`a**b = (ab)/(1)` defined on Q. Inverse of `0.001` is…........

If a**b=(ab)/3 on Q^+ then the inverse of a(a ne0) for ** is ......

Find the value of log_(10)0.001

** is defined by a**b = a +b -1 on Z , then identity element for ** is .........

The identity element for the binary operation ** defined on Q ~ {0} as a**b = (ab)/2' AA a,b in Q - {0} is .........

Inverse of (7,0) does not exists.

A is a 3xx4 matrix .A matrix B is such that A'B and BA' are defined . Then the order of B is ……..

If a**b = a +b - ab on Q^(+) , then the identity and the inverse of a for ** are respectively ..........

If a**b=(ab)/3 on Q^(+) , then 3**(1/5**1/2) is .......

For each opertion ** difined below, determine whether ** isw binary, commutative or associative. (i) On Z, define a **b =a - b (ii) On Q, define a **b =ab +1 (iii) On Q, define a **b = (ab)/( 2) (iv) On Z ^(+), define a **b = 2 ^(ab) (v) On Z ^(+), define a **b=a ^(b) (vi) On R - {-1}, define a **b= (a)/( b +1)

Let ** be the binary operation defined on Q. Find which of the following binary operations are commutative. a**b=a+ab, AA a,b in Q