But it does, compare these two here:-
And gives a tree like this:-
http://premium1.uploadit.org/jokester//probability2.jpg
Once you remove the BB case, gives you the 2/3 chance that one sibling is a boy.
is a totally different question to:-
In which case the tree is (adding in age relationship to show it makes no odds):-
By specifying the daughter is older/younger merely removes one side of the tree and ultimately still landing you with 50/50 odds.
Ok I thought about this last night and I'm fairly sure I can explain it and leave little or no doubt
The tree above only works in the event that the father introduces you to his daughter without HIM knowing the sex of his other child. If he does NOT know the sex of the other child, then that tree works perfectly and the chance of his other child being a boy or a girl is 1/2.
It may not seem intuitive, but because he KNOWS about both children BEFORE he tells you about (introduces you to) ONE of them, then it is this PRIOR knowledge of HIS that affects the probability.
For example if in true OcUK style a guy goes out and pulls a girl, sleeps with her and to show that he is truley Alpha he gets out of bed and pulls her flat mate and sleeps with her too.
Both girls later have a child, but don't tell the father.
Later in life one of the children (a girl) tracks her dad down and says hi.
The probability of the other child (could be older / could be younger) being a boy or a girl is still 50/50.
However, if he had met BOTH children and THEN introduces you to
a (this is crucial) daughter. The probability of his other child being a boy is now 2/3.
Hard to believe I know, but I'll try to be as clear as I can....
The birth of any child is like the toss of a coin and can equally result in a 50/50 outcome (boy/girl, or heads/tails).
But the OP is not about simply saying that you know the outcome of ONE birth and so what is the probability of the OTHER birth being a boy! It is about the father KNOWING the outcome of BOTH births and then telling you some information about ONE of them! It is the fact that he KNOWS BOTH outcomes BEFORE telling you something about it that changes the probability - because the question is not just simply about the 'next'/'previous' birth, but actually about him KNOWING BOTH children and revealing information about only ONE.
It is subtly different and I'll try to give you an example, which I hope will remove any doubt!
If I throw TWO coins and hide them in a cup (without seeing them). Just by looking at ONE of the coins I can make no prediction about the OTHER. The chance that the other coin is a head or a tail, does not change whether I show a head or a tail for the uncovered coin.
However if I get to see BOTH coins and then tell you that one of them is a TAIL, then the chances that the other coin is a HEAD are now 2/3. This is simply based on the fact that I have seen BOTH coins BEFORE telling you about them.
I'm sure you agree that if I throw 2 coins (can be simultaneously, or can be one after the other, it doesn't matter), then on average I will get:
HH
TH
HT
TT
Each coin results in a 50/50 split between heads and tails (2 heads and 2 tails each).
If I DON'T see either coin and then uncover only 'Coin1', then whether it is a head or a tail, has no effect on the chances of the other being a head or a tail.
For example, if I uncover coin1 in the example above, then on 1 occasion coin2 is a head and in the other coin2 is a tail (so a 50/50 outcome for the other coin)
HOWEVER, if I uncover BOTH coins and look at them and then tell YOU that ONE of the coins is a tail. Now you can see that there are 3 ways (of equal probability) in which I would be able to tell you I have 1 tail. Of those 3 ways, 2 of them result in the other coin being a head. So the chances are 2/3.
It all revolves around KNOWING BOTH outcomes and then RETROSPECTIVELY giving information about ONE of those outcomes.
