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I am learning about big O and recurrences. I encountered a problem that mentioned,

t = { 0, n =1 ; T(n-) , n > 1 }

Can anyone tell me how to get to O(n^2) from this ?

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What language is this? –  Karl Barker Feb 25 '12 at 13:14
    
I think your formula is flawed. Did you mean t = { 0 if n == 1 ; T(n-1) if n > 1} ? (though it's not O(n²)) –  Franck Dernoncourt Feb 25 '12 at 13:30
    
The question as it is now is unsolveable. for starters, what is T() [note that this is not recursive equation, the left side of the equation is a constant t and not a function T:N->N]. What does n- mean? Please check your text book and bring the question correctly. –  amit Feb 25 '12 at 13:56

2 Answers 2

up vote 0 down vote accepted

The functioin in your question have the complexity O(n) if it was O(n²) it should look like this:

T(x) = { 1, x =0 ; n + T(x-1) , x > 1 }

wheer n is the number of calculations for t(x) then x /= 0

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2  
For the function you provided, T(x) =n^x. You probably meant T(n) = n + T(n-1), but it also could be T(n) = 4T(n/2) + 1, or infinite number of possibilities. –  amit Feb 25 '12 at 17:37
    
still wrong, look at the editted comment. –  amit Feb 25 '12 at 17:40

I do no quite understand what you are trying to ask. But, typically, O(n^2) algorithms will feature the main operation being executed inside 2-Level nested loops. Like:

 for(a=0;a<5;a++) {
     for(b=0;b<5;b++) {
       /* Some of the main operations of the algorithm */
     }
  }

Similarly, 3-Level nested loops containing the main operations of the algorithm are likely to have complexity of O(n^3) and so on.

(Note: Exceptions may be there to the above methods)

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