Here's my attempt:

A function, f(n) is O(n), if and only if there exists a constant, c, such that f(n) <= c*g(n).

Using this definition, could we say that the function f(2^(n+1)) is O(2^n)?

In other words, does a constant 'c' exist such that 2^(n+1)) <= c*(2^n)? Note the second function (2^n) is the function after the Big O in the above problem. This confused me at first.

So, then use your basic algebra skills to simplify that equation. 2^(n+1)) breaks down to 2 * 2^n. Doing so, we're left with:

2 * 2^n <= c(2^n)

Now its easy, the equation holds for any value of c where c >= 2. So, yes, we can say that f(2^(n+1)) is O(2^n).

Big Omega works the same way, except it evaluates f(n) **>=** c*g(n) for some constant 'c'.

So, simplifying the above functions the same way, we're left with (note the >= now):

2 * 2^n **>=** c(2^n)

So, the equation works for the range 0 <= c <= 2. So, we can say that f(2^(n+1)) is Big Omega of (2^n).

Now, since BOTH of those hold, we can say the function is Big Theta (2^n). If one of them wouldn't work for a constant of 'c', then its not Big Theta.

The above example was taken from the Algorithm Design Manual by Skiena, which is a fantastic book.

Hope that helps. This really is a hard concept to simplify. Don't get hung up so much on what 'c' is, just break it down into simpler terms and use your basic algebra skills.

best caseandworst casehave nothing to do with big O/Theta notation. These (big O/Theta) are mathematical sets that includefunctions. An algorithm is not said to be`Theta(f(n))`

if the worst case and best case are identical, we say it is`Theta(f(n))`

worst case(for example), if the worst case is both`O(f(n))`

and`Omega(f(n))`

, regardless of the behavior of the best case. – amit Aug 27 '12 at 8:49worst caseof insertion sort is`Theta(n^2)`

, since you can give a lower bound on how many ops will be needed on a worst case input (reversed order array), and it will be quadric in the number of elements. There is no sense talking about complexity of an algorithm without indicating under what analyzis it is calculated. Usually when the analyzis is omitted - itimplicitlymeans that the complexity is calculated under theworst case analyzis. If we use this convention, insertion sort is`Theta(n^2)`

[worst case analyzis is implicit in this claim]. – amit Aug 27 '12 at 10:24