Multiplicative Identity 2

Multiplicative Property of Equality Variation 1

Transitive Property of Equality Variation 1

Distributive Property 4

Substitution 12

Commutative Property Example 2

Associative Property of Multiplication 2

Transitive Property Application 1

Substitution 10

Division Theorem

Multiplicative Property of Equality Variation 2

Transitive Property of Equality Variation 3

Division is Commutative

Associative Property

Transitive Property of Equality Variation 2

Subtraction Example

Algebra 10 Help

Proof: Algebra 10

Let's prove the following theorem:

(s ⋅ s) - ((s ⋅ s) / 4) = (3 / 4) ⋅ (s ⋅ s)

Proof:

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Proof Table

#	Claim	Reason
1	s ⋅ s = (s ⋅ s) ⋅ 1	s ⋅ s = (s ⋅ s) ⋅ 1 (multiplicative_identity_2)
2	4 / 4 = 1	4 / 4 = 1 (Fixed Value Statement)
3	(s ⋅ s) ⋅ (4 / 4) = (s ⋅ s) ⋅ 1	if 4 / 4 = 1, then (s ⋅ s) ⋅ (4 / 4) = (s ⋅ s) ⋅ 1 (Multiplicative Property of Equality Variation 1)
4	s ⋅ s = (s ⋅ s) ⋅ (4 / 4)	if s ⋅ s = (s ⋅ s) ⋅ 1 and (s ⋅ s) ⋅ (4 / 4) = (s ⋅ s) ⋅ 1, then s ⋅ s = (s ⋅ s) ⋅ (4 / 4) (Transitive Property of Equality Variation 1)
5	((s ⋅ s) ⋅ (4 / 4)) + ((s ⋅ s) ⋅ ((-1) / 4)) = (s ⋅ s) ⋅ ((4 / 4) + ((-1) / 4))	((s ⋅ s) ⋅ (4 / 4)) + ((s ⋅ s) ⋅ ((-1) / 4)) = (s ⋅ s) ⋅ ((4 / 4) + ((-1) / 4)) (Distributive Property Variation)
6	(4 / 4) + ((-1) / 4) = 3 / 4	(4 / 4) + ((-1) / 4) = 3 / 4 (Fixed Value Statement)
7	((s ⋅ s) ⋅ (4 / 4)) + ((s ⋅ s) ⋅ ((-1) / 4)) = (s ⋅ s) ⋅ (3 / 4)	if ((s ⋅ s) ⋅ (4 / 4)) + ((s ⋅ s) ⋅ ((-1) / 4)) = (s ⋅ s) ⋅ ((4 / 4) + ((-1) / 4)) and (4 / 4) + ((-1) / 4) = 3 / 4, then ((s ⋅ s) ⋅ (4 / 4)) + ((s ⋅ s) ⋅ ((-1) / 4)) = (s ⋅ s) ⋅ (3 / 4) (Substitution 12)
8	(s ⋅ s) + ((s ⋅ s) ⋅ ((-1) / 4)) = (s ⋅ s) ⋅ (3 / 4)	if ((s ⋅ s) ⋅ (4 / 4)) + ((s ⋅ s) ⋅ ((-1) / 4)) = (s ⋅ s) ⋅ (3 / 4) and s ⋅ s = (s ⋅ s) ⋅ (4 / 4), then (s ⋅ s) + ((s ⋅ s) ⋅ ((-1) / 4)) = (s ⋅ s) ⋅ (3 / 4) (Substitute 9)
9	(s ⋅ s) + ((s ⋅ s) ⋅ ((-1) / 4)) = (s ⋅ s) - ((s ⋅ s) / 4)	(s ⋅ s) + ((s ⋅ s) ⋅ ((-1) / 4)) = (s ⋅ s) - ((s ⋅ s) / 4) (algebra_10_help)
10	(s ⋅ s) - ((s ⋅ s) / 4) = (s ⋅ s) ⋅ (3 / 4)	if (s ⋅ s) + ((s ⋅ s) ⋅ ((-1) / 4)) = (s ⋅ s) - ((s ⋅ s) / 4) and (s ⋅ s) + ((s ⋅ s) ⋅ ((-1) / 4)) = (s ⋅ s) ⋅ (3 / 4), then (s ⋅ s) - ((s ⋅ s) / 4) = (s ⋅ s) ⋅ (3 / 4) (Transitive Property of Equality Variation 2)
11	(s ⋅ s) ⋅ (3 / 4) = (3 / 4) ⋅ (s ⋅ s)	(s ⋅ s) ⋅ (3 / 4) = (3 / 4) ⋅ (s ⋅ s) (Commutative Property of Multiplication)
12	(s ⋅ s) - ((s ⋅ s) / 4) = (3 / 4) ⋅ (s ⋅ s)	if (s ⋅ s) - ((s ⋅ s) / 4) = (s ⋅ s) ⋅ (3 / 4) and (s ⋅ s) ⋅ (3 / 4) = (3 / 4) ⋅ (s ⋅ s), then (s ⋅ s) - ((s ⋅ s) / 4) = (3 / 4) ⋅ (s ⋅ s) (Transitive Property of Equality)

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