Multiplicative Property of Equality Variation 1
Substitution 12
Substitution 15
Associative Property of Multiplication 2
Substitution 16
Transitive Property of Equality Variation 2
Transitive Property Application 2
Substitution 10
Reorder Terms 7
Multiplicative Property of Equality Variation 2
Transitive Property of Equality Variation 1
Manipulation
Square Root Example

Proof: Manipulation

Let's prove the following theorem:

(ss) ⋅ (1 / 4) = (s / 2) ⋅ (s / 2)

Proof:

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Proof Table
# Claim Reason
1 s / 2 = s ⋅ (1 / 2) s / 2 = s ⋅ (1 / 2)
2 (s / 2) ⋅ (s / 2) = ((s ⋅ (1 / 2)) ⋅ s) ⋅ (1 / 2) if s / 2 = s ⋅ (1 / 2), then (s / 2) ⋅ (s / 2) = ((s ⋅ (1 / 2)) ⋅ s) ⋅ (1 / 2)
3 ((s ⋅ (1 / 2)) ⋅ s) ⋅ (1 / 2) = ((ss) ⋅ (1 / 2)) ⋅ (1 / 2) ((s ⋅ (1 / 2)) ⋅ s) ⋅ (1 / 2) = ((ss) ⋅ (1 / 2)) ⋅ (1 / 2)
4 ((ss) ⋅ (1 / 2)) ⋅ (1 / 2) = (ss) ⋅ ((1 / 2) ⋅ (1 / 2)) ((ss) ⋅ (1 / 2)) ⋅ (1 / 2) = (ss) ⋅ ((1 / 2) ⋅ (1 / 2))
5 (1 / 2) ⋅ (1 / 2) = 1 / 4 (1 / 2) ⋅ (1 / 2) = 1 / 4
6 (ss) ⋅ (1 / 4) = (ss) ⋅ ((1 / 2) ⋅ (1 / 2)) if (1 / 2) ⋅ (1 / 2) = 1 / 4, then (ss) ⋅ (1 / 4) = (ss) ⋅ ((1 / 2) ⋅ (1 / 2))
7 (ss) ⋅ (1 / 4) = ((ss) ⋅ (1 / 2)) ⋅ (1 / 2) if (ss) ⋅ (1 / 4) = (ss) ⋅ ((1 / 2) ⋅ (1 / 2)) and ((ss) ⋅ (1 / 2)) ⋅ (1 / 2) = (ss) ⋅ ((1 / 2) ⋅ (1 / 2)), then (ss) ⋅ (1 / 4) = ((ss) ⋅ (1 / 2)) ⋅ (1 / 2)
8 (ss) ⋅ (1 / 4) = ((s ⋅ (1 / 2)) ⋅ s) ⋅ (1 / 2) if (ss) ⋅ (1 / 4) = ((ss) ⋅ (1 / 2)) ⋅ (1 / 2) and ((s ⋅ (1 / 2)) ⋅ s) ⋅ (1 / 2) = ((ss) ⋅ (1 / 2)) ⋅ (1 / 2), then (ss) ⋅ (1 / 4) = ((s ⋅ (1 / 2)) ⋅ s) ⋅ (1 / 2)
9 (ss) ⋅ (1 / 4) = (s / 2) ⋅ (s / 2) if (ss) ⋅ (1 / 4) = ((s ⋅ (1 / 2)) ⋅ s) ⋅ (1 / 2) and (s / 2) ⋅ (s / 2) = ((s ⋅ (1 / 2)) ⋅ s) ⋅ (1 / 2), then (ss) ⋅ (1 / 4) = (s / 2) ⋅ (s / 2)
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