A function `f` from integers to integers is defined as `f(x)={(n+3, n "is odd"),(n/2 , n "is even"):}`. If `k` is an odd integer and `f(f(f(k)))=27` then the sum of digits of `k` is

A function f from integers to integers is defined as f(n)={(n+3",",n in odd),(n//2 ",",n in even):} Suppose k in odd and f(f(f(k)))=27. Then the value of k is ________

A function f from integers to integers is defined as f(x)={{:(n+3",",nin"odd"),(n//2",",nin"even"):} suppose kin odd and f(f(f(k))) =27 then the sum of sigits of k is

A function f from integers to integers is defined as f(x)={n+3, n in od d n/2,n in e v e n suppose k in odd and f(f(f(k)))=27 . Then the sum of digits of k is__________

A function f:ZrarrZ is defined as f(n)={{:(n+1,n in " odd integer"),((n)/(2),n in "even integer"):} . If k in odd integer and f(f(f(k)))=33 , then the sum of the digits of k is

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

Draw the graph of the function : f(x) = {(" 0 if x is an even integer"),("1 if x is an odd integer" ):}

A function f from the set of natural numbers to integers is defined by n when n is odd f(n)3, when n is even Then f is (b) one-one but not onto a) neither one-one nor onto (c) onto but not one-one (d) one-one and onto both

On the set of integers Z, define f : Z to Z as f(n)={{:((n)/(2)",",,"n is even."),(0",",,"n is odd."):} Then, f is

Show that the function f:N rarr Z, defined by f(n)=(1)/(2)(n-1) when n is odd ;-1/2 n when n is even is both one-one and onto

A mapping f:N rarr N where N is set of natural numbers is destined as f(n)=n^(2),n=odd and 2n+1,n= even for n in N then f is