Download presentation
Presentation is loading. Please wait.
1
1 Finance School of Management Objective Explain the principles of bond pricing Understand the features that affect bond prices Chapter 8. Valuation of Known Cash Flows: Bonds
2
2 Finance School of Management Chapter 8 Contents Using Present Value Formulas to Value Known Flows The Basic Building Blocks: Pure Discount Bonds Coupon Bonds, Current Yield, and Yield-To-Maturity Reading Bond Listings Why Yields for the Same Maturity Differ The Behavior of Bond Prices over Time
3
3 Finance School of Management Valuation and Fixed-Income Securities Essence of valuation process –To estimate an asset’s market value using information about the prices of comparable assets. Valuation models –A quantitative method used to infer an asset’s value from market information about the prices of other assets and market interest rates. Fixed-income securities and other contracts promising a stream of known future cash payments –Bonds –Mortgages –Pension annuities
4
4 Finance School of Management Reasons for Valuing Fixed-Income Securities To have an agreed-upon valuation procedure in setting the terms of the contracts at the outset. To revaluate the securities when they are sold before maturity.
5
5 Finance School of Management Using Present Value Formulas to Value Known Cash Flows A fixed-income security that promises to pay $100 each year for the next three years. The appropriate discount rate is 6% per year. An hour after you buy the security, the risk-free interest rate rises from 6% to 7% per year.
6
6 Finance School of Management Bond Prices Fall as the Interest Rates Rise Write the PV of the fixed-income security as the sum terms
7
7 Finance School of Management The Difficulty of Valuation of Known Cash Flows We do not know usually which discount rate to use in the present value formula. Is it correct to use the interest rate corresponding to a three-year maturity in valuing the three-year annuity in the previous example?
8
8 Finance School of Management
9
9 Finance School of Management The Basic Building Blocks: Pure Discount Bonds The difficulties of finding equivalent fixed-income securities, or comparables and making adjustments for differences. Any fixed-income security can be decomposed into a series of known payments at different time points in the future. Pure discount bonds (zero-coupon bonds): Promising a single payment of cash at the maturity date (in the future).
10
10 Finance School of Management Pure Discount Bonds The pure discount bond is an example of the present value of a lump sum equation we analyzed in Chapter 4. Solving this, the yield-to-maturity on a pure discount bond is given by the relationship:
11
11 Finance School of Management Pure Discount Bonds In this equation, –P is the present value or price of the bond –F is the face or future value –n is the investment period –i is the yield-to-maturity
12
12 Finance School of Management Pure Discount Bonds A two-year pure discount bond with a face value of $1,000 and a price of $880
13
13 Finance School of Management Pricing a Coupon Bond A 3-year bond with a face value of $1,000 that makes annual coupon payments at a coupon rate 10% Prices of pure discount bonds
14
14 Finance School of Management First Solution Method
15
15 Finance School of Management Second Solution Method
16
16 Finance School of Management The YTM of the Coupon Bond It would be a mistake to discount all three cash flows using the same three-year yield of 7.28%. The single discount rate that we can use to discount all three cash flows is the yield-to-maturity (YTM). However, can we get it?
17
17 Finance School of Management You would like to create a 2-year synthetic zero-coupon bond. Assume you are aware of the following information: –1-year zero-coupon bonds are trading for $0.93 per dollar of face value, and –2-year 7% coupon bonds (annual payments) are selling at $985.30 (Face value = $1,000). Assume you can purchase the 2-year coupon bond and unbundle the two cash flows and sell them. –You would receive.93×$70 = $65.10 from the sale of the first payment. –To break even, you would need to receive $985.30- $65.10 = $920.20 from the sale of the 2-year strip. Coupon Stripping
18
18 Finance School of Management The Principle of STRIPs Compensation for reinvestment risk Single term Low value No compensation for reinvestment risk Multiple terms Secondary market High value Output Security n-year coupon treasure bond 6-month zeros 1-year zeros n-year zeros Input Security Decompose the CFs Investment Bank Term Intermediation
19
19 Finance School of Management In 1982, Merrill Lynch: TIGRs—Treasury Investment Growth Receipts. Follow up: Salomon Brother’s Certificates of Accrual on Treasury Security (CATs) 、 Lehman Investment Opportunity Notes (LIONs) —‘Animals’. In 1984, American government: STRIPS—Separate Trading of Registered Interest and Principal of Securities. In 1985, the outstanding face value is over 100 billion dollars. The Development of STRIPs
20
20 Finance School of Management Coupon Rate Coupon rate is the interest rate applied to the face value to compute the coupon payment. –A bond with a face value of $1,000 and a coupon rate of 10% –An annuity component of $100 per year and a “balloon” or “bullet” payment at maturity
21
21 Finance School of Management Current Yield and Yield-to-maturity Current yield is the annual coupon divided by the bond’s price. Yield-to-maturity is the discount rate that makes the present value of a bond’s stream of promised cash payments equal to its price.
22
22 Finance School of Management Example 1 A 20-year-maturity bond with a face value of $1,000 and a coupon rate of 10% was originally issued 19 years ago. At that time, the yield curve was flat at 10% per year. Now the interest rate on one-year bonds is 5% per year. Its market price will now be Its current yield is Its yield-to-maturity is
23
23 Finance School of Management Example 2 A bond with a face value of $1,000 and a coupon rate of 4% will mature in two years. Its market price is $950. Its current yield is Its yield-to-maturity
24
24 Finance School of Management Bonds Trading at Par Bond Pricing Principle #1: (Par Bonds) –If a bond’s price equals its face value, then its yield-to-maturity = current yield = coupon rate. Proof:
25
25 Finance School of Management Bonds Trading at Premium or Discount Bond Pricing Principle #2: (Premium Bonds) –If a bond has a price higher than its face value, then its yield-to-maturity < current yield < coupon rate. Bond Pricing Principle #3: (Discount Bonds) –If a bond has a price lower than its face value, then its yield-to-maturity > current yield > coupon rate.
26
26 Finance School of Management Proof:
27
27 Finance School of Management
28
28 Finance School of Management Beware of “High-Yield” US Treasure Bond Funds You have $10,000 to invest for one year. You are deciding between: –Putting your money in a one-year government-insured bank CD offering an interest rate of 5%; –Investing in the shares of a U.S. Treasure bond fund that holds one-year bonds with a coupon rate of 8%. The bonds are selling at a premium: you must pay $10,285.71 for $10,000 of face value. The fund advertises a yield of 7.78%. The fund charges a 1% annual fee for their services.
29
29 Finance School of Management Beware of “High-Yield” US Treasure Bond Funds
30
30 Finance School of Management The Effect of Coupon Rate Two different two-year coupon bonds—one with a coupon rate of 5% and the other with a coupon rate of 10%. The current market prices and yields of one- and two- year pure discount bonds:
31
31 Finance School of Management The Effect of Coupon Rate The market prices of the two coupon bonds should be –For the 5%-coupon bond: –For the 10%-coupon bond: The yields to maturity on the coupon bonds should be –For the 5%-coupon bond, the YTM is 5.9500% –For the 10%-coupon bond, the YTM is 5.9064% When the yield curve is not flat, bonds of the same maturity with different coupon rates have different yields to maturity.
32
32 Finance School of Management Other Effects on Bond Yields Default risk Taxes Callability Convertibility
33
33 Finance School of Management The Effect of the Passage of Time A 20-year pure discount bond with a face value of $1,000 and a constant yield of 6% should be priced at After one year goes by, its price should be If the yield curve were flat and interest rates did not change, any default-free discount bond’s price would rise with the passage of time, and any premium bond’s price would fall.
34
34 Finance School of Management Movement of a Pure discount Bond’s Price over Time
35
35 Finance School of Management Interest-Rate Risk The concept The sensitivity of bond prices to interest rates −The prices of 30-year 8% coupon par bond would fall by roughly 10% if the level of interest rates were to rise from 8% to 9%. −The prices of 30-year pure discount bond would fall by roughly 23% if the level of interest rates were to rise from 8% to 9%. Why?
36
36 Finance School of Management Sensitivity of Bond Price to Interest Rates
37
37 Finance School of Management Duration and Modified Duration
38
38 Finance School of Management The Duration of A Bond Portfolio
39
39 Finance School of Management An Illustration An pension fund is selling a new insurance policy (pension annuity), which promises an annual payment of $100 for 15 years. At the discount rate of 10%, the PV of the liability is $760.61, and the modified duration is 5.708.
40
40 Finance School of Management The pension fund will invest the $760.61, requiring at least a return of 10%. There are two instruments: A 30-year treasure bond paying an interest rate of 12% and selling at par, and a 6-month treasure bill offering an interest rate of 8% per year. The duration for the two securities are 8.080 and 0.481 respectively. Consider investing in a portfolio of the two treasure securities: The rate of return on the portfolio = 10.75%. When the interest rate increases by 0.1%, the change of the liability value = -4.32, and the value of the 30-year bond and 6-month bill will change by -4.2 and -0.12 respectively, and the total of both changes accounts for -4.32. Continued……
Similar presentations
