I am trying to find the time complexity for selection sort which has the following equation

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

First I supposed its T(n)=T(n-1)+n .. n is easier though..

Figured `T(n-1) = T(n-2) + (n-1)`

and `T(n-2) = T(n-3) + (n-2)`

This makes `T(n) = (T(n-3) + (n-2)) + (n-1) + n`

so its `T(n) = T(n-3) + 3n - 3`

..

K instead of (3) .. `T(n) = T(n-k) + kn - k`

and because n-k >= 0 .. ==> `n-k = 0`

and `n=k`

Back to the eqaution its.. `T(n) = T(0)// which is C + n*n - n`

which makes it `C + n^2 -n`

.. so its O(n^2).. is what I did ryt??

`T(n-k) + kn - k`

, but`T(n-k) + kn - sum_{1 to k-1} j`

. – Daniel Fischer Mar 3 '13 at 17:08`T(n-k) + (n-(k-1)) + (n-(k-2)) + ... + (n-1) + n`

– Daniel Fischer Mar 3 '13 at 18:33