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Chapter 19 Options
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Define options and discuss why they are used. Describe how options work and give some basic strategies. Explain the valuation of options. Identify types of options other than puts and calls. Learning Objectives
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Call (Put): Buyer has the right, but not the obligation, to purchase (sell) a fixed quantity from (to) the seller at a fixed price before a certain date Exercise (strike) price: “fixed price” Expiration (maturity) date: “certain date” Option premium or price: paid by buyer to the seller to get the “right” Options
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Financial derivative securities: derive all or part of their value from another (underlying) security Options are created by investors, sold to other investors Why trade these indirect claims? Expand investment opportunities, lower cost, increase leverage Why Options Markets?
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Exercise (Strike) price: the per-share price at which the common stock may be purchased or sold Expiration date: last date at which an option can be exercised Option premium: the price paid by the option buyer to the writer of the option, whether put or call Option Terminology
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Options exchanges Chicago Board Options Exchange (CBOE) Montreal Exchange (ME) Standardized exercise dates, exercise prices, and quantities Facilitate offsetting positions through a clearing corporation Clearing corporation is guarantor, handles deliveries Options Trading
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In-the-money options have a positive cash flow if exercised immediately Call options: S > E Put options: S < E Out-of-the-money options should not be exercised immediately Call options: S < E Put options: S > E If S = E, an option is at the money Options Characteristics
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Intrinsic value is the value realized from immediate exercise Call options: maximum (S 0 -E, 0) Put options: maximum (E-S 0, 0) Prior to option maturity, option premiums exceed intrinsic value Time Value = Option Price - Intrinsic Value Options Characteristics
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25 27 29 4 0 -4 Stock Price at Expiration Profit per Option ($) How does buying a stock compare with buying a call option? Buyer Seller Payoff Diagram for a Call Option
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23 25 27 4 0 -4 Stock Price at Expiration Profit per Option ($) How does selling a stock compare with buying a put option? Buyer Seller Payoff Diagram for a Put Option
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23 25 27 29 4 0 -4 Stock Price at Expiration Profit ($) Purchased share Written call Combined Covered Call Writing
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23 25 27 29 4 0 -4 Stock Price at Expiration Profit ($) Combined Purchased put Purchased share Protective Put Buying
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Hedging strategy that provides a minimum return on the portfolio while keeping upside potential Buy protective put that provides the minimum return Put exercise price greater or less than the current portfolio value? Problems in matching risk with contracts Portfolio Insurance
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23 25 27 29 2 0 -2 Stock Price at Expiration Profit ($) Combined Purchased put Purchased share Portfolio Insurance
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Exercise prior to maturity implies the option owner receives intrinsic value only, not time value For call options, buy stock at below market price Would more be earned by selling option? For put options, receive cash from selling stock at above market price Could cash be reinvested for a higher return? Should Options be Exercised Early?
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At maturity, option prices are equal to their intrinsic values Intrinsic value is minimum price prior to maturity Maximum option prices prior to maturity Call options: price of stock, S 0 Put options: exercise price, E Option Price Boundaries
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Stock Prices Call Prices E Put Prices Stock Prices E E C =S Option Price Boundaries
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Five variables needed to value a European call option on a non-dividend paying stock The Black-Scholes pricing formula is: Black-Scholes Model
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Black-Scholes valuation is for call options Put-call parity shows relationship between call and put options so that riskless arbitrage is not possible Price of put = E/(e rt ) - S +C Put replicated by riskless lending, short sale of stock, purchased call Put-Call Parity
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Factors Affecting Prices
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Options can be used to control the riskiness of common stocks If stock owned, sell calls or buy puts Call or put option prices do not usually change the same dollar amount as the stock being hedged Shares purchased per call written = N(d 1 ) Shares purchased per put purchased = N(d 1 ) - 1 Hedge Ratios
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Stock-Index Options: option contracts on a stock market index Interest Rate Options: option contracts on fixed income securities Currency Options: Option contracts whose value is based on the value of an underlying currency Other Types of Options
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Options available on S&P/TSE 60 Index, S&P 500 Index, NYSE Index, etc. Bullish on capital markets implies buying calls or writing puts Bearish on capital markets implies buying puts or writing calls At maturity or upon exercise, cash settlement of position Basics of Stock-Index Options
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Speculation opportunities similar to options on individual stocks Hedging opportunities permit the management of market risk Well-diversified portfolio of stocks hedged by writing calls or buying puts on stock index What return can investor expect? Strategies with Stock-Index Options
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Appendix 19-A Combinations of Options Straddle – A combination of a put and a call on the same stock with the same exercise date and exercise price A purchaser believes that the underlying stock price is highly volatile and may go either up or down A seller believes that the underlying stock price will exhibit small volatility but could go up or down Strip – A combination of two puts and a call on the same security, same exercise date and price Strap – combines two calls with a put
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The purchase and sale of an equivalent option varying in only one respect Two basic spreads: Money spread involves the purchase of a call option at one exercise price and the sale of the same maturity option, but with a different exercise price Time spread involves the purchase and sale of options are identical except for expiration dates Appendix 19-A Spreads of Options
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Appendix 19-B Rights and Warrants Right – to purchase a stated number of common shares at a specified price with a specified time (often several months) Warrant – to purchase a stated number or common shares at a specified price with a specified time (often several years)
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Appendix 19-C Put-Call Parity No-Arbitrage Argument Example: Payoff at T PortfolioAction S(T) <ES(T) >E ABuy 1 call 0S(T) – E Invest PV(E) in T- bills EE Total Payoff ES(T) BBuy 1 share S(T) Buy 1 put E – S(T)0 Total payoff ES(T)
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