ChatterBank3 mins ago
Socks
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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?
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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For more on marking an answer as the "Best Answer", please visit our FAQ.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.
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.
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?