On the set Z of integers, if the binary operation * is defined by `a*b=a+b+2,` then find the identity element.

On the set Z of all integers a binary operation * is defined by a*b=a+b+2 for all a,b in Z. Write the inverse of 4.

Consider the binary operation on Z defined by a ^(*)b=a-b . Then * is

On the set Z of integers a binary operation * is defined by a*b=ab+1 for all a,b in Z Prove that * is not associative on Z

For the binary operation * on Z defined by a*b=a+b+1 the identity element is (a)0(b)-1(c)1(d)2

On Q,the set of all rational numbers,a binary operation * is defined by a*b=(ab)/(5) for all a,b in Q. Find the identity element for * in Q Also,prove that every non-zero element of Q is invertible.

If the binary operation * on the set Z is defined by a a^(*)b=a+b-5, then find the identity element with respect to *

Let * be a binary operation o Q defined by a^(*)b=(ab)/(4) for all a,b in Q,find identity element in Q

On Z, the set of all integers,a binary operation * is defined by a*b=a+3b-4 Prove that * is neither commutative nor associative on Z.

On the set of integers I, if a binary operation 'o' be defined as aob = a - b for every a, b in I , then :

Let Z be the set of all integers, then , the operation * on Z defined by a*b=a+b-ab is