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factor-fiction | 08:39 Mon 27th Oct 2014 | Science
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Wildwood's query about dice and probabilities reminded me of a problem I came across recently which showed that even fairly able mathematicians can get confused by probability.

Suppose you have a sock drawer which contains just 1 pair of white socks and 1 pair of black socks. These black socks and white socks are all the same size and feel exactly the same. Now imagine that the 4 separate socks had been thrown in straight from the tumble drier and so are not paired up. Also imagine that you get dressed in the dark and pull out two socks at random. What are the chances you will pull out a pair of matching socks?
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Avatar Image jim360
Doesn't matter what sock you pull out at first, so long as the second matches, which will occur 1/3 of the time. In general the answer is 1/(n-1) where n is the total number of socks.

At least, I think it's that.
08:44 Mon 27th Oct 2014
Avatar Image bhg481
I would argue 1 in 3.

The first sock can be either colour. There are then 3 socks remaining in the drawer and only 1 of them will do to make the pair.
08:45 Mon 27th Oct 2014
Avatar Image Prudie
I'm nervous to give an answer but make it 1/3
08:45 Mon 27th Oct 2014
Avatar Image factor-fiction
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Most people I asked thought it would obviously be an even chance, arguing you can either get 'white white', 'white black', 'black black' or 'black white'
08:57 Mon 27th Oct 2014
Avatar Image jim360
Yes I can see why people might come up with that -- the point here is that the combinations are "right right", "right wrong", "right wrong" -- the first sock doesn't matter.

Probability is only confusing if you make it so. Drawing a probability tree makes it rather a lot easier, always. That and paying attention to the actual question, which everyone has a problem with pretty much all the time in maths.
09:01 Mon 27th Oct 2014
Avatar Image Retrochic
You need a pair and it does'nt stipulate if the pair is a black pair or white pair so the choices are a pair (W/W, or B/B) OR no pair ( W/B). I would say the chances are 1 in 2
09:10 Mon 27th Oct 2014
Avatar Image jim360
Definitely 1/3 -- draw the full probability tree and you'll see that you can get "no pair" twice as often as you get a pair.
09:13 Mon 27th Oct 2014
Avatar Image jim360
If we label the socks as W, w, B, b, then the full event space is:

Ww WB Wb wW wB wb Bb BW Bw bB bW bw

ie 12 possible draws of two socks, all of equal probability 1/12=(1/4)*(1/3). Only four of these combinations lead to matching pairs, for a total chance of 4/12 or 1/3.
09:19 Mon 27th Oct 2014
Avatar Image woofgang
I agree, once you have picked a sock, its one in three.
09:21 Mon 27th Oct 2014
Avatar Image factor-fiction
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And it's one in three even before you pick a sock isn't it?
09:24 Mon 27th Oct 2014
Avatar Image sunny-dave
Yes - I just did the same analysis as Jim (using B1 B2 and W1 W2 as it happens) - the confusion about 50/50 is because that ignores the fact that there are twice as many ways of getting WB or BW than WW or BB.

W1 W2
W1 B1
W1 B2

etc
09:28 Mon 27th Oct 2014
Avatar Image joggerjayne
Yes, it is, ff.

If socks 1 and 2 are black, and socks 3 and 4 are white ...

Before you dip into the drawer, there are only six "two sock" combinations that you can pull out ...

1,2 ... 3,4 ... 1,3 ... 2,4 ... 1,4 ... 2,3

Of those six combinations, two of them (1,2 and 3,4) will make a pair.
09:29 Mon 27th Oct 2014
Avatar Image Retrochic
You only have one go to pull out a pair, you can't ' double dip'. You have two choices -to pull out a matching pair or an unmatched pair -forget what colour they are its irrelevant, you have 1 in two chances of getting a pair.
09:30 Mon 27th Oct 2014
Avatar Image jim360
Do the analysis yourself retrochic, you'll see it's 1/3. It has to be: more simply, if you think about what you are left with after pulling out the first sock, there are three left, of which only one matches what you already have.
09:32 Mon 27th Oct 2014
Avatar Image sunny-dave
There are twice as many 'wrong' pairs as 'right pairs' in the drawer, retrochic.
09:33 Mon 27th Oct 2014
Avatar Image factor-fiction
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Thanks everyone. I'm glad I went for the slimmed down version of the question. (The one I saw in The Guardian was the same except it involved 4 black and 4 white socks so would have been a 3 in 7 chance I think)
09:37 Mon 27th Oct 2014
Avatar Image jim360
If you're insisting that the socks are drawn out at the same time, then the event space would only reduce to:

Ww, WB, Wb, wb, wB, Bb

ie six combinations of which only two match -- still 1/3, still twice as many wrong pairs, etc.
09:37 Mon 27th Oct 2014
Avatar Image sunny-dave
But what if they were striped socks, factor?
09:39 Mon 27th Oct 2014
Avatar Image jim360
Black with white stripes or white with black stripes?
09:39 Mon 27th Oct 2014
Avatar Image Retrochic
ok I must be reading this question incorrectly. 'what are the chances you will pull out a pair of matching socks' Does this mean you get more than one go at getting a pair? There are only two variables -pair or non pair, if you have a non pair and are then allowed to go back in and pick another sock then that changes the equation. Doesn't it?
09:40 Mon 27th Oct 2014

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