I'm having a hard time understanding the following statements from Algorithms by S. Dasgupta, C.H. Papadimitriou, and U.V. Vazirani - page 24 that they represent the sum of O(n) as O(n^{2}). But my understanding of O(n) is a linear function of n, and it can never be quadratic no matter how many times the linear functions are **added** (for any given n). They are giving the explanation like below for the example of 13 x 11 in binary notation.

```
1 1 0 1
x 1 0 1 1
----------
1 1 0 1 (1101 times 1)
1 1 0 1 (1101 times 1, shifted once)
0 0 0 0 (1101 times 0, shifted twice)
+ 1 1 0 1 (1101 times 1, shifted thrice)
----------------
1 0 0 0 1 1 1 1 (binary 143)
```

If x and y (1101 and 1011 here) are both n bits, then there are n intermediate rows, with lengths of up to 2n bits (taking the shifting into account). The total time taken to add up these rows, doing two numbers at a time, is

O(n) + O(n) + ... + O(n), which is O(n, quadratic in the size of the inputs.^{2})

Sorry if this is obvious, but could somebody please help me understand why this is O(n^{2})?

`<sup>`

and`</sup>`

(and, of course,`sub`

for subscripts). You can even nest`sup`

to get super-superscripts. – paxdiablo Aug 10 '10 at 13:46