With temp 0 this morning:

  First, we know that Bobby has 3 sisters. 

  Second, we know that each sister has 2 brothers. 

  This might initially seem like Bobby has 6 brothers (3 sisters x 2 brothers), but we have to remember that all the sisters have the same brothers. 

  So, Bobby actually has 2 brothers.

And again:

  First, we know that Bobby has 3 sisters. 

  Second, we know that each sister has 2 brothers. 

  This might initially seem like Bobby has 6 brothers (3 sisters x 2 brothers), but we have to remember that all the sisters have the same brothers. 

  So, Bobby actually has 2 brothers. The sisters' 2 brothers are Bobby and his other 2 brothers.

But with temperature =1 (the default on the playground):

  Since each of Bobby's sisters has 2 brothers, that means there are only 2 boys in the family - Bobby and one more boy. So, Bobby has one brother.

again

  Bobby has 3 sisters. Each of these sisters has 2 brothers. We might initially think that this means Bobby has 2 brothers, but remember: Bobby himself is one of the brothers. So in reality, Bobby has only one other brother, because the two brothers the sisters have are Bobby and his other brother.

again

  Firstly, Bobby has 3 sisters. 

  Secondly, each of his sisters has 2 brothers. This would mean there are only 2 male siblings in the family. One of them is Bobby.

  Therefore, Bobby only has 1 brother. So, Bobby has 1 brother.

So temp 0 - which isn't actually making it deterministic - is getting this wrong, but temp 1 is getting it right.