Transitive Property of Equality Variation 2

Sides of an Equilateral Triangle

Sides of an Equilateral Triangle 2

Distance Property 1

Angle Symmetry Example 2

Collinear Angles Property 9

Transitive Property Application 2

Angles of an Isosceles Triangle

Angles of an Isosceles Triangle 5

Angles of an Equilateral Triangle

Distance Property 2

Transitive Property of Equality Variation 3

Angle Symmetry Property 5

Angles of an Isosceles Triangle 4

Angles of an Isosceles Triangle 4 A

Angles of an Equilateral Triangle 2

Angles of an Equilateral Triangle 3

Transitive Property of Equality Variation 1

Propagated Transitive Property 3

Angles of an Equilateral Triangle 4

Collinear Then 180

Subtract Both Sides

Add Term to Both Sides 6

Subtract Both Sides 2

Add Term to Both Sides 7

Vertical Angles

Angle Addition Theorem

Collinear Angles B

Exterior Angle

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

Commutative Property Example 2

Commutative Property Variation 1

Substitution 2

Substitution 8

Angle Symmetry B

Substitution Example 10

Substitute First Term

Triangles Sum to 180

Substitute 2

Add Term to Both Sides 2

Multiplicative Identity 2

Distributive Property 4

Multiplicative Property of Equality Variation 1

Addition Theorem

Add Three

Divide Both Sides

Multiplicative Property of Equality Variation 2

Division is Commutative

Associative Property

Divide Each Side

Equilateral Triangle 60

Proof: Addition Theorem

Let's prove the following theorem:

a + a = a ⋅ 2

Proof:

View as a tree | View dependent proofs | Try proving it

Proof Table

#	Claim	Reason
1	a ⋅ 1 = a	a ⋅ 1 = a (Multiplicative Identity)
2	(a ⋅ 1) + a = a + a	if a ⋅ 1 = a, then (a ⋅ 1) + a = a + a (Additive Property of Equality)
3	a + a = (a ⋅ 1) + a	if (a ⋅ 1) + a = a + a, then a + a = (a ⋅ 1) + a (Symmetric Property of Equality)
4	a = a ⋅ 1	a = a ⋅ 1 (multiplicative_identity_2)
5	a + a = (a ⋅ 1) + (a ⋅ 1)	if a + a = (a ⋅ 1) + a and a = a ⋅ 1, then a + a = (a ⋅ 1) + (a ⋅ 1) (Term 2 Substitution)
6	(a ⋅ 1) + (a ⋅ 1) = a ⋅ (1 + 1)	(a ⋅ 1) + (a ⋅ 1) = a ⋅ (1 + 1) (Distributive Property Variation 4)
7	1 + 1 = 2	1 + 1 = 2 (Fixed Value Statement)
8	a ⋅ (1 + 1) = a ⋅ 2	if 1 + 1 = 2, then a ⋅ (1 + 1) = a ⋅ 2 (Multiplicative Property of Equality Variation 1)
9	(a ⋅ 1) + (a ⋅ 1) = a ⋅ 2	if (a ⋅ 1) + (a ⋅ 1) = a ⋅ (1 + 1) and a ⋅ (1 + 1) = a ⋅ 2, then (a ⋅ 1) + (a ⋅ 1) = a ⋅ 2 (Transitive Property of Equality)
10	a + a = a ⋅ 2	if a + a = (a ⋅ 1) + (a ⋅ 1) and (a ⋅ 1) + (a ⋅ 1) = a ⋅ 2, then a + a = a ⋅ 2 (Transitive Property of Equality)

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