In 1713, Nicolas Bernoulli stated a puzzle,
now called the St. Petersburg paradox, which works as follows. You have
the opportunity to play a game in which a fair coin is tossed repeatedly
until it comes up heads. If the first heads appears on the $n$th toss,
you win
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Show that the expected monetary value of this game is infinite.
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How much would you, personally, pay to play the game?
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Nicolas’s cousin Daniel Bernoulli resolved the apparent paradox in 1738 by suggesting that the utility of money is measured on a logarithmic scale (i.e.,
$U(S_{n}) = a\log_2 n +b$ , where$S_n$ is the state of having$n$ ). What is the expected utility of the game under this assumption? -
What is the maximum amount that it would be rational to pay to play the game, assuming that one’s initial wealth is
$k$ ?