The Black-Scholes Formula for Options on Stocks with Discrete Dividends: Practice Problems and Solutions
The Actuary's Free Study Guide for Exam 3F / Exam MFE - Section 35
This section of sample problems and solutions is a part of The Actuary's Free Study Guide for Exam 3F / Exam MFE, authored by Mr. Stolyarov.This is Section 35 of the Study Guide. See Section 1 here. See Section 2 here. See Section 3 here. See Section 4 here. See Section 5 here. See Section 6 here. See Section 7 here
When stocks pay discrete dividends, we recall that the following relationship holds between the prepaid forward price and the stock price:
FP0,T(S) = S0 - PV0,T(Div)
For time to expiration T and annual continuously compounded risk-free interest rate, the following equality still holds with respect to the prepaid forward on the strike asset:
FP0,T(K) = Ke-rT.
Making the substitutions above, we can now use the Black-Scholes formula from Section 34 - the formula that uses prepaid forward prices.
Thus, the Black-Scholes formula for the call price is
C(FP0,T(S), FP0,T(K), σ, T) = FP0,T(S)N(d1) - FP0,T(K)N(d2)
where d1 = [ln(FP0,T(S)/FP0,T(K)) + 0.5σ2T]/[σ√(T)] and d2 = d1 - σ√(T)
The Black-Scholes formula for the put price is
P(FP0,T(S), FP0,T(K), σ, T) = FP0,T(K)N(-d2)- FP0,T(S)N(-d1)
We can also get the put formula via put-call parity:
P(FP0,T(S), FP0,T(K), σ, T) = C(FP0,T(S), FP0,T(K), σ, T) + FP0,T(K) - FP0,T(S)
Meaning of variables:
S = current stock price.
K = strike price of the option.
C = call option price.
P = put option price.
σ = annual stock price volatility.
r = annual continuously compounded risk-free interest rate.
T = time to expiration.
∂ = annual continuously compounded dividend yield.
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When discrete dividends are paid on a stock, convert the stock price and the strike price into corresponding prepaid forward prices and use the Black-Scholes formula with prepaid forward prices.
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