VRM14 - Binomial Trees Flashcards
Calculate the value of an American or European option call or put using a one-step or two-step binomial tree
p = (exp(rT) - d) / (u - d)
F = exp(-rT) (pFu + (1-p)* Fd)
u and d are the stock price if moves up / down
Fu. Fd are the payoffs
r is risk free rate
Apply to each node in two step tree
u = exp(simga * sqrt(delta t)
d = exp(- simga * sqrt(delta t)
To extend to American, determine value of option at each node if exercised or not, maximum of the two is the value
Describe how the value calculated using a binomial model converges as time periods are added
Converges to black scholes model as time steps increased
Define and calculate the delta of a stock option
Delta measures sensitivity of derivatives value to the price of its stock
Explain how the binomial model can be altered to price options on stocks with dividends, stock indices, currencies and futures
For dividend or using foreign risk free rate,
p = exp((r - d) * sqrt(t)) - d) / (u - d)
For futures p = (1 - d) / (u - d)
