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Abstract
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Options are�financial instruments designed to protect
investors from the stock market randomness. In 1973 Black, Sc-
holes and Merton proposed a very popular option pricing method
using stochastic di�erential equations within the Ito interpretation.
Herein, We have reviewed Black-Scholes theory using Ito calculus,
which is standard to mathematical nance. Moreover, the Black-
Scholes equation obtained using Stratonovich calculus is the same
as the one obtained by means of the Ito calculus. In fact, this is
the result we expected in advance because Ito and Stratonovich
conventions are just di�erent rules of calculus. The option pric-
ing method obtains the so-called Black-Scholes equation which is a
partial di�erential equation of the same kind as the di�ffusion equa-
tion. In fact, it was this similarity that led Black and Scholes to
obtain their option price formula as the solution of the di�ffusion
equation with the initial and boundary conditions given by the
option contract terms.
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