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Interest-Rate Risk II. Duration Rules. Rule 1: Zero Coupon Bonds What is the duration of a zero-coupon bond? Cash is received at one time t=maturity weight = 1 So the duration of a zero coupon bond is just its time to maturity in terms of how we have defined “one period” (usually six months).
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Duration Rules • Rule 1: Zero Coupon Bonds • What is the duration of a zero-coupon bond? • Cash is received at one time t=maturity • weight = 1 • So the duration of a zero coupon bond is just its time to maturity in terms of how we have defined “one period” (usually six months)
Duration Rules • Rule 2: Coupon Rates • Coupons early in the bond’s life reduce the average time to get payments. • Weights on early “times” are higher • Holding time to maturity constant, a bond’s duration is lower when the coupon rate is higher.
Duration Rules • Rule 3: Time to Maturity Holding the coupon rate constant, a bond’s duration generally increases with time to maturity. • If yield is outrageously high, then higher maturity decreases duration. • Rule 4: Yield to Maturity For coupon bonds, as YTM increase, duration decreases. • Rule 5: The duration of a level perpetuity is (1+y)/y
Modified Duration of a Portfolio • Banks hold several assets on their balance sheets. • Let vi be the fraction of total asset PV attributed to asset i. • Suppose the bank holds 3 assets • Duration of total assets:
Example • Bank Assets: • Asset 1: PV=$ 8M D*=12.5 • Asset 2: PV=$38M D*=18.0 • Asset 3: PV=$ 2M D*= 1.75 • Total PV = $48M • v1=8/48=0.17, v2=38/48=0.79 v3=2/48=0.04 • Modified Duration of Portfolio: D*=(0.17)(12.5) + (0.79)(18) + (0.04)(1.75)=16.42
Review • For zero coupon bonds: • YTM=effective annual return • For annual bonds: • Effective annual return = YTM assuming we can reinvest all coupons at the coupon rate • For semi-annual bonds • Effective six-month return =YTM/2 assuming we can reinvest all coupons at the coupon rate
Effective Annual Return of a Portfolio • Example: • Portfolio Value: $110 • Annual Bond 1: PV=$65, EAR=5% • Annual Bond 2: PV=$45, EAR=3% • What is effective return on portfolio? (get/pay-1) • Get=65*1.05+45*1.03=114.6 • Pay=110 • Return=114.6/110-1=4.18% • But (65/110)*.05+(45/110)*.03=4.18% • Bottom line: the EAR of a portfolio is the weighted sum of the EARs of the individual assets in the portfolio where weights are the fraction of each asset of total portfolio value.
Back to Building a Bank • From previous example (Building a Bank) • Assets: D*=23.02, PV=100M (YTM=1.8%) • Liabilities: D*=0.99, PV=75M (YTM=1%) • Equity: 25M • Currently a 10 bp increase in rates causes: DA = -23.02*.001*100M = -2.30M DL = -0.99*.001*75M = -0.074M DE =-2.30M-(-0.074M) = -2.23M (drop of 8.8%)
Building a Bank • Suppose you want a 10bp increase in rates to cause equity to drop by only 4% (1M). • Options: A: Hold D* of assets constant and raise D*of liabilities B: Hold D* of liabilities constant and lower D* assets C: Raise D* of liabilities and lower D* of assets
Building a Bank: Option A • Hold D* of assets at 23.02 • For any given D* of liabilities, a 10bp increase in rates will cause equity to change as follows: DE = -2.30M- (-D*75M*.001) • Given that you want a 10bp increase in rates to cause equity to drop by 1M: -1M= -2.30M- (-D*75M*.001) solve for D* D*=17.333
Building a Bank: Option A • How to get D* of liabilities to 17.33? • Issue a bond or CD with duration greater than 17.33. • Example: Issue a zero-coupon bond that matures in 25 years. Assume YTM=1.5%. • Duration=25 • D* = 25/1.015 = 24.63 • How much should you issue?
Building a Bank: Option A • You want the D* of your “liability portfolio” to be 17.33. • Let v=fraction of liability portfolio in the 25yr zero-coupon bond. The rest of your liabilities will come from short-term deposits. 17.33 = v(24.63)+(1-v)(0.99) solve for v v = .6912
Building a Bank: Option A • So make the 25yr bond 69.12% of your liability portfolio. • Total liabilities = 75M • Issue .6912*75M = $51.84M in 25yr zero-coupon bonds with D*=24.63 • Raise $23.16M in short-term deposits with D*=0.99
Building a Bank: Option A • Checking the approximation: • Liabilities: • 51.84 in 25yr zero-coupon bonds (YTM=.015) • 23.16 in deposits (YTM=.01) • We use the duration approximation to set the target. • How do we know if the approximation works? • Let’s find the exact change in equity for a 10bp increase in rates. • First, we need to find future values
Building a Bank: Option A • Future value of Liabilities: • 51.84 in 25yr zero-coupon bonds (YTM=.015) • Future value at expiration (face value) = 51.84*(1.015)^25=75.22 • 23.16M in deposits (YTM=.01) • Future value at expiration = 23.16*1.01 = 23.39 • Present value if rates jump by 10bp: • Zero-coupon bonds: 75.22/1.016^25=50.58 • Deposits: 23.39/1.011 = 23.14 • Change in PV of liabilities if rates jump by 10bp: (50.58M + 23.14) – 75M = -1.28M
Building a Bank: Option A • We know (slides last Wed) that if rates jump by 10bp, assets will drop by exactly 2.27M (PV of bonds drops from 100M to 97.73M) • Change in equity, given a 10bp increase in rates, will be -2.27M-(-1.28M)= -0.99M • Our objective was to have it drop by 1M. So we are very close.
Building a Bank: Option A • By switching away from short-term deposits we’ve lowered interest-rate risk. • Cost (before rates change): • Before we tailored the balance sheet: • Liabilities (75M) YTM=1% • Assets (100M) YTM=1.8% • Profits=1.8M-.75M=1.05M • After tailoring the balance sheet • Liabilities: 0.6912*.015+0.3088*.01 = 1.3% • Assets (100M) YTM=1.8% • Profits=1.8M-1.3M=0.50M
Building a Bank: Option B • Hold D* of liabilities at 0.99 • For any given D* of assets, a 10bp increase in rates will cause equity to change as follows: DE = -D*100M*.001-(-0.074M) • Given that you want a 10bp increase in rates to cause equity to drop by only 1M: -1 = -D*100*.001-(-0.074) solve for D* D*=10.74
Building a Bank: Option B • How to get D* of liabilities to 10.74? • Buy a bond duration less than 10.74 • Example: zero-coupon bond than matures in 5 years. Assume YTM=1.2%. • Duration=5 • D* = 5/1.012 = 4.94 • How much should you purchase?
Building a Bank: Option B • You want the D* of your asset portfolio to be 10.74. • Let v=fraction of asset portfolio in the 5yr zero-coupon bond (D*=4.94). The rest of your assets will be in the 30-yr coupon bonds (D*=23.02). 10.74 = v(4.94)+(1-v)(23.02) solve for v v = 0.679
Building a Bank: Option B • So make the 5yr zero 67.9% of your assets • Total assets = 100M • Buy .679*100M = $67.9M in 5yr zeros • Purchase $32.1M in the 30-year coupon paying bond
Building a Bank: Option B • Checking the effect: • Assets: • 67.9 in 5yr zero-coupon bonds (YTM=.012) • 32.1M in 30-year coupon bonds (YTM=.018) • We want to see how the PV of these assets change as we observe a parallel shift in the yield curve. To do this, we need to find future values.
Building a Bank: Option B • Future value of Assets: • 67.9 in 5yr zero-coupon bonds (YTM=.012) • Future value at expiration (face value) = 67.9*(1.012)^5 = 72.07 • 32.1 in 30-year bonds (YTM=.018, coupon rate=0.18) • Future value at expiration (face value)=32.1 • Present value if rates jump by 10bp: • 5yr zeros: 72.07/1.013^5=67.56 • 30-yr bonds: N=30, FV=32.1, pmt=.018*32.1, ytm=0.019 • PV=31.37 • Change in PV of assets if rates jump by 10bp: (67.56+31.37) – 100 = -1.07 (million)
Building a Bank: Option B • We know (from class last Wed) that if rates jump by 10bp, liabilities will drop by exactly 0.074M • So, given new structure of assets, given a 10bp increase in rates, equity will change as follows: -1.07M-(-0.074M)= -0.996M • Our objective was to have it drop by 1M. So we are very close.
Building a Bank: Option B • By switching away from short-term deposits we’ve lowered interest-rate risk. • Cost (before rates change): • Before we tailored the balance sheet: • Liabilities (75M) YTM=1% • Assets (100M) YTM=1.8% • Profits=1.8M-.75M=1.05M • After tailoring the balance sheet • Liabilities (75M) YTM=1% • Assets (100M) YTM=.679*.012+.321*.018=1.4% • Profits=1.4M-.75M=0.65M
Important Facts • We hedged only at the present time. • As time changes and yields change, modified durations will change. • Need to periodically rebalance hedging portfolio, even if yields remain constant, or hedge will become useless.
Building a Bank: Option C • You can choose several different combinations of the modified durations of assets and liabilities to accomplish the same objective. • Next slide: The possible combinations
Building a Bank: Option C D* of Assets=23.02 D* of Liabilities=17.33 D* of Assets=10.74 D* of Liabilities=0.99
Duration • Using only duration can introduce approximation error. • Duration matching works best for small changes in yields. • Duration allows us to match the slope of the price-curve at a given point. • As you move away from this point, the slope will change – the source of approximation error.
Convexity • Convexity is a measure of how fast the slope is changing at a given point. Not very convex. More convex.
Convexity • Bond investors like convexity • When yields go down, the prices of bonds with more convexity increase more. • When yields go up, the prices of bonds with more convexity drop less • The more convex a bond is, the worse the duration approximation will do. • Possible to incorporate convexity into analysis above.
Appendix: • Modified Duration of a Portfolio
Appendix • Modified Duration of a portfolio (continued)
Appendix • Modified Duration of a portfolio (continued)
Appendix • Modified Duration of a portfolio (continued)
