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Ages old question:

You have 2 hypothetical eggs, and a 100 story building to drop them from. The goal is to have the least number of guaranteed drops that will ensure you can find what floor the eggs break from the fall. You can only break 2 eggs.

Using a 14 drop minimum method, I need help writing code that will allow me to calculate the following:

Start with first drop attempt on 14th floor.

If egg breaks then drop floors 1-13 to find the floor that causes break.

ElseIf egg does not break then move up 13 floors to floor number 27 and drop again.

If egg breaks then drop floors 15-26 starting on 15 working up to find the floor egg breaks on.

ElseIf egg does not break then move up 12 floors to floor number 39 and drop again.

etc. etc. The way this increases is as follows 14+13+12+11+10+9+8+7+6+5+4+3+2+1 So always adding to the previous value, by one less.

I have never written a sorting algorithm before, and was curious how I might go about setting this up in a much more efficient way than a mile long of if then statements.

My original idea was to store values for the floors in an array, and pull from that, using the index to move up or down and subtract or add to the variables. The most elegant solution would be a recursive function that handled this for any selected floor, 1-100, and ran the math, with an output that shows how many drops were needed in order to find that floor. Maximum is always 14, but some can be done in less.

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closed as not a real question by Bobby, CodeGnome, bensiu, RolandoMySQLDBA, 0x499602D2 Jan 22 '13 at 1:56

It's difficult to tell what is being asked here. This question is ambiguous, vague, incomplete, overly broad, or rhetorical and cannot be reasonably answered in its current form. For help clarifying this question so that it can be reopened, visit the help center.If this question can be reworded to fit the rules in the help center, please edit the question.

While expressible recursively, this is not a sort algorithm. –  Chris Schmich May 9 '10 at 20:48
It's not clear what is the purpose of the program you're trying to implement. What are the inputs/outputs? In any case this doesn't look like the algorithm really needs sorting, or recursion. The number of required drops can be calculated analytically in O(1) time . –  Igor Krivokon May 9 '10 at 21:18
FYI, you don't need an array for the floors - the values in the array would be 1-100... which looks a lot like using an integer bounded between 1 and 100 :) This is a common inexperienced programmer mistake. –  Stephen May 9 '10 at 21:34

2 Answers 2

That smells like homework ;o)

Anyway, as "BreakinEggSearch" isn't invented yet (be the first!) you could try something like the binary search algorithm. The rest is up to you (I don't want to spoil all the fun ;o)

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binary search would not work here, because it is not efficient enough. Also it would not always find the solution while breaking only two eggs. However, I wanted some practice writing that word problem with some recursion. Help would be appreciated. –  Peter May 10 '10 at 2:46
I googled a bit and found a solution: blog.taragana.com/index.php/archive/… But hey, I haven't heard of it before and was half right ;o) You should clarify question though. –  das_weezul May 10 '10 at 12:02

You -could- code this recursively -- but honestly, I'd just use two loops to do it, personally. (See analysis beginning next paragraph.) If you haven't coded a recursive algorithm before, go with some of the classic examples (e.g. how to calculate a factorial, how to calculate triangle numbers, how to binary search, etc...) and figure out how those work before choosing an esoteric problem with more difficult analysis.

The requirement of "you can only break two eggs" makes this problem more "interesting". While it's true that each test gives you only "it broke" or "it didn't break" and hence makes this problem a good candidate for binary search, the aforementioned requirement restricts how many "it broke" results you're allowed to get before you're not allowed to try any more eggs.

This really only allows one step of recursion. But, you have to cover the entire N possibilities, so each "step" result in one of sqrt(100) possibilities. (Because sqrt(100) * sqrt(100) = 100, and the entire search space would be covered.)

Drop eggs at 10, 20, 30, ..., 100. If it doesn't break, it's a very strong egg and you can't determine with a building that short how many stories it would take to break the egg. Otherwise, you're going to have to try dropping it at the previous nine stories, too, again, starting from the lowest story first because you can't afford to break it until you absolutely have to.

You ought to be able to reason from here that this is sufficient to meet your requirements and pinpoint which floor is the lowest that will break the egg.

This requires 19 drops at most. (10 through 100 by steps of 10 makes at worst 10 drops, and then checking the last 9 would at worst be 9 drops)

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