# How to determine algorithm complexity?

I can't seem to understand how to determine the complexity of algorithms.

For example:

``````for j=n:-1:1
for i=j+1:n
x(i,j)=0
x(j,j)=b(j,j)/c(j,j)
for i=j-1:-1:1
x(i,j)=(b(i,j)-c(i,i+1)*x(i+1,j))/c(i,i)
``````

This is more of a math problem, but still.

I use simple sum formulas and I find the result to be 2·n2 but it seems the correct result is 5·n2/2.

-
what are you asking? –  luketorjussen Aug 29 '11 at 18:39
What do the notations like `j=n:-1:1` mean? –  Gumbo Aug 29 '11 at 18:43
i think it is matlab code –  luketorjussen Aug 29 '11 at 18:50
What are you trying to measure? If you're trying to make sure your constant factor is correct, you need to explain what you're trying to measure. –  comingstorm Aug 29 '11 at 19:17
In other words: for your typical algorithmic complexity analysis, there is no difference between 2n^2 and (5/2)n^2 -- those are both o(n^2). To make a distinction between the two, you must describe what you are counting: inner loop iterations? floating point operations? assembly language commands? –  comingstorm Aug 29 '11 at 19:24