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Consider the following pseudo code. What is the total number of multiplications to be performed?

D = 2
for i = 1 to n do
   for j = i to n do
      for k = j + 1 to n do
           D = D * 3

Well I came across this question while learning to figure out complexity of algorithms. How can one go about solving these types of questions its easy to say it has a upper bound of O(n^3) but how to find out exact number of multiplications.

2 Answers 2

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The following calculations will give the exact number of multiplications in your code.

EDIT: As stated in the comments, the final result can indeed be simplified by two.

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  • Wow that is some simplification. Thanks a lot mate!
    – AbsoluteSith
    Sep 15, 2014 at 0:10
  • 1
    And one more thing could I know the simplification used where (n-j) reduces to j and range changes from j=i->n to j=0->n-i? And also how(n-i)(n-i+1) reduces to i^2+i
    – AbsoluteSith
    Sep 15, 2014 at 1:00
  • It's just a variable substitution to get back to the a basic sum of k elements. The only thing is I kept the same name j, which can be a little confusing, but it is the same as if I wrote k = n-j. It might not be crystal clear, but it's quite hard to explain it here in a comment... Is it?
    – BlackDwarf
    Sep 15, 2014 at 1:03
  • You can simplify the final result by two.
    – JulienD
    Oct 5, 2015 at 8:57
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enter image description here . [sorry , I was unable to use latex here]

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