topic 3: derivatives options: puts and calls how much is an option worth? [forwards and futures]...

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Topic 3: Derivatives

• Options: puts and calls

• How much is an option worth?

• [Forwards and futures]

• [Swaps]

• [Structured finance]

A call option

Gives the holder the right* to purchase a security at the exercise price(a) on or before the expiry date (American option)(b) on the expiry date (European option)

Generally American options are more valuable than European (why?).

But in the case of a non-dividend paying stock, an American option may be sold, but will never be exercised before the expiry date.

*but no obligation

Other terms

• A put option: …the right to sell a security…• Don’t forget: you can sell or buy an option

• At the money: price of security=exercise price• In the money: price of security>exercise price• Out of the money: price of security<exercise price

• The counterparty to an option is said to have “written” the option

• Selling a call option and writing an option are different – the latter leaves you with a commitment

Pay-off at maturity/expiry from holding a call optionas a function of the stock price

Stock price

Payoff of call

0X

Payoff from call at expiry

Profit from strategy: buy one European call option

at a cost of $3

ST=Asset price at expiry

Profit

Strike (exercise) price X = $80

$5

-$3Call premium $88$83

X = $800

NB: “call premium”=cost of call option

Profit from strategy: write (short) a call option

ST

Profit

Strike price X = $80

-$5

$3Call premium

$88$83

X = $800

Buy (long) a put option

Strike (exercise) price X = $70

ST

Profit

$3

-$2

Put premium

$68

$65 X = $700

Write a put option

Strike (exercise) price X = $70

ST

Profit

$2

-$3

Put premium

$68

$65

X = $700

http://www.ise.com/WebForm/md_livevol.aspx?categoryId=124&header3=true&menu1=true

International securities exchange

>>Market trading and data tools

>> Quotes, volatility and calculator

Some live option prices

Why hold a call or put in your portfolio?

Although often seen (and used) as risky, speculative instruments, options can be a valuable part of a risk management strategy e.g.:

Protective put:– You’d like to invest in a stock, but want to limit your downside

risk

– Note that the same can be achieved by holding a call plus a bond

Fraudster Madoff’s supposed plan: “split-strike”

In algebra

If S is the market price of the security X the exercise priceand T the expiry date.

Payoff to call holder:

ST – X if ST > X ; 0 otherwise

Payoff to call writer:

– (ST – X) if ST > X ; 0 otherwise

Put-call parity:

• The value of a call must equal:

• the value of the underlying stock plus

• the value of a put with the same exercise price etc minus

• A bond with the same maturity value as the exercise price of the stock

PSXPVC 0)(

PSr

XC

Tf

0)1(

Why hold a call or put in your portfolio? (2)

Solutions to views about risk patterns:

Problem: You might think a security is headed for a period of volatility: but you don’t know if it will go up or down:

Solution: Hold a “straddle”, i.e. a call and a put simultaneously (with the same exercise price and same maturity

Problem: You think the security will go up but not all that much, so would like to benefit from the upside, but not pay the full call option premium

Solution: Hold a spread, i.e. hold a call and write another call with a higher exercise price:

Step by step to finding the value of a call option

Stock price

Value of call

0X

Payoff from call at expiry

Stock price

Value of call

0X

Value of call prior to expiry

Payoff from call at expiry

Step by step to finding the value of a call option

Stock price

Value of call

0St

Ct

X

Value of call prior to expiry

Payoff from call at expiry

Step by step to finding the value of a call option

Stock price

Value of call

0St

CtB

C

X

Value of call prior to expiry

Payoff from call at expiry

BC = time value

D

CD = intrinsic value

Step by step to finding the value of a call option

Options in unexpected places

• An equity claim on a leveraged firm is an option

• A collateralized loan is (for the lender) like a call on the collateral

• An investment idea which can be implemented sometime in the future is like an option: when to exercise it?

How much should you pay for an option?

• Simple case: two period, two states of world (u and d)

• Find a portfolio that perfectly hedges the option

• Payoffs equal in both states

• One holds the stock (and some borrowing)

• The other holds the option

• This portfolio must have the same value as the stock

How much should you pay for an option? (2)

• We find that the price does depend on the interest rate for borrowing

• But not on the final stock price or the beta of the stock

• Hedge ratio: how many units of the stock needed to hedge the option?

00 dSuS

CCH du

How much should you pay for an option? (3)

• More general: two period, three states of world– could come from two half-steps (uu, ud, du and dd)

• And we can continue the subdivision….to continuous time….and the binomial gets closer to a Normal distribution

• The maths gets more complicated

• (Stochastic calculus)

• (Black and Scholes)

How much should you pay for an option? (4)

N(d) = The probability that a random draw from a standard Normal (Gaussian) distribution will be less than d.

)()( 2100 dNXedNSC rT

T

TrXSd

)2/()/ln( 2

01

Tdd 12

How much should you pay for an option? (4)

N(d) = The probability that a random draw from a standard Normal (Gaussian) distribution will be less than d.

)()( 2100 dNXedNSC rT

T

TrXSd

)2/()/ln( 2

01

Tdd 12

Price of call

Price of stock Exercise price

Time to maturityInterest rate

Stock price volatility

How much should you pay for an option? (5)

Surprising feature of the Black-Scholes solution:Option value does not depend on the expected rate of

return on the stock

If N close to 1, then stock price is well above exercise price (relative to the volatility), so option almost certain to be exercised

How much should you pay for an option? (6)

Surprising feature of the Black-Scholes solution:Option value does not depend on the expected rate of return on the

stock

The data needs: if we believe Black-Scholes and want to know option prices, hardest part is stock volatility σ

Implied volatility: if we know the option price and believe Black-Scholes, then we can solve back for σ

If N close to 1, then stock price is well above exercise price (relative to the volatility), so option almost certain to be exercised

The implied volatility of US stocks, 2004-yesterday

Note: log scale

The implied volatility of US stocks, 1990-yesterday

Note: log scale

Hedge ratio (“delta”)

• (Already defined for the two-state model)

• Is the change in the price of the option for a $1 increase in the stock price– i.e. the slope of the option price curve

• Is less than one (for call option)– But note that elasticity of option price with respect to stock price

is higher– Equals N(d1) in the Black Scholes formula

• Think of it as the defining the proportions in which options and stocks must be held to hedge the risk

Assumptions underlying Black-Scholes and how well does it fit?

• “Brownian motion” – normally distributed continuous price changes – no jumps

• Fits quite well

• But, especially after 1987, implied volatility seems systematically related to exercise price

• Deep in the money puts are expensive• The volatility “smirk”

Put options on S&P 500, 21 days, 1995

Out-of-the-money puts have high implicit volatility

Bates, 2005

The Smirk

Put options on S&P 500, 21 days, 1995

Out-of-the-money puts have high implicit volatility

Bates, 2005

The Smirk

Put options on S&P 500, 21 days, 1995

True hedge ratio delta deviates a little from Black-Scholes formula

Bates, 2005

The Crash of ’87 – Oops, I thought I was insured

The Crash of ’87 – Oops, I thought I was insured

Dynamic hedging and the crash of October 19, 1987

• Portfolio insurance products used dynamic hedging to try to eliminate downside risk – (using “protective” puts)

• But market movements were too sudden – dynamic hedging adjustments couldn’t keep up with price movements

– deltas increased and insurers needed to buy more puts and/or sell stock

– Information systems couldn’t keep up – price information was out of date

– Trading stopped for a while in some stocks and derivatives

• So the insurance did not work properly– And indeed helped to destabilize the market

– One-day fall in US stock prices of 20%

The Crash of ’87 --- Hmm, not so bad on the longer view

Shiller: Irrational Exuberance

The Crash of ’87 --- What crash?

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Shiller: Irrational Exuberance

The Crash of ’87 --- What crash?

0

500

1000

1500

2000

2500

1870 1890 1910 1930 1950 1970 1990 2010

Year

Rea

l S&

P 50

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Earnings

Forward and futures markets

• Forwards useful for hedging a known commitment due in the future.

• Forward transactions and futures markets do much the same thing

• Forward transactions are bilaterally negotiated or offered “over-the-counter” by e.g. a bank

• Futures markets are organized exchanges where standardized contracts are traded…and the final settlement is in cash for the difference between spot and forward

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