A trader wishes to compute the price of a 1-year American call option on a 5-year bond
Question:
A trader wishes to compute the price of a 1-year American call option on a 5-year bond with a face value of 100. The bond pays a coupon of 6% semiannually and the (quoted) strike price of the option is $100. The continuously compounded zero rates for maturities of 6 months, 1 year, 2 years, 3 years, 4 years, and 5 years are 4.5%, 5%, 5.5%, 5.8%, 6.1%, and 6.3%. The best-fit reversion rate for either the normal or the lognormal model has been estimated as 5%. A 1-year European call option with a (quoted) strike price of 100 on the bond is actively traded. Its market price is $0.50. The trader decides to use this option for calibration. Use the Deriva Gem software with 10 time steps to answer the following questions:
(a) Assuming a normal model, imply the parameter from the price of the European option.
(b) Use the o parameter to calculate the price of the option when it is American.
(c) Repeat
(a) and
(b) for the lognormal model. Show that the model used does not significantly affect the price obtained providing it is calibrated to the known European price.
(d) Display the tree for the normal model and calculate the probability of a negative interest rate occurring.
(e) Display the tree for the lognormal model and verify that the option price is correctly calculated at the node where, with the notation of Section 28.7, i = 9 and j = -1.
AppendixLO1
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