Triangular arbitrage opportunities may only exist when a bank's quoted exchange rate is not equal to the market's implicit cross exchange rate. The following equation represents the calculation of an implicit cross exchange rate, the exchange rate one would expect in the market as implied from the ratio of two currencies other than the base currency.[7][8]
S_{a/\$} = S_{a/b} S_{b/\$}
where
S_{a/\$} is the implicit cross exchange rate for dollars in terms of currency a
S_{a/b} is the quoted market cross exchange rate for b in terms of currency a
S_{b/\$} is the quoted market cross exchange rate for dollars in terms of currency b
If the market cross exchange rate quoted by a bank is equal to the implicit cross exchange rate as implied from the exchange rates of other currencies, then a no-arbitrage condition is sustained.[7] However, if an inequality exists between the market cross exchange rate, S_{a/\$}, and the implicit cross exchange rate, S_{a/b} S_{b/\$}, then there exists an opportunity for arbitrage profits on the difference between the two exchange rates.
S_{a/\$} = S_{a/b} S_{b/\$}
where
S_{a/\$} is the implicit cross exchange rate for dollars in terms of currency a
S_{a/b} is the quoted market cross exchange rate for b in terms of currency a
S_{b/\$} is the quoted market cross exchange rate for dollars in terms of currency b
If the market cross exchange rate quoted by a bank is equal to the implicit cross exchange rate as implied from the exchange rates of other currencies, then a no-arbitrage condition is sustained.[7] However, if an inequality exists between the market cross exchange rate, S_{a/\$}, and the implicit cross exchange rate, S_{a/b} S_{b/\$}, then there exists an opportunity for arbitrage profits on the difference between the two exchange rates.
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Расширенный режим Обычный режим