Question

Check the commutativity and associativity of the following binary operation  '*' on R defined by a * b = a + b − 7 for all a, b ∈ R ?

Answer 1

Commutativity: 

\[\text{ Let } a, b \in R . \text{Then}, \]

\[a * b = a + b - 7\]

\[ = b + a - 7\]

\[ = b * a \]

\[\text{Therefore},\]

\[a * b = b * a, \forall a, b \in R\]

Thus, * is commutative on R.

Associativity:

\[\text{ Let } a, b, c \in R . \text{ Then }, \]

\[a * \left( b * c \right) = a * \left( b + c - 7 \right)\]

                  \[ = a + b + c - 7 - 7\]

                  \[ = a + b + c - 14\]

\[\left( a * b \right) * c = \left( a + b - 7 \right) * c\]

                   \[ = a + b - 7 + c - 7\]

                   \[ = a + b + c - 14\]

\[\text{Therefore},\]

\[a * \left( b * c \right) = \left( a * b \right) * c, \forall a, b, c \in R\]

Thus, * is associative on R.