I have the following worked out:
T(n) = T(n  1) + n = O(n^2)
Now when I work this out I find that the bound is very loose. Have I done something wrong or is it just that way?
I have the following worked out:
Now when I work this out I find that the bound is very loose. Have I done something wrong or is it just that way? 


Think of it this way: 


You need also a base case for your recurrence relation.
To solve this, you can first guess a solution and then prove it works using induction.
First the base case. When n = 1 this gives c as required. For other n:
So the solution works. To get the guess in the first place, notice that your recurrence relationship generates the triangular numbers when c = 1:
Intuitively a triangle is roughly half of a square, and in BigO notation the constants can be ignored so O(n^2) is the expected result. 


Looks about right, but will depend on the base case T(1). Assuming you will do n steps to get T(n) to T(0) and each time the n term is anywhere between 0 and n for an average of n/2 so n * n/2 = (n^2)/2 = O(n^2). 

