`a* b =ab+1` `AA a,b in R` then:

Consider the binary opertions **: R xx R to R and o : R xx R to 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. Further, show that AA a,b,c in R, a ** (b o c) = (a**b) o (a **c). [If it is so, we say that the opertion ** distributes over the opertion 0]. Does o distribute over ** ? Justify your answer.

Determine which of the following binary opertions on the set R are associative and which are commutative. (a) a **b =1 AA a, b in R (b) a **b = ((a +b))/( 2) AA a,b in R

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)

If a is a unit vector, a xx r = b, a. r = c, a.b = 0 then r is

If f(a-x) = f(a+x) and f(b-x)=f(b+x)AA x in R where a, b (a gt b) are constants then the period of f(x) is

If f is continuous on [a,b] and differentiable in (a,b) (ab gt 0 ) , then there exists c in (a,b) such that (f(b)-f(a))/((1)/(b) - ( 1)/(a))=

If a,b,c are three vectors such that a + b + c = 0, |a| = 1, |b| = 2, |c| = 3 then a.b+ b.c + c.a =