The document discusses various financial derivatives including synthetic instruments, options, interest rate derivatives, currency and equity swaps, credit default swaps, and credit derivative trading strategies. It provides formulas for pricing these instruments and outlines how their values are affected by various risk factors.
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L2 flash cards derivatives - ss 17
1. Synthetic Call
fiduciary call - consists of a European call and a risk free bond.
protective put - consists of a put and underlying asset.
Formula:
Study Session 17, Reading 50
2. Synthetic Put
Formula:
It says that a put is equal to a long call.
A short position in the underlying. Long position in the bond.
Study Session 17, Reading 50
3. Synthetic Stock
Formula:
Buy a European call. Sell a European put. Invest the present
value of exercise price in a riskless pure discount bond.
Study Session 17, Reading 50
4. Synthetic Bond
synthetic bond - a portfolio of financial instruments designed to
mimic the cash flow and risk profile of a bond.
A synthetic bond may contain financial instruments such as
bond puts, bond calls, bond futures, Treasuries, money market
securities, and CDS'.
Study Session 17, Reading 50
5. Binomial Model for Options on Assets
A binomial tree is built depicting different prices under
different probabilities.
If there is no risk involved, all assets will be priced to provide a
riskless rate of return.
Value:
P=1+r-d/u-d
Study Session 17, Reading 50
6. Binomial Interest Rate Option Pricing
Formula(s):
Expiration value of a caplet = max⦋0,{(1-yr-cap rate)×notional
principal}⦋/1+one year rate
Expiration value of a floorlet = max⦋0,{(floor rate-one year
rate)×notional principal}⦋/1+one year rate
Study Session 17, Reading 50
7. Assumptions Underlying
the Black-Scholes-Merton Model
Price of the underlying follows a lognormal distribution.
Lognormal variable has values which are normally distributed.
The value of the option has a minimum of zero.
The risk free rate is constant and known.
Interest rate volatility is important for determining the value
of bonds.
Study Session 17, Reading 50
8. Effect of Changes in Input Values
on Call Option Prices
Higher for higher underlying price
Higher for longer time to expiration
Higher for higher volatility
Higher for higher risk free rate
Higher for lower exercise price
Study Session 17, Reading 50
9. Effect of Changes in Input Values
on Put Option Prices
Higher prices for lower underlying prices
Higher prices for higher volatility
Higher prices for lower risk free rate
Higher prices for higher exercise price
Study Session 17, Reading 50
10. Delta of an Option
in Dynamic Hedging
Delta estimates the change in price for a one unit change in the
price of the underlying.
Formula(s):
Delta Call =change in call price/change in stock price.
Change in call price ≈ N(d1)× change in stock price
Change in put price ≈ N(d1)-1× change in stock price
Where: N(d1) - call options delta
N(d1)-1 - put option’s delta
Study Session 17, Reading 50
11. Delta of an Option
in Dynamic Hedging (cont.)
Dynamic hedging (also called delta neutral hedge) involves
creating a delta neutral portfolio with a combination of short
call options and the underlying stock.
Formula:
number of call options needed to delta hedge=number of shares
hedged/delta of call option
Study Session 17, Reading 50
12. Gamma Effects on a Delta Hedge
Gamma measures the rate of change in delta as the price of
the underlying changes
Gamma can be used as a measure of the effectiveness of a
delta hedge.
Hedges with at the money options will have higher gammas.
Small changes in the stock prices will cause large changes in
deltas and frequent rebalancing
Study Session 17, Reading 50
13. Effect of Underlying Asset's Cash
Flows on the Price of an Option
Some assets have cash flows attached to them
Option prices need to be adjusted for these cash flows
All else equal, cash flows on the underlying will decrease the
value of a call option.
All else equal, cash flows on the underlying will increase the
value of a put option.
Study Session 17, Reading 50
14. Historical Volatility for Estimating
the Future Volatility of the
Underlying Asset
Volatility - measures the day to day price changes in the market.
Historical volatility - a measure of price changes during a
specific time period in the past
Factors to calculate volatility:
1. Calculate the continuously compounded return at each interval.
2. Calculate the daily price changes.
3. Calculate the average daily price change.
4. Calculate the standard deviation of returns.
5. Annualise historical volatility.
Study Session 17, Reading 50
15. Implied Volatility for Estimating
the Future Volatility of the
Underlying Asset
Implied volatility looks into the future. It can be inferred by
working backward by setting the BSM price equal to the
market price.
Study Session 17, Reading 50
16. Put-Call Parity for Options
on Forwards
Two portfolios will be created to make the put call parity.
Formula(s):
Co+
Co+
Study Session 17, Reading 50
17. American and European Options
on Forwards and Futures
The Black model can be used to price the European options on
futures:
c = e − rcT[FN(d1) − XN(d2)]
p = e − rcT[X(1-N( − d2)) – F(1-N( − d1))]
Study Session 17, Reading 50
18. Pricing and Valuation of Swaps
A swap rate (fixed rate) is determined at the time of initiation
of the swap.
The value of the swap at the time of the initiation is zero to
both the parties.
The swap rate makes the present value of the fixed rate
component equal to the floating rate component of the swap.
Study Session 17, Reading 51
19. Interest Rate Swaps
to Off-Market FRAs
Swaps are also referred to as a series of off- market FRAs.
Each FRA fixed rate differs but the swap fixed rates are known
for the life of the swap.
The swap fixed rate is equal to “average” rate of on-market
FRAs.
The FRA payment is determined at the end of the period.
Study Session 17, Reading 51
20. Plain Vanilla Swap to Interest Rate
Call and Put
Swaps can also be equal to interest rate calls and puts.
A fixed rate paying swap is equal to long interest rate call and
short interest rate put.
A fixed rate receiver swap is equal to long interest rate put
and short interest rate call.
Study Session 17, Reading 51
21. Fixed Rate and Market Value of the
Swap
The fixed rate is determined at the time of initiation.
Formula(s):
Where: Zn - the n period zero coupon bond
Study Session 17, Reading 51
22. Fixed Rate and Market Value of the
Swap (cont.)
Formula(s) to calculate Market Value:
Market value is also sometimes called the replacement value
Study Session 17, Reading 51
23. Four types of currency swaps
1. Fixed for fixed
2. Fixed for floating
3. Floating for floating
4. Floating for fixed
Study Session 17, Reading 51
24. Fixed Rate on Currency Swap
Formula(s):
Study Session 17, Reading 51
25. Three types of equity swaps
1. Pay fixed and receive return on the equity
2. Pay floating rate and receive the return on the equity
3. Pay the return on one equity and receive the return on
another equity
Study Session 17, Reading 51
26. Fixed Rate on an Equity Swap and
Market Value
The equity side can be valued by multiplying the notional
principal with the one percent change in the equity side
since the last payment date
Formula:
Study Session 17, Reading 51
27. Swaptions
swaption - an option on a swap. It gives the holder a right to
enter into an interest rate swap in the future.
strike rate - the fixed rate in the Swaption is predetermined
Study Session 17, Reading 51
28. Payoffs and Cash Flows
of an Interest Rate Swaption
If the swap rates rise, a payer Swaption is in the money.
A receiver swaption is in the money if the interest rates fall.
Annuity payments will be achieved by the holder of the option
by exercising an in the money swaption.
Payoff comes in the form of interest savings.
Study Session 17, Reading 51
29. The Value of an Interest Rate Swaption
at Expiration
payoff of a payer swaption = max×∑(discount factor)
payoff of a receiver swaption = ×∑(discount factor)
The value of the receiver swaption at expiration is the maximum
of zero and the present value of a stream of payments.
Study Session 17, Reading 51
30. Credit Risk
swap credit risk - the risk that one party will be unable to make
the payments owed to the other party
current credit risk - the risk pertaining to the current payment
due
potential credit risk - the risk of a party being unable to make a
future payment is called the
Study Session 17, Reading 51
31. Swap Spread and its Relation
to Credit Risk
The swap spread indicates the average credit risk in the global
economy.
The swap spread is the quality or default risk spread between
a default free security and LIBOR.
Swap Spread = Fixed-rate on Swap - yield on default free
security of the same maturity as the swap
Study Session 17, Reading 51
32. Interest Rate Caps
interest rate cap or ceiling - an agreement where one party
agrees to pay when the reference rate is greater than
predetermined rate
caplets - individual interest rate call options
long cap - equal to a portfolio of long put options on fixed
income security prices.
Study Session 17, Reading 52
33. Interest Rate Floors
interest rate floor - an agreement in which one party agrees to
pay when the reference rate is less than the predetermined
rate
floorlet - separate put option
long floor - is equal to a portfolio of long call options on fixed
income security prices
Study Session 17, Reading 52
34. Payoff for a Cap and Floor
Formula(s):
Payoff to cap buyer= Max (0, Notional Principal×(Reference rateCap rate)×(actual days/360))
Payoff to floor buyer = Max (0, Notional Principal×(Floor ratereference rate)×(actual days/360))
Study Session 17, Reading 52
35. Interest Rate Collar
interest rate collar - a combination of a long interest rate cap
and a short interest rate floor.
zero-cost collar - a collar is structured such that the premium
paid for a cap is equal to the premium received from the floor
Study Session 17, Reading 52
36. Credit Default Swaps
and Corporate Bonds
CDS is just like an insurance contract. It provides the buyer
protection against the default risk, bankruptcy or credit
ratings downgrade.
CDS are usually written on fixed income securities, a bond, or
a loan.
Study Session 17, Reading 53
37. Advantages of Credit Default Swaps
Credit Default Swaps (CDS) provide a hedge against event risk.
CDS allow for the management of credit risk separately.
Default risk and interest rate risk can be managed separately.
Study Session 17, Reading 59
38. Uses of Credit Default Swaps
To hedge the credit risk exposure
Easy liquidity and access to the rest of the participants in the
market
To satisfy regulatory capital requirements
For hedging and enhancing income
Study Session 17, Reading 59
40. Basis Trade
Value:
cash-default swap = CDS spread (premium)- asset (bond) swap
spread
negative basis - the bond is cheaper than the CDS and a positive
annuity can be built by buying bond and the CDS
positive basis trade - involves shorting the bond which makes it
complicated to execute
Study Session 17, Reading 59