Appendix B: Approximation to Standard Normal Probability
The CDF Φ(x) of a standard normal random variable can be approximated by
where 
, k = 1/(1 + 0.2316419x), c1 = 0.319381530, c2 = − 0.356563782, c3 = 1.781477937, c4 = − 1.821255978, and c5 = 1.330274429.
For illustration, using the earlier approximation, we obtain Φ(1.96) = 0.975002, Φ(0.82) = 0.793892, and Φ( − 0.61) = 0.270931. These probabilities are very close to that obtained from a typical normal probability table.
Exercises
6.1 Assume that the log price pt = ln(Pt) follows a stochastic differential equation
where wt is a Wiener process. Derive the stochastic equation for the price Pt.
6.2 Considering the forward price F of a nondividend-paying stock, we have
where r is the risk-free interest rate, which is constant, and Pt is the current stock price. Suppose Pt follows the geometric Brownian motion dPt = μPt dt + σPt dwt. Derive a stochastic diffusion equation for Ft, T.
6.3 Assume that the price of IBM stock follows the Ito process
where μ and σ are constant and wt is a standard Brownian motion. Consider the daily log ...
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