If f(1) = 1, f(2n) = f(n) and f(2n + 1) = {f(n)}2 - 2 for n = 1, 2, 3, ... , then the value of f(1) + f(2) + ... + f(25) is
1
- 15
- 17
- 1
A.
1
Given that, f(1) = 1,
f(2n) = f(n), f(2n + 1) = {f(n)}2 - 2
In a class of 80 students numbered 1 to 80, all odd numbered students opt for cricket, students whose numbers are divisible by 5 opt for football and those whose numbers are divisible by 7 opt for hockey. The number of students who do not opt any of the three game is
13
24
28
52
A function f satisfies the relation f(n) = f(n2) + 6 for and f(2) = 8. Then, the value of f(256) is
24
26
22
28
If * is the operation defined by a b = ab for a, b N, then (2 * 3) * 2 is equal to
81
512
216
64
Let f(x) = x3 and g(x) = 3*. The values of A such that g[f (A)] = f[g(A)] are
0, 2
1, 3
0, 3
0,
For all rest numbers x and y, it is known as the real valued function f satisfies f(x) + f(y) = f(x + y). If f(1) = 7, then is equal to
7 x 51 x 102
6 x 50 x 102
7 x 50 x 102
7 x 50 x 101