Let f(n) denotes the number of different ways, the positive integer n ca be expressed as the sum of the 1's and 2's. for example, f(4)=5.
i.e., `4=1+1+1+1`
`=1+1+2=1+2+1=2+1+1=2+2`
Q. The value of f{f(6)} is

Let f(n) denotes the number of different ways, the positive integer n ca be expressed as the sum of the 1's and 2's. for example, f(4)=5. i.e., 4=1+1+1+1 =1+1+2=1+2+1=2+1+1=2+2 Q. The number of solutions of the equation f(n)=n , where n in N is

Let f(n) denotes the number of different ways, the positive integer n ca be expressed as the sum of the 1's and 2's. for example, f(4)=5. i.e., 4=1+1+1+1 =1+1+2=1+2+1=2+1+1=2+2 Q. In a stage show, f(4) superstars and f(3) junior artists participate. each one is going to present one item, then the number of ways the sequence of items can be planned, if no two junior artists present their items consecutively, is

Let f(n) denote the number of differenor ways in which the positive integer 'n' can be expressed 1s and 2s. f(4) = 5{2 + 2, 2 + 1 + 1. 1 + 2 +1.1 +1 +2 .1 +1 +1 + 1). Now that order of 11s and 2s.for examimportant. Then determine f(f(6))

f (1) = 1, n> = 1f (n + 1) = 2f (n) +1 then f (n) =

If f(1) = 1 and f(n + 1) = 2 f(n) + 1, if n ge 1, then f(n) is.

If I,n are positive integers, 0 < f < 1 and if (7+4sqrt3)^n=I+f , then the value of (I+f)(1-f)=

Let E=(1,2,3,4) and F-(1,2) . Then the number of onto functions from E to F is: