Let f : N `rarr` N be defined by
f(n) = `{{:((n+1)/(2), if "n is odd"),((n)/(2),"if n is even"):}`
Show that f is many one and onto function.

If f:N to N is defined by. f(n)={((n+1)/(2)", if n is odd"),((n)/(2)", if n is even"):} for all n in N . Find whether the function f is bijective.

Let f : Z rarr Z be a function defined by f(n) =3n AA n in Z and g: Z rarrZ be defined by g(n) = {{:((n)/(3),"if n is a multiple of 3"),(""0, "if n is not a multiple of 3"):} Show that gof = I_(z) and fog ne I_(z) .

Show that f : N to N , given by f(x)= {(x+1", if x is odd"),(x-1", if x is even"):} is bijective (both one-one and onto).

Let f:N to N be defined by f(x) =x+2 . Then, find whether f is injective.

Let A = R-{2} and B = R - {1}. If f : A rarr B is a function defined by f(x)= (x-1)/(x-2) then show that f is one-one and onto. Hence, find f^(-1) .

Let ~ be defined by (m,n)~(p,q) if mq=np where m, n, p, qinZ -{0}. Show that it is an equivalence relation.

Let f : N rarr Y be a function defined as f(x) = 4x +3, where Y = {Y in N: y = 4x +3 for some x in N). Show that f is invertible. Find the inverse.

Let R={(m,n):2 divides m+n} on Z. Show that R is an equivalence relation on Z.

If (f(x))^(n) = f(nx) , find (f'(nx))/(f'(x)) .

Let n be positive integer and a function f be defined as f(n)={(0 , when n=1),(r([n/2])+1,when n>1):} then find f(35).