I'm trying to solve this recurrence relation. Here's what I've attempted so far, but I think I'm wrong. I would really appreciate some guidance.

This is the recurrence relation I am trying to solve:- **2T(n^1/2) + C**

```
T(n) = 2T(n^1/2) + C
2((2T(n^1/4)+C) + C
>> 4T(n^1/16) + 3C
>> 8T(n^1/256) + 6C
```

So I can formulate it into this algebraic expression:-

```
(2^k)T(n^(1/2^k)) + 2k
```

So to solve the recurrence relation, I simply say

```
n^(1/(2^k)) = 1
Therefore:- 2k = log (base n) 1
But this makes k = 0....
```

I don't think this is correct. Please advise me, I'd be delighted to get some assistance!