identity 2

Distributive Property 4

Multiplicative Property of Equality Variation 1

Addition Theorem

Divide Both Sides

Multiplicative Property of Equality Variation 2

Division is Commutative

Associative Property

Divide Each Side

Reduce Addition 2

Square Example 2

Alternate Interior Angles Theorem (Converse)

if WX || YZ and m∠WSX = 180 and m∠YTZ = 180, then m∠WST = m∠STZ

This is a proof by contradiction

Given(s)

WX || YZ

m∠WSX = 180

m∠YTZ = 180

Contradiction

Assumption

1	m∠YTZ = 180

Additional Assumptions

2	m∠HST = m∠STZ
3	m∠HSI = 180
4	line HI intersects line WX at point S

Proof Table

#	Claim	Reason
1	HI \|\| YZ	if m∠HSI = 180 and m∠YTZ = 180 and m∠HST = m∠STZ, then HI \|\| YZ (Alternate Interior Angles Theorem)
2	line WX intersects line YZ at point X	if HI \|\| YZ and line HI intersects line WX at point S, then line WX intersects line YZ at point X (Parallel Lines Property)

The last statement (line WX intersects line YZ at point X) contradicts a given statement

Conclusion

m∠WST = m∠STZ

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