# Big O Log problem solving

I have question that comes from a algorithms book I'm reading and I am stumped on how to solve it (it's been a long time since I've done log or exponent math). The problem is as follows:

Suppose we are comparing implementations of insertion sort and merge sort on the same machine. For inputs of size n, insertion sort runs in 8n^2 steps, while merge sort runs in 64n log n steps. For which values of n does insertion sort beat merge sort?

Log is base 2. I've started out trying to solve for equality, but get stuck around n = 8 log n.

I would like the answer to discuss how to solve this mathematically (brute force with excel not admissible sorry ;) ). Any links to the description of log math would be very helpful in my understanding your answer as well.

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+1 Beat me to it! –  Vitor Jul 28 '10 at 17:50
Um, can anyone explain what the heck is happening there? The graph is great but we already know the answer was around 44. I wanted to try and understand the math of how to get there. (without wolfram ;) –  j03m Jul 28 '10 at 17:54
You can't solve it exactly. You need to use numerical methods to get the decimal answer. –  Tom Sirgedas Jul 28 '10 at 18:03
Can anyone at least explain the equation wolfram alpha uses? –  j03m Jul 28 '10 at 23:56
The W function is defined as the inverse of the function f(W) = W*e<sup>W</sup>. So really, wolfram's "answer" is really just another equation (but a standard one, I guess). I suppose the square root function is kind of the same, in that it's the inverse function of f(x) = x*x. mathworld.wolfram.com/LambertW-Function.html –  Tom Sirgedas Jul 29 '10 at 1:36

Your best bet is to use Newton;s method.

http://en.wikipedia.org/wiki/Newton%27s_method

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This will converge very quickly on an answer, especially since only integer values of n make sense. Stop iterating when (int)a == (int) b –  Stefan Kendall Jul 28 '10 at 17:48