Answer :
Given: A, B and C three sets are given.
Need to prove: A × (B – C) = (A × B) – (A × C)
Let us consider, (x, y) 
A × (B – C)
⇒ x 
A and y 
(B – C )
⇒ x 
A and (y 
B and y ∉ C)
⇒ (x 
A and y 
B) and (x 
A and y ∉ C)
⇒ (x, y) 
(A × B) and (x, y) ∉ (A × C)
⇒ (x, y) 
(A × B) – (A × C)
From this we can conclude that,
⇒ A × (B – C) ⊆ (A × B) – (A × C) ---- (1)
Let us consider again, (a, b) 
(A × B) – (A × C)
⇒ (a, b) 
(A × B) and (a, b) ∉ (A × C)
⇒ (a 
A and b 
B) and (a 
A and b ∉ C)
⇒ a 
A and (b 
B and b ∉ C)
⇒ a 
A and b 
(B – C)
⇒ (a, b) 
A × (B ∪ C)
From this, we can conclude that,
⇒ (A × B) – (A × C) ⊆ A × (B – C) ---- (2)
Now by the definition of set we can say that, from (1) and (2),
A × (B – C) = (A × B) – (A × C) [Proved]
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