Show that `*: Rxx R ->R`given by `a*b = a +2b`is not associative.

Show that **.RxxRrarrR given by a**brarra+2b is not associative.

Prove that **: R xx R to R defined as a ** b =a+2ab is not associative

Show that quad *:R xx R rarr R defined by a*b=a+2b is not commutative.

Consider the binary operations *:" "RxxR ->R and o:" "R" "xx" "R->R defined as a*b|a-b| and a" "o" "b" "=" "a , AA""""a ," "b in R . Show that * is commutative but not associative, o is associative but not commutative.

Show that quad *:R xx R rarr R given by (a,b)rarr a+4b^(2) is a binary operation.

Consider the binary operations*: RxxR->R and o: RxxR->R defined as a*b=|a-b| and aob=a for all a , b in Rdot Show that * is commutative but not associative, o is associative but not commutative. Further, show that * is distributive over o . Dose o distribute over * ? Justify your answer.

Let A be the set of all students of a boys school. Show that the relation R in A given by R = {(a, b) : a is sister of b} is the empty relation and R^(prime) = {(a, b) : the difference between heights of a and b is less than 3 meters} is the un

Consider the binary operations*: RxR rarr and o:RxR rarr defined as a *b=|a-b| and aob=a for all a,b in R. Show that * is commutative but not associative,'o' is associative but not commutative.

Examine whether the binary operation* defined on R by a*b=ab+1 is associative or not.