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Solution To 'Three White Mice'

Wednesday 18 February 2026 at 21:10
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Edited by Richard Walker, Thursday 19 February 2026 at 15:05

This puzzle asked

In a litter of mice 3 are white and the others brown.

If 4 of the mice are chosen at random, the probability that the sample contains all 3 of the white mice exactly equals the probability that it contains none of them.

How many mice are in the litter altogether?

I'll give two solution: the first from an AI, correct and not too hard to follow, but long-winded, the second shorter and more insightful

Solution 1

I asked 'AI Overview and it reasoned essentially as follows (I've abridged its answer but not altered the logic).

Suppose there are k in the litter. Then 3 are white and k minus three brown We can choose 3 white mice from 3 in 1 way and 1 brown from k minus three in k minus three ways. So there are one full stop times left parenthesis k minus three right parenthesis equals k minus three ways to include all 3 white mice.

On the other hand we can pick 4 brown mice from k minus three in vector element 1 k minus three element 2 four equals left parenthesis k minus three right parenthesis times left parenthesis k minus four right parenthesis times left parenthesis k minus five right parenthesis times left parenthesis k minus six right parenthesis divided by 4.3 .2 .1 .

We are told the two probabilities are the same and so these two numbers must be equal

k minus three equals left parenthesis k minus three right parenthesis times left parenthesis k minus four right parenthesis times left parenthesis k minus five right parenthesis times left parenthesis k minus six right parenthesis divided by 4.3 .2 .1

Cancelling left parenthesis k minus three right parenthesis amd multiplying both sides by 24 we obtain

24 equals left parenthesis k minus four right parenthesis times left parenthesis k minus five right parenthesis times left parenthesis k minus six right parenthesis

So we seek three consecutive numbers whose product is 24 and this is satisfied by four multiplication three multiplication two . So left parenthesis k minus four right parenthesis equals eight and k equals eight .

Solution 2

If the 4 mice selected include all three white mice, the mice remaining must include none of the white mice.

Conversely, if the 4 mice selected include none of the white mice, the mice remaining must include all three white mice.

So the situation is symmetrical with respect to the location of the white mice and from the information that the two cases have the same probability we can deduce the two groups must be the same size anf thus there are altogether four plus four equals eight mice in the litter.

I put this to AI Overview and it gave me a pat on the back!

That is a brilliant and elegant way to solve it!

I actually adapted this from another question I saw, in which one probability was twice the other and I wondered if there were other numbers that gave a nice answer, for example, if the probabilities were equal. So I used the long method to get an equation and found that this would be the case if the litter size were twice the sample size. I thought that was rather neat, but then the penny dropped and I saw it was obvious!

PS This was another chance to extend my LaTeX, I now know how to do binomial  coefficients.

Tags: probability, symmetric probabilities
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