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I have analyzed running time of following alogirthm i analyzed theta but can its running time could be Big O?

                               Cost             Time
1.  for i ←1 to n                c1             n   
2.      do for j ← i to n        c2             n
3.          do k ← k+ j          c3             n-1
T(n) = c1n +c2n+c3(n-1)
     = C1n+C2n+C3(n-1)
     = n(C1+C2)+n-1
     = n+n-1
Or T(n) = Ө(n)
So running time is Ө(n)
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I'm confused are these loops back to back? Shouldnt this be 0(n^2). can you explain what you are trying to compute for me, what the symbols mean. i <- 1 <- means equals? –  progenhard Sep 19 '13 at 18:02
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Your calculation is wrong. c3 is a simple sum, and thus a constant-time computation. Moreover, since the three statements are nested one inside the other, their costs must be multiplied, rather than added. The total cost is T(n) = n * n * 1 = O(n^2) –  Giulio Franco Sep 19 '13 at 18:04
    
yes <- means equal –  user1824546 Sep 19 '13 at 18:05
    
but c3 is inside loop so how it would be constant or 1? –  user1824546 Sep 19 '13 at 18:07
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2 Answers

Your loop will continue as follows (well-known arithmetic progression formula):

enter image description here

-which also can be estimated as enter image description here since big-O gives majority estimation.

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if i write time n*n for inner loop then it would be right? –  user1824546 Sep 19 '13 at 18:27
    
That is not n*n for inner loop. That is sum of dependent from outer loop counts (first teta-expression shows that quite well, I think) –  Alma Do Sep 19 '13 at 18:38
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1.  for i ←1 to n                c1             n   
2.      do for j ← i to n        c2             n
3.          do k ← k+ j          c3             1

T(n) = n * n * 1 = O(n^2) @Giulio Franco

It's a nested loop that does a constant time operation in there.

do k ← k+ j is constant because it's a fixed length of time for the operation to take place no matter what inputs you put. k + j

loop(n)
   loop(n)
       constant time(1)

When it's a loop inside a loop you multiply. n*n*1

loop(n)

loop(n)

These loops aren't nested.

this would be n + n

O(n+n) which reduces to O(n)

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