2. 3-1 Bond Valuation Application of present value techniques to bonds and stocks Application of present value techniques to bonds and stocks Pricing and Valuation are the core issues in finance Pricing and Valuation are the core issues in finance

3. 3-2 Some standard forms of Bonds C=coupon, F=face value, T=maturity date C=coupon, F=face value, T=maturity date Pure Discount or Zero-coupon bonds Pure Discount or Zero-coupon bonds PV=FV/(1+r) T PV=FV/(1+r) T Level-coupon bonds Level-coupon bonds PV=C/1+r + C/(1+r) 2 + + C/(1+r) T + F/(1+r) T PV=C/1+r + C/(1+r) 2 + + C/(1+r) T + F/(1+r) T Consols Consols PV=C/r PV=C/r Floaters Floaters Convertibles Convertibles

4. 3-3 Bond Features Coupon Payments: Regular interest payments Coupon Payments: Regular interest payments Semi annual for most US corporate bonds Semi annual for most US corporate bonds Types of Coupon payments Types of Coupon payments Fixed Rate: 8% per yearFixed Rate: 8% per year Floating Rate: 6-month Treasury bill rate + 100 basis points.Floating Rate: 6-month Treasury bill rate + 100 basis points.

5. 3-4 Bond Features Face or Par Value: amount of money to be repaid at end of loan Face or Par Value: amount of money to be repaid at end of loan $1,000/bond $1,000/bond Maturity: number of years from issue date until principal is paid Maturity: number of years from issue date until principal is paid Coupon Rate: annual coupon / face value Coupon Rate: annual coupon / face value

6. 3-5 Features of a May Department Stores Bond TermsExplanations Amount of issue$200 millionThe company will issue $200 million worth of bonds. Date of issue 8/4/94The bonds were sold on 8/4/94. Maturity 8/1/24The principal will be paid in 30 years. Face Value$1,000Denomination of the bond is in $1,000 Annual coupon 8.375Each bondholder will receive $83.75 per bond per year (8.375% of the face value). Offer price 100The offer price will be 100% of the $1,000 face value per bond. Coupon dates2/1, 8/1$41.875 will be paid on these dates SecurityNone Sinking FundAnnual from 8/1/05Annual payments to this fund starting from the indicated date Call Provisionnot callable before 8/1/04Deferred call feature Call Price104.188 initiallyBuy back price is $1041.88, declining declining to 100to $1,000 on 8/1/1 RatingMoody’s A2This is one of Moody’s higher ratings. The bonds have a low probability of default.

7. 3-6 Bond Valuation ( Assuming Level Coupon Payments ) Discounted Cash Flow Valuation Discounted Cash Flow Valuation Bond Value = PV (Promised Cash Flows) Bond Value = PV (Promised Cash Flows) Bond Value = PV (Coupon Payments) Bond Value = PV (Coupon Payments) + PV (Face Value) Bond Value = PV (Annuity) + PV (Lump sum) Bond Value = PV (Annuity) + PV (Lump sum)

8. 3-7 Yield-to-Maturity (YTM) Required market interest rate that makes the discounted cash flows of the bond equal to its price Required market interest rate that makes the discounted cash flows of the bond equal to its price Interest rate that we will use in the bond valuation equation Interest rate that we will use in the bond valuation equation Does not always equal the bond’s coupon rate Does not always equal the bond’s coupon rate

9. 3-8 IPC issues 5-year $1,000 face value bonds with an annual coupon of 100. What is the coupon rate and what is the price of the bonds if the YTM on similar bonds is 10%?

10. 3-9 General Expression for the Value of a Bond Annuity Formula

11. 3-10 Example 2: Pricing of a regular bond IPS issues a 10-year bond IPS issues a 10-year bond YTM = 24% YTM = 24% Coupon Rate = 8% Coupon Rate = 8% Face value = $1,000 Face value = $1,000 What is the price of the bond at the issue date? What is the price of the bond at the issue date? What is your minimum selling price if you sell this bond one year before its maturity? What is your minimum selling price if you sell this bond one year before its maturity?

12. 3-11 Notes on the Bond Pricing Formula Semi annual coupons: 10-year bond with 12% coupon rate paid semi annually Semi annual coupons: 10-year bond with 12% coupon rate paid semi annually Halve the coupon rate and quoted YTM Halve the coupon rate and quoted YTM Double the number of periods Double the number of periods YTM=APR! YTM=APR! Risk-free market interest rate versus YTM Risk-free market interest rate versus YTM YTM takes into consideration the risk of the cash flows YTM takes into consideration the risk of the cash flows Finding YTM: trial and error, EXCEL, financial calculator. Finding YTM: trial and error, EXCEL, financial calculator.

13. 3-12 Semi-annual coupons: Semi-annual coupons: What is the price of a $1000 bond maturing in ten years with a 12% coupon that is paid semiannually if the YTM is 10%

14. 3-13 Discount bond example: Discount bond example: Suppose a year has gone by and the IPC 10% annual coupon bond has 4 years to maturity. What is the price (present value) of the bonds if the YTM on similar bonds is 11%?

15. 3-14 Premium Bond Example: Premium Bond Example: Suppose in the second year the yield-to-maturity for similar bonds decreases to 9% instead of increasing to 11%. What is the price of the 4-year IPC $1000 par value 10% annual coupon bond?

16. 3-15 Par, Discount and Premium Bonds Par, Discount and Premium Bonds The relation of YTM and the coupon rate Par Bonds: Par Bonds: Price = Face Value Price = Face Value YTM = Coupon Rate YTM = Coupon Rate Discount Bonds: Discount Bonds: Price < Face Value Price < Face Value YTM > Coupon Rate YTM > Coupon Rate Premium Bonds: Premium Bonds: Price > Face Value Price > Face Value YTM < Coupon Rate YTM < Coupon Rate

17. 3-16 Interest Rate Risk of Bonds Risk that the bond you own will change in value because interest rates (e.g. YTM) have changed Risk that the bond you own will change in value because interest rates (e.g. YTM) have changed Review: Review: As interest rates rise, PV decreases all else equal As interest rates rise, PV decreases all else equal As interest rates fall, PV increases all else equal As interest rates fall, PV increases all else equal Interest rate sensitivity depends on time to maturity and coupon rate Interest rate sensitivity depends on time to maturity and coupon rate

18. 3-17 Determinants of the Interest Rate Risk of Bonds: Part I Time to Maturity: Time to Maturity: The longer the time to maturity, the greater the interest rate risk, all else equal The longer the time to maturity, the greater the interest rate risk, all else equal Higher t in formula => greater compounding effect => small changes in r, big changes in priceHigher t in formula => greater compounding effect => small changes in r, big changes in price 10% 2-year and 15-year bonds 10% 2-year and 15-year bonds 15 year bond’s price will change more with a change in the YTM.15 year bond’s price will change more with a change in the YTM.

19. 3-18 Interest Rate Changes and Bond Values: Both bonds are par bonds originally Suppose YTM decreases to 8%: Suppose YTM increases to 12%:

20. 3-19 Time to maturity Interest rate 1 year 30 years 5%$1,047.62$1,768.62 10 1,000.00 1,000.00 15 956.52 671.70 20 916.67 502.11 Interest Rate Risk and Time to Maturity (Figure 7.2) Value of a Bond with a 10% Coupon Rate for Different Interest Rates and Maturities Bond values ($) Interest rates (%) $1,768.62 $1,047.62 $916.67 $502.11 30-year bond 1-year bond 2000 1500 1000 500 5 10 15 20

21. 3-20 Determinants of the Interest Rate Risk of Bonds: Part II Coupon Rate: Coupon Rate: The lower the coupon rate, the greater the interest rate risk, all else equal The lower the coupon rate, the greater the interest rate risk, all else equal Low coupon => more of the bond’s value comes from the face amountLow coupon => more of the bond’s value comes from the face amount 0% (pure discount) and 10% 8-year bonds 0% (pure discount) and 10% 8-year bonds 100% of the 0% coupon bond’s price comes from face amount100% of the 0% coupon bond’s price comes from face amount 10% bond’s price depends on eight $100 annual coupons plus face value10% bond’s price depends on eight $100 annual coupons plus face value

22. 3-21 Which Bond has a higher interest rate risk? A: 30-year, 10% coupon or B: 15-year, 10% coupon? A: 30-year, 10% coupon or B: 15-year, 10% coupon? A: 30-year, 10% coupon with face value of $1,000 or B: 25- year, 10% coupon, with face value of $10,000? A: 30-year, 10% coupon with face value of $1,000 or B: 25- year, 10% coupon, with face value of $10,000? A: 30-year, 11% coupon or B: 30-year, 9% coupon? A: 30-year, 11% coupon or B: 30-year, 9% coupon? A: 30-year, zero-coupon with face value of $1,000 or B: 30- year, 10% coupon, with face value of $10,000? A: 30-year, zero-coupon with face value of $1,000 or B: 30- year, 10% coupon, with face value of $10,000? A: 30-year, 10% coupon or B: 25-year, 15% coupon? A: 30-year, 10% coupon or B: 25-year, 15% coupon? A: 30-year, 10% coupon or B: 20-year, 8% coupon? A: 30-year, 10% coupon or B: 20-year, 8% coupon?

23. 3-22 The Interest Rate Risk of Bonds Duration Duration A measure of the interest rate risk of a bond A measure of the interest rate risk of a bond average maturity of a bond’s cash flows average maturity of a bond’s cash flows The higher the duration measure, the greater the interest rate risk The higher the duration measure, the greater the interest rate risk

24. 3-23 Bond pricing Theorems The following statements about bond pricing are always true. The following statements about bond pricing are always true. Bond prices and market interest rates move in opposite directions. Bond prices and market interest rates move in opposite directions. When a bond’s coupon rate is (greater than / equal to / less than) the market’s required return (YTM), the bond’s market value will be (greater than / equal to / less than) its par value. When a bond’s coupon rate is (greater than / equal to / less than) the market’s required return (YTM), the bond’s market value will be (greater than / equal to / less than) its par value. Given two bonds identical except for maturity, the price of the longer-term bond will change more than that of the shorter-term bond, for a given change in market interest rates. Given two bonds identical except for maturity, the price of the longer-term bond will change more than that of the shorter-term bond, for a given change in market interest rates. Given two bonds identical but for coupon, the price of the lower-coupon bond will change more than that of the higher-coupon bond, for a given change in market interest rates. Given two bonds identical but for coupon, the price of the lower-coupon bond will change more than that of the higher-coupon bond, for a given change in market interest rates.

25. 3-24 Implicit Interest on a Zero-coupon Suppose EIN company issues a $1,000, 5-year zero-coupon bond. Suppose EIN company issues a $1,000, 5-year zero-coupon bond. Calculate the price if the YTM-15% Calculate the price if the YTM-15% What is the total amount of implicit interest on this bond? What is the total amount of implicit interest on this bond? What is the yearly implicit interest using amortization (required by law)? What is the yearly implicit interest using amortization (required by law)?

26. 3-25 Solution PV = 1,000 / 1.15 5 = $497 PV = 1,000 / 1.15 5 = $497 Total Implicit Interest = $1,000 - $497 = $502 Total Implicit Interest = $1,000 - $497 = $502 Using straight-line interest expense, we have $502/5 = $102.60 per year. Using straight-line interest expense, we have $502/5 = $102.60 per year. Using amortization, we have for the first year: Using amortization, we have for the first year: Beginning value = $497 Beginning value = $497 Ending value = $1,000 / 1.15 4 = $572 Ending value = $1,000 / 1.15 4 = $572 Implicit interest in year 1 = $572 - $497 = $75 Implicit interest in year 1 = $572 - $497 = $75 Implicit interest in year 2 = ($1,000 / 1.15 3 ) - $572 = $86 Implicit interest in year 2 = ($1,000 / 1.15 3 ) - $572 = $86 et cetera et cetera What would be preferred by the corporation? What would be preferred by the corporation?

27. 3-26 Inflation and Returns Key issues: Key issues: What is the difference between a real and a nominal return? What is the difference between a real and a nominal return? How can we convert from one to the other? How can we convert from one to the other? Example: Suppose we have $1,000, and Diet Coke costs $2.00 per six pack. We could buy 500 six packs. Now suppose the rate of inflation is 5%, so that the price rises to $2.10 in one year. When we invest the $1,000 it grows to $1,100 in one year. Example: Suppose we have $1,000, and Diet Coke costs $2.00 per six pack. We could buy 500 six packs. Now suppose the rate of inflation is 5%, so that the price rises to $2.10 in one year. When we invest the $1,000 it grows to $1,100 in one year. What’s the return in dollars? What’s the return in dollars? What’s the return in six packs? What’s the return in six packs?

28. 3-27 Reading the Wall Street Journal Majority of bonds is traded OTC Majority of bonds is traded OTC Bonds are quoted as a % of the face value Bonds are quoted as a % of the face value Bonds are quoted as ATT 7s05 Bonds are quoted as ATT 7s05 AT&T issue, maturing in 2005, 7% coupon AT&T issue, maturing in 2005, 7% coupon Close = last available price on close previous business day (% of F) Close = last available price on close previous business day (% of F) Net Change Net Change Current Yield = coupon / closing quote Current Yield = coupon / closing quote Volume Volume

29. 3-28 Treasury Bonds Always semi-annually Always semi-annually Quoted in 32nds (smallest ‘tick’ size) Quoted in 32nds (smallest ‘tick’ size) Bid price = 132:20 means 132 + 20/32 percent of the face value = $1,329.375 Bid price = 132:20 means 132 + 20/32 percent of the face value = $1,329.375 Change: -46 means the price (bid or ask) fell by 46/32%, or 1.4375%. Change: -46 means the price (bid or ask) fell by 46/32%, or 1.4375%. YTM is based on ask price YTM is based on ask price Bid-ask spread Bid-ask spread “n” indicates notes, rather than bonds “n” indicates notes, rather than bonds

30. 3-29 Inflation and Returns A.Dollars. Our return is A.Dollars. Our return is ($1100 - $1000)/$1000 = $100/$1000 = ________. ($1100 - $1000)/$1000 = $100/$1000 = ________. The percentage increase in the amount of green stuff is 10%; our dollar return is 10%. The percentage increase in the amount of green stuff is 10%; our dollar return is 10%. B.Six packs. We can buy $1100/$2.10 = ________ six packs, so our return is B.Six packs. We can buy $1100/$2.10 = ________ six packs, so our return is (523.81 - 500)/500 = 23.81/500 = 4.76% (523.81 - 500)/500 = 23.81/500 = 4.76% The percentage increase in the amount of brown stuff is 4.76%; our six-pack return is 4.76%. The percentage increase in the amount of brown stuff is 4.76%; our six-pack return is 4.76%.

31. 3-30 Inflation and Returns, concluded The relationship between real and nominal returns is described by the Fisher Effect. Let: The relationship between real and nominal returns is described by the Fisher Effect. Let: R=the nominal return R=the nominal return r=the real return r=the real return h=the inflation rate h=the inflation rate According to the Fisher Effect: According to the Fisher Effect: 1 + R = (1 + r) x (1 + h) From the example, the real return is 4.76%; the nominal return is 10%, and the inflation rate is 5%: From the example, the real return is 4.76%; the nominal return is 10%, and the inflation rate is 5%: (1 + R) = 1.10 (1 + r) x (1 + h) = 1.0476 x 1.05 = 1.10