Math 418B Worksheet 3 Callable Bonds ame: Show critical work and then circle the answer you get. In everyday business and financial usage there are three different yield associated with a bond: 1. ominal yield is simply the annualized coupon rate on the bond. If a $100 par value bond has coupons totaling $9 per year, then the nominal yield on the bond is 9% per annum. 2. Current yield is the ratio of the annualized coupon to the original price of the bond. 3. Yield to maturity is the actual annualized yield rate, or internal rate of return defined as The yield rate is that rate of interest at which the present value of returns from the investment is equal to the present value of contributions into the investment. The most problems in Math 418 and FM exam have the yield rates as defined in 3. Yield to maturity. Callable Bond A callable bond is one for which there is a range of possible redemption dates. The redemption is chosen by the bond issuer. For a specific yield rate, the price of bond will depend on the time until maturity. For a specific bond price, the yield rate on the bond will depend on the time until maturity. Example A: Pricing callable bonds (yield rate lower than coupon rate) 1. A 10% bond with semi-annual coupons and with face amount 1,000,000 is issued with the condition that redemption can take place on any coupon date between 12 and 15 years from the issue date. Find the price paid by in investor wishing a minimum yield of i (2) =0.08. Solution: Using BAII Plus calculator to fill out the following table 24 0.04 1152469.63 50,000 1,000,000 25 0.04 1156220.80 50,000 1,000,000 26 0.04 1159827.69 50,000 1,000,000 27 0.04 1163295.86 50,000 1,000,000 28 0.04 1166630.63 50,000 1,000,000 29 0.04 1169837.15 50,000 1,000,000 30 0.04 1172920.33 50,000 1,000,000 Ans. This callable bond has price ranging from 1,152,470 to 1,172,920 depending on the time until it s called for redemption. It is, thus, most prudent for the investor to offer a price of no more than 1,152,470 to guarantee a minimum yield of i (2) =0.08. 2. For the same callable bond above, suppose the investor pays the minimum of all prices for the range of redemption dates. Find the yield rate if the issuer chooses a redemption date corresponding to the maximum price. Answer 8.214%
3. Suppose the investor pays 1,150,000 for this callable bond and holds the bond until it s called (12-15 years from issue). Find the minimum yield that the investor will obtain. Answer 8.03% Example B: Pricing callable bonds (yield rate higher than coupon rate) 1. A 10% bond with semi-annual coupons and with face amount 1,000,000 is issued with the condition that redemption can take place on any coupon date between 12 and 15 years from the issue date. Find the price paid by in investor wishing a minimum yield of i (2) =0.12. Solution: Using BAII Plus calculator to fill out the following table 24 0.06 874.496.42 50,000 1,000,000 25 0.06 872166.44 50,000 1,000,000 26 0.06 869968.34 50,000 1,000,000 27 0.06 867894.66 50,000 1,000,000 28 0.06 865938.36 50,000 1,000,000 29 0.06 864092.79 50,000 1,000,000 30 0.06 862351.69 50,000 1,000,000 Ans. This callable bond has price ranging from 862,352 to 874,496 depending on the time until it s called for redemption. It is, thus, most prudent for the investor to offer a price of no more than 862,352 to guarantee a minimum yield of i (2) =0.12. 2. For the same callable bond above, suppose the investor pays the minimum of all prices for the range of redemption dates. Find the yield rate if the issuer chooses a redemption date corresponding to the maximum price. Answer 12.215% 3. Suppose the investor pays 850,000 for this callable bond and holds the bond until it s called (12-15 years from issue). Find the minimum yield that the investor will obtain. Answer 12.203%
Example C: Pricing callable bonds (variable redemption amounts) A 15-year 8% bond with face amount 100 is callable on a coupon date in the 10 th to 15 th years. In the 10 th year the bond is callable at par, in the 11 th or 12 th years at redemption amount 115, or in the 13 th, 14 th or 15 th years at redemption amount 135. 1. What price should an investor pay in order to ensure a minimum nominal annual yield to maturity of 12%? (ote: 6-month yield rate is higher than the modified coupon rate for any redemption amount, that is, bought at a discount) Solution: Time 9.5 19 6(%) 77.68 4 100 10 20 6(%) 77.06 4 100 10.5 21 6(%) 80.88 4 115 11 22 6(%) 80.08 4 115 11.5 23 6(%) 79.32 4 115 12 24 6(%) 78.60 4 115 12.5 25 6(%) 82.59 4 135 13 26 6(%) 81.69 4 135 13.5 27 6(%) 80.84 4 135 14 28 6(%) 80.03 4 135 14.5 29 6(%) 79.28 4 135 15 30 6(%) 78.56 4 135 Remark: The principal of pricing a callable bond bought at a discount by using the latest redemption date may fail when the redemption amounts are not level. Explain. Because you would expect the smallest to be at latest date when bought at discount but since are increasing the smallest is at the latest time at smallest. Answer: 77.06 2. Find the investor s minimum yield if the purchase price is 80. Remark: If the bond is bought at a discount to the redemption value, it is to the investor s disadvantage to have the redemption at the latest date. Explain. When sold at discount there is a capital gain on purchase day. The sooner the bondholder receives the gain the greater the yield, so if redeemed on last date the yield is smaller. As a result, for a fixed yield, the bond value is smaller if redeemed later. Answer: 11.40%
Example D: Pricing callable bonds (variable redemption amounts) A 15-year 8% bond with face amount 100 is callable on a coupon date in the 10 th to 15 th years. In the 10 th year the bond is callable at par, in the 11 th or 12 th years at redemption amount 115, or in the 13 th, 14 th or 15 th years at redemption amount 135. 1. What price should an investor pay in order to ensure a minimum nominal annual yield to maturity of 6%? (ote: 6-month yield rate is lower than modified coupon rate in 10 th -12 th years at a premium; higher than modified coupon rate in 13 th -15 th years at a discount) Solution: Time 9.5 19 3(%) 114.32 4 100 10 20 3(%) 114.87 4 100 10.5 21 3(%) 123.48 4 115 11 22 3(%) 123.77 4 115 11.5 23 3(%) 124.04 4 115 12 24 3(%) 124.31 4 115 12.5 25 3(%) 134.13 4 135 13 26 3(%) 134.11 4 135 13.5 27 3(%) 134.08 4 135 14 28 3(%) 134.06 4 135 14.5 29 3(%) 134.04 4 135 15 30 3(%) 134.02 4 135 Remark: What s the principal of pricing a callable bond bought at a premium? Does the minimum price occur at the latest redemption date? Explain. It s the soonest because it s a premium bond so the coupon rate is greater than yield, so the or bond value increases because the expected more coupons are adding values to the bond. Answer: 114.32 2. Find the investor s minimum yield if the purchase price is 120. Remark: If the bond is bought at a premium to the redemption value, the minimum yield to maturity occurs at the earliest redemption date. Explain. There will be a capital loss when the bond is redeemed so the earliest the loss occurs, the lower the return received by the bondholder. Answer: 5.294%
Callable Bonds Price Formula: Part 1 F changes to C Price Formula: Part 2 F(r-j) changes to C(r-j) # of Coupons from issue to redemption: n Bond Price at issue Premium Discount Positive (since r>j) More positive More coupons Call later, more valuable egative (since r<j) More negative More coupons Call sooner, more valuable Hold to Maturity Price Formula: Part 1 F Price Formula: Part 2 F(r-j) # of Coupons until maturity, n-t Book Value/Outstanding Balance (at time t) Premium Positive (since r>j) Decreasing Discount egative (since r<j) Increasing