INVESTMENTS (LOOSELEAF) W/CONNECT
11th Edition
ISBN: 9781260465945
Author: Bodie
Publisher: MCG
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Chapter 21, Problem 6PS
Summary Introduction
(A)
To calculate:
Theoritical future price in accordance with sport future partity
Introduction:
Future price refers to the price pertaining to which two parties transact the commodity at a predeteromed price at a specific date in the future. It represents the price of commodity or stock on future contract in comparison to the current or spot price.
Summary Introduction
(B)
To determine:
The strategy that can be taken into consideration by investor to ascertain benefit out of the mispricing in future, if any
Introduction:
The future contract refers to the financial contract which is standardized in nature and is made between two parties wherein one party provide consent to sell or purchase the commodity at a particular date in the future and at a particular price to the other party which provide consent to purchase or sell the same. In the futures contract the physical delivery of the commodity does not take place.
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II. Suppose you have the following information concerning a particular options.Stock price, S = RM 21Exercise price, K = RM 20Interest rate, r = 0.08Maturity, T = 180 days = 0.5Standard deviation, = 0.5
a. What is correct of the call options using Black-Scholes model? b. Compute the put options price using Black-Scholes model?
c. Outline the appropriate arbitrage strategy and graphically prove that the arbitrage is riskless.Note: Use the call and put options prices you have computed in the previous question (a) and (b) above.b. Name the options/stock strategy used to proof the put-call parity. c. What would be the extent of your profit in (a) depend on?
You use the Black-Scholes-Merton model for a put option on a stock. You calculate N(d1) = 0.60 and N(d2) = 0.56. a) What is the delta of the put option?
Solution for A = -0.40
b) You short 100 put options. How would you hedge your delta exposure using the underlying stock? How many shares would you need to buy or sell?
You use the Black-Scholes-Merton model for a put option on a stock. You calculate N(d1) = 0.60 and N(d2) = 0.56. a) What is the delta of the put option? b) You short 100 put options. How would you hedge your delta exposure using the underlying stock? How many shares would you need to buy or sell?
Chapter 21 Solutions
INVESTMENTS (LOOSELEAF) W/CONNECT
Ch. 21 - Prob. 1PSCh. 21 - Prob. 2PSCh. 21 - Prob. 3PSCh. 21 - Prob. 4PSCh. 21 - Prob. 5PSCh. 21 - Prob. 6PSCh. 21 - Prob. 7PSCh. 21 - Prob. 8PSCh. 21 - Prob. 9PSCh. 21 - Prob. 10PS
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