Let R be the set of real numbers and * b...

Let `R` be the set of real numbers and * be the binary operation defined on `R` as ab=`a+ b-ab AA a, b in R` .Then, the identity element with respect to the binary operation is

Similar Questions

Explore conceptually related problems

Let Q be the set of all rational numbers and * be the binary operation , defined by a * b=a+ab for all a, b in Q. then ,

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 A be the set of all real numbers except -1 and an operation 'o' be defined on A by aob = a+b + ab for all a, b in A , then identify elements w.r.t. 'o' is

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

If * defined on the set R of real numbers by a*b=(3ab)/(7), find the identity element in R for the binary operation *

Let '**' be the binary operation defined on the set Z of all integers as a ** b = a + b + 1 for all a, b in Z . The identity element w.r.t. this operations is

In the set of rational numbers Q, the binary operation 'O' is defined as follows aob = a + b - ab,AA a, b in Q Then, prove that(i) aob = boa.

Define a binary operation on a set.

In the binary operation **: QxxQrarrQ is defined as : (i) a**b=a+b-ab, a,b inQ

Let `R` be the set of real numbers and * be the binary operation defined on `R` as a*b=`a+ b-ab AA a, b in R` .Then, the identity element with respect to the binary operation * is

Similar Questions

Recommended Questions

Let `R` be the set of real numbers and * be the binary operation defined on `R` as ab=`a+ b-ab AA a, b in R` .Then, the identity element with respect to the binary operation is