On the set Z of all integers define `f : Z-(0) rarr Z` as follows
`f(n)= {(n/2, n \ is \ even) , (2/0 , n \ is \ odd):}` then f is

Let f:N rarr N defined by f(n)={{:((n+1)/(2) " if n is odd"),(n/2" if n is even"):} then f is

Let I be the set of integer and f : I rarr I be defined as f(x) = x^(2), x in I , the function is

On the set Z , of all integers ** is defined by a^(**)b=a+b-5 . If 2^(**)(x^(**)3)=5 then x=

A function f from the set of natural numbers to integers defined by : f(n)={:[((n-1)/(2)",""when n is odd"),(-(n)/(2)",""when n is even"):} is :

Let R be a relation on the set Z of all integers defined by:(x,y) in R implies(x-y) is divisible by n.Prove that (b) (x,y) in R implies(y,x) in R for all x,y,z in Z .

Let R be a relation on the set Z of all integers defined by:(x,y) in R implies(x-y) is divisible by n is eqivalence

Prove that 2^(n) gt n for all positive integers n.

Let f: N rarr N be defined by f(x)=x^(2)+x+1 then f is

If f(x) = (a-x^n)^1/n, a gt 0 , n is a postive integer then f[f(x)]=