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Chapter 24
Integrating Derivative Assets and Portfolio Management
Portfolio Construction, Management, & Protection, 5e, Robert A. StrongCopyright ©2009 by South-Western, a division of Thomson Business & Economics. All rights reserved.
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Life wasn’t designed to be risk-free. They key is not to eliminate risk, but to estimate it accurately and manage
it wisely.
William A. Schreyer, former chairman and CEO, Merrill Lynch & Company
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Introduction Chapter is an extended example focusing on risk
management and income generation in a portfolio context
Portfolio objectives must be set with or without derivatives
Futures and options:• Can be used in risk management and income generation
• Can be used to adjust the fixed-income portfolio, the equity portfolio, or both to accomplish the objectives
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Setting the Stage Assume:
• You are newly responsible for managing a corporate in-house scholarship fund
• The fund consists of corporate and government bonds and bank CDs
• The fund has growth of income as the primary objective and capital appreciation as the secondary objective
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Setting the Stage (cont’d) Assume (cont’d):
• A one-time need requires income generation of $75,000 during the next year
• An account is opened with the deposit of cash and the existing fixed-income securities for a value of about $1.5 million
• Trading fees are paid out of a small, separate trust fund
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TABLE 24-1 Fixed Income Securities
Par Issue Price(%) YTM(%)Market
ValueAnnual Income Duration
$50,000 US6s18 100 6.00 $50,000 $3,000 5.13
$50,000 US7s19 105 6.10 52,500 3,500 5.69
$50,000 US7s20 105 6.20 52,500 3,500 6.31
$50,000 US7s21 104 ¾ 6.30 52,375 3,500 6.88
$50,000 US5.5s22 90 5/8 6.80 45,313 2,750 7.69
$50,000 AB6.3s23 94 5/8 7.00 47,313 3,150 8.01
$50,000 CD7.1s24 100 7.10 50,000 3,550 8.27
$50,000 EF7.3s25 100 7/8 7.20 50,438 3,650 8.63
$50,000 GH7¼s26 99 ½ 7.30 49,750 3,625 9.01
$50,000 IJ6¼s27 89 5/8 7.40 44,813 3,125 9.63
$500,000 $495,002 $33,350 7.48*
*Value-weighted average
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Stocks You decide to include stocks in the
portfolio for $1,000,000 so that:• The portfolio beta is between 1.05 and 1.15• The investment in each stock is between 4 and
7 percent of the total• You avoid odd lots
Linear programming can be used to determine the solution (see Table 24-3)
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Stock & Bond Portfolio Facts The final portfolio consists of:
• $495,002 in bonds• $996,986 in stocks• $3,014 in cash• A total value of $1,495,002
The existing portfolio should yield:• $33,350 from bonds• $25,026 from dividends
You are $16,624 short relative to the $75,000 goal
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Writing Index Calls You want to write index call options to
generate the additional needed income:• Write short-term out-of-the-money calls to
avoid exercise• Determine implied volatilities of the options• Use the implied volatilities to determine the
option deltas• Determine the number of options you can write
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Writing Index Calls (cont’d) Eligible options are identified (all with
August expiration):
Striking Price Premium Delta
305 4.13 0.435
310 3 0.324
315 1.75 0.228
320 1 0.151
Current level of the Index = 298.96
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Maximum Permissible Index Written With Cash as Collateral:
15% of Index + MVIndex – $ Out of Money Total Portfolio Value
• 15% of Index (@ 310): 0.15 x $298.96 x 100 x N• Market Value of Index (@ 310): + $3.00 x 100 x N• Out-of-money amount (@ 310): - ($310 - 298.96) x N
With stock as collateral you can write half as many options
With fixed income securities the maximum number written is between these extremes
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Writing Index Calls (cont’d) You determine the maximum contracts you
can write using stock as collateral:
Striking Price Premium Delta
Maximum Contracts Income
305 4.875 0.435 171 $83,362
310 3.00 0.324 203 60,900
315 1.75 0.228 244 42,700
320 1.00 0.151 301 30,100
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Writing Index Calls (cont’d) You decide to write 56 AUG 310 index
calls:• Generates $3 × 56 × 100 = $16,800 in income
immediately
• The delta of 0.324 indicates that these options will likely expire worthless
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Determining the Portfolio Delta and Beta
Effective stock portfolio risk management requires determination of portfolio delta and beta• The equity portion of the portfolio has a beta of
1.08• Writing index call options always reduces the
portfolio beta– Short calls carry negative deltas
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Determining the Portfolio Delta and Beta (cont’d)
First, determine the hedge ratio for the stock portfolio:
Portfolio value Beta
Contract value
$996,9751.08 36.02
$298.96 100
HR
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Determining the Portfolio Delta and Beta (cont’d)
The stock portfolio is theoretically equivalent to 36.02 at-the-money contracts of the index
Next, calculate the delta of a hypothetical index option with a striking price of 298.96• Assume the delta is 0.578
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Determining the Portfolio Delta and Beta (cont’d)
Delta Contribution of Stock Portfolio• Index Equivalent x Delta x 100 = Contribution
– 36.02 x 0.578 x 100 = 2,081.96
Delta Contribution of AUG 310 Calls• Contracts x Delta x 100 = Contribution
– 56 x (-0.324) x 100 = -1814.40
Position Delta = 2.081.96 – 1814.40 = 267.56
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Determining the Portfolio Delta and Beta (cont’d)
Lastly, estimate the resulting portfolio beta:
Initial portfolio delta Final portfolio delta
Initial portfolio beta Final portfolio beta
2,081.96 267.56
1.08 BetaBeta 0.14
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Determining the Portfolio Delta and Beta (cont’d)
The stock portfolio combined with the index options:• Has a slightly positive position delta• Has a slightly positive beta
The total portfolio is slightly bullish and will benefit from rising market prices
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Caveats about Prices from the Popular Press
Nonsynchronous trading is the phenomenon whereby comparative prices come from different points in time• Prices for less actively traded issues may have
been determined hours before the close of the market
• When you consider strategies involving away from the money options, you should verify the actual bid/ask prices for a security
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Caveats about Black-Scholes Prices for Away-from-the-Money Options
The Black-Scholes Option Pricing Model:• Works well for near-the-money options • Works less accurately for options that are
substantially in the money or out of the money
To calculate delta, it may be preferable to calculate implied volatility for the option you are investigating
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Hedging Company Risk Equity options can be used to hedge
company specific risk• Company specific risk is in additional to overall
market risk– e.g., a lawsuit
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Buying Puts To hedge against a small price change, it is
necessary to determine how many option contracts are necessary to bring the position delta to zero:
100deltaput
0.1sharescontracts of #
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Buying Puts (cont’d)Example
You own 1,000 shares of a stock currently selling for $56 per share. Put options are available with a premium of $0.45 and a $55 striking price. The put delta is –0.18.
How many options should you purchase to hedge your position in the stock from a downfall due to company specific risk?
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Buying Puts (cont’d)Example (cont’d)
Solution: Calculate the number of contracts needed:
56.5510018.0
0.1000,1
100deltaput
0.1sharescontracts of #
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Buying Puts and Writing Calls Hedging a long stock position involves adding
negative deltas to the positive deltas from the shares• Long puts and short calls both have negative deltas
Major market movements up or down can result in significantly different ending portfolio values for the puts-only scenario compared with the puts-and-calls alternative
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Fixed-Income Portfolio T-bond futures can be used to reduce
interest rate risk by reducing portfolio duration • If interest rates rise, the value of a fixed-income
portfolio declines T-bond futures options are a useful
investment
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Hedging the Bond Portfolio Value with T-Bond Futures (cont’d)
Determine the hedge ratio:
where price of bond portfolio as a percentage of par
duration of bond portfolio
price of futures contract as a percentage
duration of cheapest-to-deliver bond eligible
b bctd
f f
b
b
f
f
P DHR CF
P D
P
D
P
D
for delivery
conversion factor for the cheapest-to-deliver bondctdCF
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Hedging the Bond Portfolio Value with T-Bond Futures (cont’d)
Determine the number of contracts you need to sell to hedge:
Portfolio valueNumber of contracts
$100,000HR
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Hedging the Bond Portfolio Value with T-Bond Futures (cont’d)
Example
A fixed-income portfolio has a value of $495,002. Using the cheapest-to-deliver bond, you determine a hedge ratio of 0.8215.
How many T-bond futures do you need to sell to completely hedge this portfolio?
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Hedging the Bond Portfolio Value with T-Bond Futures (cont’d)
Example (cont’d)
Solution: You need to sell 5 contracts to hedge completely:
contracts 91.4
9914.0000,100$
002,495$
000,100$
valuePortfoliocontracts ofNumber
HR
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Hedging the Bond Portfolio with Futures Options
A futures option is an option giving its owner the right to buy or “sell” a futures contract• A futures call gives its owner the right to go long a futures
contract
• A futures put gives its owner the right to go short a futures contract
The buyer of a futures option has a known and limited maximum loss• Buying only the futures contract can result in large losses
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Hedging the Bond Portfolio with Futures Options (cont’d)
Futures options do not require the good faith deposit associated with futures
You could buy T-bond futures puts instead of going short T-bond futures to hedge the bond portfolio
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Hedging the Bond Portfolio with Futures Options (cont’d)
The appropriate hedge ratio for futures options is:
Portfolio value 1
$100,000 DeltaHR CF
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Hedging the Bond Portfolio with Futures Options (cont’d)
Example
A fixed-income portfolio has a value of $495,002. MAR 98 T-bond futures calls are available with a premium of 2-44 and a delta of 0.583. The underlying futures currently sell for 91.
How many calls do you need to write to hedge? What is the income this strategy generates?
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Hedging the Bond Portfolio with Futures Options (cont’d)
Example (cont’d)
Solution: The hedge ratio indicates you need to write 9 contracts to hedge:
Portfolio value 1
$100,000 Delta
$495,002 10.91
$100,000 0.583
8.933
HR CF
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Hedging the Bond Portfolio with Futures Options (cont’d)
Example (cont’d)
Solution (cont’d): Writing 9 calls will generate $24,187.50:
2 44/64% × $100,000 × 9 = $24,187.50
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Managing Cash Drag A portfolio suffers a cash drag when it is
not fully invested• Cash earns a below-market return and dilutes
the portfolio return
A solution is to go long stock index futures to offset cash holdings
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Managing Cash Drag (cont’d)Example
You are managing a $600 million portfolio. 93% of the portfolio is invested in equity, and 7% is invested in cash. Your equity beta is 1.0. During the last year, the S&P 500 index (your benchmark) earned 8 percent, with cash earning 2.0 percent.
What is the return on your portfolio?
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Managing Cash Drag (cont’d)Example (cont’d)
Solution: The return on your total portfolio is 7.58% (42 basis points below the market return):
(0.93 x 0.08) + (0.07 x 0.02) = 7.58%
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Managing Cash Drag (cont’d)Example (cont’d)
Assume a distant SPX futures contract settles for 1150.00.
How many futures contracts should you buy to make your portfolio behave like a 100 percent equity index fund?