Chapter 22, Problem 33QP

Black-Scholes and Dividends In addition to the five factors discussed in the chapter, dividends also affect the price of an option. The Black-Scholes option pricing model with dividends is:

$\begin{array}{l}C=S\times e^{-dt}\times N(d_1^{})-E\times e^{-ft}\times N(d_2)\\ d_1=[\ln (S/E)+(R-d+{\sigma }^2/2)\times t]/(\sigma \times \sqrt{t})\\ d_2=d_1-\sigma \times \sqrt{t}\end{array}$

All of the variables arc the same as the Black-Scholes model without dividends except for the variable d, which is the continuously compounded dividend yield on the stock.

1. a. What effect do you think the dividend yield will have on the price of a call option? Explain.
2. b. A stock is currently priced at $113 per share, the standard deviation of its return is 50 percent per year, and the risk-free rate is 5 percent per year, compounded continuously. What is the price of a call option with a strike price of $110 and a maturity of six months if the stock has a dividend yield of 2 percent per year?