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This is a realistic question in my study design needed to be solved. Please help.

In a 3-cm2 big circle (area=3-cm2, so calculated radius of this big circle=9.77 mm), I need to put 12 small holes (all of same dimension). They should be evenly distributed with 4mm spacing from each other, and should be as close to the edge of the big circle as possible. How to position these small holes and how to calculate radius of the small holes?

Thanks

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This isn't really programming-related. Try mathoverflow.com –  bta Aug 16 '10 at 15:57
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it is programming related. programming is not just a language syntax or a set of technologies to master. –  akonsu Aug 16 '10 at 16:00
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@bta: Really don't try mathoverflow.com. Have you even seen that site? It's for crazy open maths research questions. –  Callum Rogers Aug 26 '10 at 22:56
    
Agree with @Callum. I don't know if this is the most proper site (and I posted an answer), but I am sure mathoverflow isn't. –  belisarius Aug 26 '10 at 23:38

2 Answers 2

Here you have three possible solutions based on different packings:

enter image description here

By the way, the optimal packing for 12 circles is this:

alt text

Although they are not evenly distributed.

HTH!

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+1: For possible layouts and pictures. –  Callum Rogers Aug 26 '10 at 22:58
    
Is it just me, or does the first diagram contain 13 circles? –  Bobby Jack Aug 26 '10 at 23:06
    
@Bobby For 12 or 13 the hex pack is the same. The circle on the center is optional. Going to add that. Tnx –  belisarius Aug 26 '10 at 23:12

start with placing them at the edge and proceed along a spiral towards the center. their radii depend on whether their proximity to the edge is more important than their size.

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Size is not important as long as they are distributed evenly in the big circle and have 4-mm spacing. It is better to place some holes near the big circle edge, but firstly, they should be evenly distributed. I had tried to put 8 holes at the edges (0, 45, 90, 135, 180, 225, 270, 315, 360 degrees). Add 4 near the center of the big circle, the center of each small circle form an equilateral triangle together with the centers of the other 2 small circles located at the big circle edge. But still I can not calculate the radius. Please help. Thanks –  Naomi Aug 16 '10 at 16:16
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suppose you want to put two holes in to a circle. how would you do this to make them evenly distributed? i think your question is vague. –  akonsu Aug 16 '10 at 16:19
    
one more thing: the smaller circles can either be evenly distributed inside the bigger one or they can be as close as possible to the edges. your question says that they must be both. –  akonsu Aug 16 '10 at 16:39
    
How about if just one requirement: 12 smaller circles in a 3-cm2 big circle, with 4 mm spacing apart from nearby small circles? –  Naomi Aug 16 '10 at 18:21
    
i think the smaller circles should be packed as bee cells. i guess there is no more optimal solution. but i cannot prove this. this is a non-trivial problem to solve. –  akonsu Aug 16 '10 at 18:56

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