id: 02343774
dt: j
an: 2002a.00668
au: Tlustý, Pavel
ti: General solution of a probability problem. (Obecné řešení jedné úlohy
z pravděpodobnosti.)
so: Mat. Fyz. Inform. 10, No. 9, 527-530 (2001).
py: 2001
pu: ,
la: CS
cc: K50
ut:
ci:
li:
ab: A game is presented in which two players A and B take turns and toss a
coin. Player A begins. The game is won by that player during whose turn
the head is tossed for the $k$-times. If $k$ is odd, the probability of
winning of player A is bigger ($1/3^{2n+1}$ bigger than the probability
of player B). If $k$ is even, the probability of winning of player B is
bigger ($1/3^{2n}$ bigger than the probability of player A).
rv: