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CHAPTER 8Financial Options and Their Valuation
What are options?Why are they needed?Call and Put OptionsOption Pricing Models
Note: spreadsheet for Ch 16 due in next class
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What is an option? A contract that gives its holder
the right, but not the obligation, to buy (or sell) an asset at some predetermined price within a specified period of time.
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It does not obligate its owner to take any action. It merely gives the owner the right to buy or sell an asset.
What is the single most importantcharacteristic of an option?
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Why are they needed?
To manage risk To help you with employee stock
options that you might receive To help with capital structure
decisions especially when convertible securities are used
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Call Option
An option to buy a specified number of shares of a security within some future period.
Exercise (or strike) price – the price stated in the option contract at which the security can be bought.
Option price – the market price of the option contract.
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Call Option…contd… Expiration date – the date the option
matures. Exercise value – the value of an
option if it were exercised today (Current stock price - Strike price).
Covered option – an option written against stock held in an investor’s portfolio.
Naked (uncovered) option – an option written without the stock to back it up.
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Example: Call option
Suppose you owned 100 shares of GCC’s stock which are selling at $53.5 per share on January 9, 2004. You sell person B the option to BUY these shares at $55 per share at any time until May 14, 2004.Buyer of option
Strike or exercise price
Covered option
‘Writer’ of option
American option
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Example…contd Who is the ‘writer’ of the option? Who is the buyer? Why would he buy this option? What is the strike or exercise price? Is it covered or a naked option? What type of option is this? American or
European? What is the exercise value?
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Further terminology In-the-money call – a call
option whose exercise price is less than the current price of the underlying stock.
Out-of-the-money call – a call option whose exercise price exceeds the current stock price.
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Option example A call option with an exercise price of
$25, has the following values at these prices:
Stock price Market price of call option
$25 $3.00 30 7.50 35 12.00 40 16.50 45 21.00 50 25.50Observe how the market price goes up as
the stock price exceeds the exercise price
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Determining option exercise value and option premium
Stock Strike Exercise Option Option
price price value pricepremium
$25.00 $25.00 $0.00 $3.00 $3.00 30.00 25.00 5.00 7.50 2.50 35.00 25.00 10.00 12.00 2.00 40.00 25.00 15.00 16.50 1.50 45.00 25.00 20.00 21.00 1.00 50.00 25.00 25.00 25.50 0.50Observe how the market price becomes closer to
the exercise value as the stock price rises. The option premium becomes smaller and smaller
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Why does the option premium decrease?
The premium of the option price over the exercise value declines as the stock price increases.
This is because there is virtually no chance that the stock will be out-of-the-money at expiration if the stock price is presently very high
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Call premium diagram
5 10 15 20 25 30 35 40 45 50
Stock
Price
Option value
30
25
20
15
10
5
Market price
Exercise value
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Observations: Call Premium diagram Market value of the option is zero
when the stock price is zero Market price of the option is
always greater than or equal to the exercise value
Market value of the option is greater than zero even when the option is out-of-the-money
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Observations: Call Premium diagram…contd
Value of the option is steadily increasing as the stock price is increasing
Options have considerable upside potential but limited downside risk. The most you lose is the price you paid for the option
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Options magnify both returns and losses You buy STI’s stock at $30 and the price
goes up to $40. You would have a 33% return on the stock.
Instead you bought a call option and the price goes up from $7.5 to $16.5 per option: a return of 120%!
If the stock price goes down to $25,then you would lose 17%, and if you had bought the option you would lose 60% (from $7.50 to $3.0)
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Some factors that affect the value of a Call option Market price vs. Strike price: the higher
the market price, the higher will be the option’s value
Level of strike price: the higher the strike price, the lower will be the option’s value
Length of option: the longer the option period the higher is the option price
Stock price volatility: the more volatile the stock the higher will be the option price. Chances of making a profit increase whilst the downside potential is limited
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Put Option Put option – an option to sell a
specified number of shares of a security within some future period.
Exercise (or strike) price – the price stated in the option contract at which the security can be sold.
Option price – the market price of the option contract.
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Put Option…contd Expiration date – the date the
option matures. Exercise value – the value of an
option if it were exercised today (Current stock price - Strike price).
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Example: Put Option
Suppose you have bought a put option to sell GCC’s shares at a price of $50 per share for 100 shares over the next 4 months
Buyer of optionStrike price
Draw exercise value versus stock price
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Example…contd..
Who is the buyer of the option? Why would you buy this option? What is the strike or exercise
price? What is the exercise value if the
stock price fell to $45?
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Put Option: Exercise Value
Exercise Value = ($50-$45) x 100 shares = $500
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Option Pricing Models
We find the price of an option using: Binomial Approach OR Black-Scholes Option Pricing Model
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Binomial Approach All option pricing models are based on
the concept of a riskless hedge E.g., suppose an investor (call her Hedger)
buys some shares of stock and simultaneously writes a call option on the stock.
Another example of a hedge: Buy shares of a sock and also buy a put option
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What are the assumptions of the Black-Scholes Option Pricing Model?
The stock underlying the call option provides no dividends during the call option’s life.
There are no transactions costs for the sale/purchase of either the stock or the option.
kRF is known and constant during the option’s life.
Security buyers may borrow any fraction of the purchase price at the short-term, risk-free rate.
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What are the assumptions of the Black-Scholes Option Pricing Model?
No penalty for short selling and sellers receive immediately full cash proceeds at today’s price.
Call option can be exercised only on its expiration date.
Security trading takes place in continuous time, and stock prices move randomly
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Which equations must be solved to find the Black-Scholes option price?
)][N(d Xe- )]P[N(d V
tσ - d dtσ
t] 2
[k ln(P/X) d
2
tk-
1
12
2
RF
1
RF
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Use the B-S OPM to find the option value of a call option with P = $27, X = $25, kRF = 6%, t = 0.5 years, and σ2 = 0.11.
0.6327 0.1327 0.5000 N(0.3391) )N(d0.7168 0.2168 0.5000 N(0.5736) )N(d
textbook the in 5- ATable From
0.3391 .7071)(0.3317)(0 - 0.5736 d
0.5736 .7071)(0.3317)(0
(0.5) )]20.11 [(0.06 )ln($27/$25
d
2
1
2
1
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Solving for option value
$4.0036 V
[0.6327]$25e - ]$27[0.7168 V
)][N(d Xe- )]P[N(d V )(0.06)(0.5-
2t-k
1RF
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How do the factors of the B-S OPM affect a call option’s value?
As the factor increases … Option value …
Current stock price IncreasesExercise price DecreasesTime to expiration IncreasesStock return variance Increases
Valuation of Put options We can use the price of the call
option to value a put option. We create 2 portfolios:
Portfolio 1 = Buy one put option and buy one share
Portfolio 2 = Buy one call option and keep cash equal to the exercise price
The payoffs of both portfolios will be the same
Portfolio payoffs
P < X P >= X
Put X -- P 0Stock P PPortfolio 1: X P
Stock Price at Expiration
Call 0 P -- XCash X XPortfolio 2: X P
Put-Call Parity
The two portfolios have identical payoffs
They must have identical values Bingo! We have created a put-call
parityPut option + Stock = Call option + PV of exercise
priceRearranging,Put option = Call option – Price + PV of exercise
price
Put option = V – P + Xe –rRFt
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