# Calculating time complexity when number of elements is not given in algorithm

I want to find the data at i'th position from end in a linked list. I have written this code using recursion :

NODE STRUCTURE :

``````struct Node
{
int data;
struct Node * next;
}
``````

CODE :

``````int i = 10;

int find ( Node * ptr, unsigned int count )
{
if( nullptr == ptr )
{
++ count;
return count;
}

count = find ( ptr->next , count );
if( i == count )
{
std::cout << "Successful here: " << ptr->data << std::endl;
exit ( -1 ) ;
}

else
{
++ count;
return count ;
}
}
``````

I have basic idea about calculating time complexities using recurrence relations. But I am not able to write the relation itself. Can some one give a direction ?

From what I understand, I am dividing the problem to one less elements each time (by moving to the next node).

So it should be something like

T(n) = T(n-1) + Constant

Could Tree method or any other method be any better in such a situation ?

-

It is fairly simple.

``````T(n) = T(n-1) + Constant
``````

What you also need are your end condition. The first is you find element n. The second is your array has only m element where m < n.

So since your `count` is increasing for every iteration we have to change the time complexity sequence a bit to

``````T(i,c) = T(i-c, c+1) + Constant
``````

This is because you declared i to be the index you want to find.

So now for the first end condition we can write

``````T(0,i) = Constant
``````

And for the second end condition is exactly the same as `T(m,0)` so if i > m we just switch i to m for the complexity.

Now lets assume that Constant is equal to 1.

Then we get the following equation

``````T(i,0) = T(i-0,1) +1 = T(i-1,2) +2 = T(i-2,3) +3 = T(i-3,4) +4 = .... = i+1
``````

So the complexity is `T((min(i,m),0) = i+1` or `T(i,0)` is in `O(i)`.

You could change your code to

``````int find ( Node * ptr, unsigned int i ){
if( nullptr == ptr )
return i;

if( i == 0 )
{
std::cout << "Successful here: " << ptr->data << std::endl;
return 0;
}
return find ( ptr->next , --count );
}
``````

So you would then have the sequence `T(n) = T(n-1) + Constant`

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