IF `**` is the operation defined by `a** b=a^(b)` for `a, b in N`, then `(2**3)**2` is equal to

If a binary operation * is defined by a*b=a^(2)+b^(2)+ab+1, then (2*3)*2 is equal to (a) 20 (b) 40(c)400(d)445

If a binary operation is defined by a**b=a^(b) , then 3**2 is equal to :

Let * be a binary operation on N defined by a*b = a^(b) for all a,b in N show that * is neither commutative nor associative

If an operation is defined by a*b= a^2+b^2, then (1*2)*6 is

If a binary operation is defined by a**b = a^b then 4**2 is equal to:

If a binary operation is defined by a ast b = a + b then (3 ast 2) ast 4 is equal to: (a) 4 (b) 2 (c) 9 (d) 8

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

On Z an operation * is defined by a*b=a^(2)+b^(2) for all a,b in Z .The operation* on Z is commutative and associative associative but not commutative (c) not associative (d) not a binary operation

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.

If the binary operation * on Z is defined by a*b=a^(2)-b^(2)+ab+4, then value of (2*3)*4 is 233( b ) 33 (c) 55 (d) -55