# Calculate running time using samples

This is a homework question but I am asking for general purpose as I wanted to understand how to do it.

Suppose that you time a program as a function of N and produce the following table.

``````        N   seconds
-------------------
4096      0.00
16384      0.01
65536      0.06
262144      0.51
1048576      4.41
4194304     38.10
16777216    329.13
67108864   2842.87
``````

Estimate the order of growth of the running time as a function of N. Assume that the running time obeys a power law T(N) ~ a N^b.

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What is the lone `1` doing in the line `4194304 38.10`? –  nhahtdh Feb 11 at 18:23
@nhahtdh sorry I modified it :) –  Mohamed Naguib Feb 11 at 18:24
get rid of the first point... it's below the resolution of the timer. –  thang Feb 11 at 19:45

Your N's are all consecutive powers of 4. Taking 4-based logarithm of consecutive ratios of times you'll see they converge to some constant which is known as 'b'. When you substitute N, T(N) and b from last entry of your table to power law (T(N) = a * N ^ b), you'll get 'a'. In your case log4 of times ratios converges to 1.555, so that's 'b'.

I guess you're taking Coursera's "Algorithms, Part I' course (as I do). Then, this thread must be available for you:

Or, you may refer to "Analysis of Algorithms" slides beginning from page 16.

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You need to to use a logarithmic graph (logN), and then take the slope of the line. That will indicate the exponent b.

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You can calculate the slope between every two samples for the entire sample set. You can then do this recursively (slope of slopes). That should give you `b`

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