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The solutions of one of my homework assignments was posted up just now and I gota question wrong. It is pertaining to finding the worst case number of times an algorithms performs a multiplication operation (T(n)).

function power2n(n)
  counter = n
  product = 1
  while (counter > 0) {
    product = product * n * n
    counter = counter - 1
  }
  return product

According to my teacher, the worst case is 2n, but I don't understand why..

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It seems a bit pedantic to say this is O(2N) and not O(N) –  VoronoiPotato Oct 23 '13 at 18:45
    
I think the teacher was being specific about 2n, not O(2n). In practice, a 2x increase in speed is nothing to sneeze at, and the number of multiplications this function performs can be greatly reduced. Note that n*n is independent of counter, and can be precomputed. –  chepner Oct 23 '13 at 18:51
1  
@VoronoiPotato: Not only pedantic, but wrong. We never keep the constant multipliers in Big-O notation. Even if it's a million. –  AndyG Oct 23 '13 at 19:01
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1 Answer

Watch the variable counter. How does it change? It is initially n, and then it decrements by 1 for each iteration of the loop, so we know the loop will execute exactly n times.

Now, how many multiplications are performed?

We know for certain that there are 2 multiplications per loop (n*n*product).

So overall there will be n*(2) = 2n multiplications performed. In Big O notation this remains O(n)

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Pedantic point: as @chepner points out, n * n can be precomputed. The compiler may spot this and hence only perform n multiplications. –  Stefan Oct 23 '13 at 18:55
    
Good point, @Stefan. That's definitely possible. Fortunately that doesn't change the complexity, so I'll leave the post as-is. –  AndyG Oct 23 '13 at 18:59
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