Let * be the binary operation defined on Q. Find which of the following binary operations are commutative
(i) a * b = a – b ∀ a, b ∈Q

(ii) a * b = a² + b²∀ a, b ∈Q

(iii) a * b = a + ab ∀ a, b ∈Q

(iv) a * b = (a – b)²∀ a, b ∈Q

Question

Philoid · Accepted Answer

Given that, * be the binary operation defined on Q.

A binary operation ‘*’ is commutative if a*b = b*a ∀ a, b ∈ Q

(i) a * b = a – b ∀ a, b ∈Q

a * b = a – b = -b+a = -(b-a) = -(b*a)

∴ a*b ≠ b*a

Hence, ‘*’ is not commutative on Q.

(ii) a * b = a² + b² ∀ a, b ∈Q

a * b = a² + b²

= b² + a² [∵ addition is commutative on Q ⇒ a+b = b+a ]

= b*a

∴ a*b = b*a

Hence, ‘*’ is commutative on Q.

(iii) a * b = a + ab ∀ a, b ∈ Q

a * b = a + ab and b*a = b + ab

⇒ a + ab ≠ b + ab

∴ a*b ≠ b*a

Hence, ‘*’ is not commutative on Q.

(iv) a * b = (a – b)² ∀ a, b ∈Q

a * b = (a – b)² = {-(b-a)}²

= (b-a)²

=b*a

∴ a*b = b*a

Hence, ‘*’ is commutative on Q.

Let * be the binary operation defined on Q. Find which of the following binary operations are commutative(i) a * b = a – b ∀ a, b ∈Q(ii) a * b = a2 + b2∀ a, b ∈Q(iii) a * b = a + ab ∀ a, b ∈Q(iv) a * b = (a – b)2∀ a, b ∈Q