Option (finance)

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In finance options are types of derivative contracts, including call options and put options, where the future payoffs to the buyer and seller of the contract are determined by the price of another security, such as a common stock. More specifically, a call option is an agreement in which the buyer (holder) has the right (but not the obligation) to exercise by buying an asset at a set price (strike price) on (for a European style option) or not later than (for an American style option) a future date (the exercise date or expiration); and the seller (writer) has the obligation to honor the terms of the contract. A put option is an agreement in which the buyer has the right (but not the obligation) to exercise by selling an asset at the strike price on or before a future date; and the seller has the obligation to honor the terms of the contract.

Since the option gives the buyer a right and the writer an obligation, the buyer pays the option premium to the writer. The buyer is considered to have a long position, and the seller a short position.

For every open contract there is a buyer and a seller. Traders in exchange-traded options do not usually interact directly, but through a clearing house such as, in the U.S., the Options Clearing Corporation (OCC) or in Germany and Luxemburg Clearstream International. The clearing house guarantees that an assigned writer will fulfill his obligation if the option is exercised. Options/Derivatives are not rated and/or are below investment grade; however the OCC's clearing process is considered AAA rated.

Contents

[edit] The contract specifies

  • whether it is a put option or call option. Put options give the holder the right to sell the asset at the strike price. Call options give the holder the right to purchase the asset at the strike price.
  • the underlying security (e.g. XYZ Co.)
  • the strike price or exercise price. It can be specified, or based on a reference rate, or at a strike price 54.00 to expire Dec 2007 with a multiplier of 100. 1 JNJ Dec Call 54

[edit] Types of options

  • Real option (real option) is a choice that an investor has when investing in the real economy (i.e. in the production of goods or services, rather than in financial contracts). This option may be something as simple as the opportunity to expand production, or to change production inputs. Real options are an increasingly influential tool in corporate finance. They are typically difficult or impossible to trade, and lack the liquidity of exchange-traded options.
  • Traded options (also called "Exchange-Traded Options" or "Listed Options") is a class of Exchange traded derivatives. As for other classes of exchange traded derivatives, trade options have standardized contracts, quick systematic pricing, and are settled through a clearing house (ensuring fulfillment). Trade options include
  1. stock options, discussed below,
  2. commodity options,
  3. bond options,
  4. interest rate options
  5. index (equity) options,
  6. currency cross rate options, and
  7. swaption.
  • Vanilla options are 'simple', well understood, and traded options; Exotic options are more complex, or less easily understood. Asian options, lookback options, barrier options are considered to be exotic, especially if the underlying instrument is more complex than simple equity or debt.
  • Employee stock options (employee stock option) are issued by a company to its employees as compensation.

[edit] Valuation

The premium for an option contract is ultimately determined by supply and demand, but is influenced by five principal factors:

  • The price of the underlying security in relation to...
  • The strike price. Options will be in-the-money when there is a positive intrinsic value; when the strike price is above/below (put/call) the security's current price. They will be at-the-money when the strike price equals the security's current price. They will be out-of-the-money when the strike price is below/above (put/call) the security's current price. Options at-the-money or out-of-the-money have an intrinsic value of zero.
  • The cumulative cost required to hold a position in the security (including interest + dividends).
  • The time to expiration. The time value decreases to zero at its expiration date. The option style determines when the buyer may exercise the option. Generally the contract will either be
    • American style — which allows exercise up to the expiration date — or
    • European style — where exercise is only allowed on the expiration date — or
    • Bermudan style — where exercise is allowed on several, specific dates up to the expiration date.

European contracts are easier to value. Due to the "American" style option having the advantage of an early exercise day (i.e. at any time on or before the options expiry date), they are always at least as valuable as the "European" style option (only exercisable at the expiration date).

  • The estimate of the future volatility of the security's price. This is perhaps the least-known input into any pricing model for options, therefore traders often look to the marketplace to see what the implied volatility of an option is — meaning that given the price of an option and all the other inputs except volatility you can solve for that value.

Pricing models include the Binomial options pricing model for American options and the Black-Scholes model for European options. Even though there are pricing models, the value of an option is a personal decision, requiring multiple trade offs and depending on the investment objective. See the Excel model [1] for the metrics of a call option.

Because options are derivatives, they can be combined with different combinations of

  • other options
  • risk-free T-bills
  • the underlying security, and
  • futures contracts on that security

to create a risk neutral portfolio (zero risk, zero cost, zero return). In a liquid market, arbitrageurs ensure that the values of all these assets are 'self-leveling', i.e. they incorporate the same assumptions of risk/reward. In theory traders could buy cheap options and sell expensive options (relative to their theoretical prices), in quantities such that the overall delta is zero, and expect to make a profit. Nevertheless, implementing this in practice may be difficult because of "stale" stock prices, large bid/ask spreads, market closures and other symptoms of stock market illiquidity. If stock market prices do not follow a random walk (due, for example, to insider trading) this delta neutral strategy or other model-based strategies may encounter further difficulties. Even for veteran traders using very sophisticated models, option trading is not an easy game to play.

[edit] History of valuation

Models of option pricing were very simple and incomplete until 1973 when Fischer Black and Myron Scholes published the Black-Scholes pricing model. Scholes received the 1997 Bank of Sweden Prize in Economic Sciences (Nobel Prize of Economics) for this work, along with Robert C. Merton. In a departure from tradition, Fischer Black was specifically mentioned in the award, even though he had died and was therefore not eligible.

The Black-Scholes model gives theoretical values for European put and call options on non-dividend paying stocks. The key argument is that traders could risklessly hedge a long options position with a short position in the stock and continuously adjust the hedge ratio (the delta value — one of the option sensitivities known as "Greeks") as needed. Assuming that the stock price follows a random walk, and using the methods of stochastic calculus, a price for the option can be calculated where there is no arbitrage profit. This price depends only on 5 factors: the current stock price, the exercise price, the risk-free interest rate, the time until expiration, and the volatility of the stock price. Eventually, the model was adapted to be able to price options on dividend paying stocks as well.

The availability of a good estimate of an option's theoretical price contributed to the explosion of trading in options. Other option pricing models have since been developed for other markets and situations using similar arguments, assumptions, and tools, including the Black model for options on futures, Monte Carlo methods, Path Integrals, and Binomial options models.

[edit] Risks

Risk is concerned with the unknown. Upside risk is the possibility of gain. Downside risk is the possibility of loss. One half the reasons to use options (like other derivatives) is to reduce risk. Certainty is exchanged with other players who assume the risk in hope of big gains. It is wrong to state that "options are risky."

  • reduce risk: The seller of a covered call exchanges his upside risk (gains above the strike price) for the certainty of cash in hand (the premium). The buyer of a covered put limits his downside risk for a price — just like buying fire insurance for your house.
  • increase risk: The buyer of a call wants the upside risk of an asset, but will only pay a small percentage of its current value, so his returns are leveraged. The seller of a put accepts the downside risk of locking in his purchase price of an asset, in exchange for the premium.

To understand risk, look at the four standard graphs of options (put-call-buy-sell). The value of the options in the interim between purchase and expiration will not be exactly like these graphs, but close enough. In all cases, the premium was a certainty.

  • Buyers start out-of-pocket. But going forward, the option buyer has no downside risk. The graph either flat lines or goes up on either side of the spot price.
  • Sellers start with a gain. Going forward, they have no upside risk. These graphs either flat line or go down on either side of the spot price.

The extent of risk varies. Buyers/sellers of calls have unlimited upside/downside risk as the asset price increases. Buyers/sellers of puts have upside/downside risk limited to the spot price of the asset (less the premium).

[edit] Pin risk

A special situation called pin risk can arise when the underlier closes at or very close to the option's strike value on the last day the option is traded prior to expiration. The option writer (seller) may not know with certainty whether or not the option will actually be exercised or be allowed to expire worthless. Therefore, the option writer may end up with a large, unwanted residual position in the underlier when the markets open on the next trading day after expiration, regardless of their best efforts to avoid such a residual.

[edit] Trading

The most common way to trade stock options is trading standardized options contracts that are listed by various futures and options exchanges — there are currently six exchanges in the United States that list standardized options contracts based on underlying stocks — The Philadelphia Stock Exchange (PHLX), American Stock Exchange (AMEX) and NYSE Arca in New York City, and the Chicago Board Options Exchange (CBOE) which are all open-outcry marketplaces, and the International Securities Exchange (ISE) and Boston Options Exchange (BOX) are electronic marketplaces. However, even for the non-electronic exchanges, competition and the introduction of automated execution (AutoEx) has led, by late 2006, to hybridization where all but the largest trades are executed electronically. In Europe the main exchanges where stock options are traded are Euronext.liffe and Eurex.

There are also over-the-counter options contracts that are traded not on exchanges, but between two independent parties. At least one of those parties is usually a large financial institution with a balance sheet big enough to underwrite such a contract.

[edit] The basic trades or traded stock options

These trades are described from the point of view of a speculator. If they are combined with other positions, they can also be used in hedging.

[edit] Long Call

A trader who believes that a stock's price will increase might buy the right to purchase the stock (a call option) rather than just buy the stock. He would have no obligation to buy the stock, only the right to do so until the expiry date. If the stock price increases over the exercise price by more than the premium paid, he will profit. If the stock price decreases, he will let the call contract expire worthless, and only lose the amount of the premium. A trader might buy the option instead of shares, because for the same amount of money, he can obtain a larger number of options than shares. If the stock rises, he will thus realize a larger gain than if he had purchased shares. This is an example of the principle of leverage.
Payoffs and profits from a long call.
Payoffs and profits from a long call.

[edit] Short Call (Naked short call)

A trader who believes that a stock's price will decrease can short sell the stock or instead sell a call. Both tactics are generally considered inappropriate for small investors. The trader selling a call has an obligation to sell the stock to the call buyer at the buyer's option. If the stock price decreases, the short call position will make a profit in the amount of the premium. If the stock price increases over the exercise price by more than the amount of the premium, the short will lose money. Unless a trader already owns the shares which he may be required to provide, the potential loss is unlimited. However, such a trader who sells a call option for those shares he already owns has sold a covered call.
Payoffs and profits from a short call.
Payoffs and profits from a short call.

[edit] Long Put

A trader who believes that a stock's price will decrease can buy the right to sell the stock at a fixed price. He will be under no obligation to sell the stock, but has the right to do so until the expiry date. If the stock price decreases below the exercise price by more than the premium paid, he will profit. If the stock price increases, he will just let the put contract expire worthless and only lose his premium paid.
Payoffs and profits from a long put.
Payoffs and profits from a long put.

[edit] Short Put (Naked put)

A trader who believes that a stock's price will increase can sell the right to sell the stock at a fixed price. The trader now has the obligation to purchase the stock at a fixed price. The trader has sold insurance to the buyer of the put requiring the trader to insure the stockholder below the fixed price. This trade is generally considered inappropriate for a small investor. If the stock price increases, the short put position will make a profit in the amount of the premium. If the stock price decreases below the exercise price by more than the premium, the short position will lose money.
Payoffs and profits from a short put.
Payoffs and profits from a short put.

[edit] Introduction to option strategies

Combining any of the four basic kinds of option trades (possibly with different exercise prices) and the two basic kinds of stock trades (long and short) allows a variety of options strategies. Simple strategies usually combine only a few trades, while more complicated strategies can combine several.

[edit] Covered call

Long the stock, short a call. This has essentially the same payoff as a short put.

Long stock
Short call

[edit] Straddle

Long a call and long a put with the same exercise prices (a long straddle), or short a call and short a put with the same exercise prices (a short straddle).

Same exercise Prices
Long Call
Long Put
OR
Short call
Short Put

[edit] Strangle

Long a call and long a put with different exercise prices (a long strangle), or short a call and short a put with different exercise prices (a short strangle).

At different exercise price
Long strangle:
Long call
Long put
Short strangle:
Short call
Short put

[edit] Bull spread

Long a call with a low exercise price and short a call with a higher exercise price, or long a put with a low exercise price and short a put with a higher exercise price.

Long call  @ Low Exercise Price
Short call @ higher exercise price
or
Long a put  @ low exercise price
Short a put @ higher exercise price

[edit] Bear spread

Short a call with a low exercise price and long a call with a higher exercise price, or short a put with a low exercise price and long a put with a higher exercise price.

Short call @ Low Exercise Price
Long call  @ higher exercise price
or
Short a put @ low exercise price
Long a put  @ higher exercise price

[edit] Butterfly

Butterflies require trading options with 3 different exercise prices. Assume exercise prices X1 < X2 < X3 and that X1 + X3 = 2×X2

X1 X2 X3 are exercise prices
X1 < X2 < X3 and
X1 + X3 = 2×X2
  • Long butterfly — long 1 call with exercise price X1, short 2 calls with exercise price X2, and long 1 call with exercise price X3. Alternatively, long 1 put with exercise price X1, short 2 puts with exercise price X2, and long 1 put with exercise price X3.
Long call  @ X1
Short call @ X2
Short call @ X2
Long call  @ X3
OR
Long put  @ X1
Short put @ X2
Short put @ X2
Long put  @ X3
  • Short butterfly — short 1 call with exercise price X1, long 2 calls with exercise price X2, and short 1 call with exercise price X3. Alternatively, short 1 put with exercise price X1, long 2 puts with exercise price X2, and short 1 put with exercise price X3.
Short call @ X1
Long call  @ X2
Long call  @ X2
Short call @ X3
Or
Short put @ X1
Long put  @ X2
Long put  @ X2
Short put @ X3

[edit] Condor

Condors require trading options with 4 different exercise prices. Assume exercise prices X1 < X2 < X3 < X4 and that X1 + X4 = X2 + X3. Note that a condor is like a butterfly but has two center prices instead of one. Thus, while a butterfly has strike prices X1, X2, X2, X3, a condor has strike prices X1, X2, X3, X4. The short and long butterfly combinations above can be used to construct short and long condors as well.

  • Long condor — long 1 call with exercise price X1, short 1 call with exercise price X2, short 1 call with exercise price X3, and long 1 call with exercise price X4. Alternatively, long 1 put with exercise price X1, short 1 put with exercise price X2, short 1 put with exercise price X3, and long 1 put with exercise price X4.
X1 X2 X3 X4 are exercise prices
X1 < X2 < X3 < X4 and X1 + X4 = X2 + X3
Long call  @ X1
Short call @ X2
Short call @ X3
Long call  @ X4
OR
Long put  @ X1
Short put @ X2
Short put @ X3
Long put  @ X4
  • Short condor — short 1 call with exercise price X1, long 2 calls with exercise price X2, and short 1 call with exercise price X3. Alternatively, short 1 put with exercise price X1, long 2 puts with exercise price X2, and short 1 put with exercise price X3.
X1 X2 X3 X4 are exercise prices
X1 < X2 < X3 < X4 and X1 + X4 = X2 + X3
Short call @ X1
Long call  @ X2
Long call  @ X3
Short call @ X4
Or
Short put @ X1
Long put  @ X2
Long put  @ X3
Short put @ X4

[edit] Box spread

Any combination of options that has a constant payoff at expiration. For example, combining a long butterfly made with calls, with a short butterfly made with puts will have a constant payoff of zero, and in equilibrium will cost zero. In practice any profit from these spreads will be eaten up by commissions (hence the name "alligator spreads").

Any combination of options that has a constant payoff at expiration or break-even
In practice any profit from these spreads will be eaten up by commissions

[edit] Historical uses of options

Contracts similar to options are believed to have been used since ancient times. In the real estate market, call options have long been used to assemble large parcels of land from separate owners, e.g. a developer pays for the right to buy several adjacent plots, but is not obligated to buy these plots and might not unless he can buy all the plots in the entire parcel. Film or theatrical producers often buy the right — but not the obligation — to dramatize a specific book or script. Lines of credit give the potential borrower the right — but not the obligation — to borrow within a specified time period.

Many choices, or embedded options, have traditionally been included in bond contracts. For example many bonds are convertible into common stock at the buyer's option, or may be called (bought back) at specified prices at the issuer's option. Mortgage borrowers have long had the option to repay the loan early.

Privileges were options sold over the counter in nineteenth century America, with both puts and calls on shares offered by specialized dealers. Their exercise price was fixed at a rounded-off market price on the day or week that the option was bought, and the expiry date was generally three months after purchase. They were not traded in secondary markets.

[edit] Option naming conventions

Stock option names are written in the following format: SYMBOL+MONTH+STRIKE

  • SYMBOL = Option Root Symbol
  • MONTH = Month the option expires
  • STRIKE = Strike price

Expiration Month Codes

Month Call Put
January A M
February B N
March C O
April D P
May E Q
June F R
July G S
August H T
September I U
October J V
November K W
December L X

Strike Price Codes

Code Strike Prices Code Strike Prices
A 5 105 205 305 405 505 N 70 170 270 370 470 570
B 10 110 210 310 410 510 O 75 175 275 375 475 575
C 15 115 215 315 415 515 P 80 180 280 380 480 580
D 20 120 220 320 420 520 Q 85 185 285 385 485 585
E 25 125 225 325 425 525 R 90 190 290 390 490 590
F 30 130 230 330 430 530 S 95 195 295 395 495 595
G 35 135 235 335 435 535 T 100 200 300 400 500 600
H 40 140 240 340 440 540 U 7.5 37.5 67.5 97.5 127.5 157.5
I 45 145 245 345 445 545 V 12.5 42.5 72.5 102.5 132.5 162.5
J 50 150 250 350 450 550 W 17.5 47.5 77.5 107.5 137.5 167.5
K 55 155 255 355 455 555 X 22.5 52.5 82.5 112.5 142.5 172.5
L 60 160 260 360 460 560 Y 27.5 57.5 87.5 117.5 147.5 177.5
M 65 165 265 365 465 565 Z 32.5 62.5 92.5 122.5 152.5 182.5


[edit] Related

[edit] Options

[edit] Literature

[edit] External links


[edit] Publications & Newsletters



  Financial derivatives  
Options
Vanilla Types: Option styles | Call | Put | Warrants | Fixed income | Employee stock option | FX
Strategies: Covered calls | Naked puts | Bear Call Spread | Bear Put Spread | Bull Call Spread | Bull Put Spread | Calendar spread | Straddle | Long Straddle | Long Strangle | Butterfly | Short Butterfly Spread | Short Straddle | Short Strangle | Vertical spread | Volatility arbitrage | Debit Spread | Credit spread | Synthetic
Exotics: Asian | Lookbacks | Barrier | Binary | Swaptions | Mountain range
Valuation: Moneyness | Option time value | Black-Scholes | Black | Binomial | Stochastic volatility | Implied volatility
See Also: CBOE | Derivatives market | Option Screeners | Option strategies | Pin risk
Swaps
Interest rate | Total return | Equity | Credit default | Forex | Cross-currency | Constant maturity | Basis | Variance