# How does one calculate the runtime of an algorithm?

I've read about algorithm run-time in some algorithm books, where it's expressed as, `O(n)`. For eg., the given code would run in O(n) time for the best case & O(n3) for the worst case. What does it mean & how does one calculate it for their own code? Is it like linear time , and is it like each predefined library function has their own run-time which should be kept in mind before calling it? Thanks...

A Beginner's Guide to Big O Notation might be a good place to start:

http://rob-bell.net/2009/06/a-beginners-guide-to-big-o-notation/

also take a look at Wikipedia

http://en.wikipedia.org/wiki/Big_O_notation

there are several related questions and good answers on stackoverflow

What is a plain English explanation of "Big O" notation?

and

Big-O for Eight Year Olds?

Should't this be in math?

If you are trying to sort with bubble sort array, that is already sorted, then you can check, if this move along array checked anything. If not, all okey -- we done.

Than, for best case you will have O(n) compraisons(n-1, to be exact), for worst case(array is reversed) you will have O(n^2) compraisons(n(n-1)/2, to be exact).

More complicated example. Let's find maximum element of array. Obvilously, you will always do n-1 compraisons, but how many assignments on average? Complicated math answers: H(n) -1.

Usually, It is easy to Your Answerget best and worst scenarios, but average require a lot of math.

I would suggest you read Knuth, Volume 1. But who would not?

And, formal definition:

f(n)∈O(g(n)) means exist n∈N: for all m>n f(m)