Investments, 8 th edition Bodie, Kane and Marcus Slides by Susan Hine McGraw-Hill/Irwin Copyright © 2009 by The McGraw-Hill Companies, Inc. All rights reserved. CHAPTER 15 The Term Structure of Interest Rates

15-2 Information on expected future short term rates can be implied from the yield curve The yield curve is a graph that displays the relationship between yield and maturity Three major theories are proposed to explain the observed yield curve Overview of Term Structure

15-3 Figure 15.1 Treasury Yield Curves

15-4 Bond Pricing Yields on different maturity bonds are not all equal –Need to consider each bond cash flow as a stand-alone zero-coupon bond when valuing coupon bonds

15-5 Table 15.1 Yields and Prices to Maturities on Zero-Coupon Bonds ($1,000 Face Value)

15-6 Yield Curve Under Certainty An upward sloping yield curve is evidence that short-term rates are going to be higher next year When next year’s short rate is greater than this year’s short rate, the average of the two rates is higher than today’s rate

15-7 Figure 15.2 Two 2-Year Investment Programs

15-8 Figure 15.3 Short Rates versus Spot Rates

15-9 f n = one-year forward rate for period n y n = yield for a security with a maturity of n Forward Rates from Observed Rates

15-10 Example 15.4 Forward Rates 4 yr = 8.00%3yr = 7.00%fn = ? (1.08) 4 = (1.07) 3 (1+f n ) (1.3605) / (1.2250) = (1+f n ) f n =.1106 or 11.06%

15-11 Downward Sloping Spot Yield Curve Example Zero-Coupon RatesBond Maturity 12% % % %4 9.25%5

15-12 Forward Rates for Downward Sloping Y C Example 1yr Forward Rates 1yr[(1.1175) 2 / 1.12] - 1 = yrs[(1.1125) 3 / (1.1175) 2 ] - 1 = yrs[(1.1) 4 / (1.1125) 3 ] - 1 = yrs[(1.0925) 5 / (1.1) 4 ] - 1 =

15-13 Interest Rate Uncertainty What can we say when future interest rates are not known today Suppose that today’s rate is 5% and the expected short rate for the following year is E(r 2 ) = 6% then: The rate of return on the 2-year bond is risky for if next year’s interest rate turns out to be above expectations, the price will lower and vice versa

15-14 Interest Rate Uncertainty Continued Investors require a risk premium to hold a longer-term bond This liquidity premium compensates short- term investors for the uncertainty about future prices

15-15 Expectations Liquidity Preference –Upward bias over expectations Theories of Term Structure

15-16 Expectations Theory Observed long-term rate is a function of today’s short-term rate and expected future short-term rates Long-term and short-term securities are perfect substitutes Forward rates that are calculated from the yield on long-term securities are market consensus expected future short-term rates

15-17 Long-term bonds are more risky Investors will demand a premium for the risk associated with long-term bonds The yield curve has an upward bias built into the long-term rates because of the risk premium Forward rates contain a liquidity premium and are not equal to expected future short- term rates Liquidity Premium Theory

15-18 Figure 15.4 Yield Curves

15-19 Figure 15.4 Yield Curves (Concluded)

15-20 Interpreting the Term Structure If the yield curve is to rise as one moves to longer maturities –A longer maturity results in the inclusion of a new forward rate that is higher than the average of the previously observed rates –Reason: Higher expectations for forward rates or Liquidity premium

15-21 Figure 15.5 Price Volatility of Long-Term Treasury Bonds

15-22 Figure 15.6 Term Spread: Yields on 10- Year Versus 90-Day Treasury Securities

15-23 Forward Rates as Forward Contracts In general, forward rates will not equal the eventually realized short rate –Still an important consideration when trying to make decisions : Locking in loan rates

15-24 Figure 15.7 Engineering a Synthetic Forward Loan