I want to find out the time complexity of the program using recurrence equations. That is ..

```
int f(int x)
{
if(x<1) return 1;
else return f(x-1)+g(x);
}
int g(int x)
{
if(x<2) return 1;
else return f(x-1)+g(x/2);
}
```

I write its recurrence equation and tried to solve it but it keep on getting complex

```
T(n) =T(n-1)+g(n)+c
=T(n-2)+g(n-1)+g(n)+c+c
=T(n-3)+g(n-2)+g(n-1)+g(n)+c+c+c
=T(n-4)+g(n-3)+g(n-2)+g(n-1)+g(n)+c+c+c+c
……………………….
……………………..
Kth time …..
=kc+g(n)+g(n-1)+g(n-3)+g(n-4).. .. . … +T(n-k)
Let at kth time input become 1
Then n-k=1
K=n-1
Now i end up with this..
T(n)= (n-1)c+g(n)+g(n-1)+g(n-2)+g(n-3)+….. .. g(1)
```

I ‘m not able to solve it further. Any way if we count the number of function calls in this program , it can be easily seen that time complexity is exponential but I want proof it using recurrence . how can it be done ?

Explanation in Anwer 1, looks correct , similar work I did.

The most difficult task in this code is to write its recursion equation. I have drawn another diagram , I identified some patterns , I think we can get some help form this diagram what could be the possible recurrence equation.

```
And I came up with this equation , not sure if it is right ??? Please help.
T(n) = 2*T(n-1) + c * logn
```

`g(x) = 2g(x - 1) - g((x - 1) / 2) + g(x / 2)`

, then plug it back in`f(x)`

to solve for f(x). – nhahtdh Mar 24 '13 at 7:57