NO.PZ2023091802000210
问题如下:
A derivatives dealer actively trades options on various underlying assets with its clients. The firm wants to apply the Black-Scholes-Merton (BSM) model to price a call option on a futures contract. Relevant data is provided below:
· Current futures price: EUR 63
· Strike price of the option: EUR 68
· Time to expiration of the option: 6 months
· Time to maturity of the underlying futures contract: 18 months
· Continuously compounded annual risk-free interest rate: 3%
· N(d1): 0.4678
· N(d2): 0.3449
Which of the following is closest to the value of this option estimated using the BSM model?
选项:
A.EUR 5.75
EUR 5.93
EUR 6.36
EUR 6.81
解释:
B is correct:
The option on futures using the BSM model is expressed as follows:
c = F0e−rTN(d1) − Ke−rTN(d2)
where:
F0 = current futures price = EUR 63
K = strike price of the option on futures = EUR 68
T = time to expiration of option = 0.5
r = risk-free interest rate = 3%
N(d1) = 0.4678
N(d2) = 0.3449
Therefore,
c=63 * e−0.03 * 0.5 * (0.4678) − 68 * e−0.03 * 0.5 * (0.3449)=EUR 5.9286
A is incorrect. This values the option using the time to maturity of the futures contract rather than the time to expiration of the option.
C is incorrect. This omits the “e−rT” from the futures price term in the equation.
D is incorrect. This multiplies the futures price by eqT instead of e-qT in the equation.
A derivatives dealer actively trades options on various underlying assets with its clients. The firm wants to apply the Black-Scholes-Merton (BSM) model to price a call option on a futures contract. Relevant data is provided below:
· Current futures price: EUR 63
· Strike price of the option: EUR 68
· Time to expiration of the option: 6 months
· Time to maturity of the underlying futures contract: 18 months
· Continuously compounded annual risk-free interest rate: 3%
· N(d1): 0.4678
· N(d2): 0.3449
Which of the following is closest to the value of this option estimated using the BSM model?
