ࡱ> y_ ָbjbj jA\jA\6Y f.zDmmmy-{-{-{-{-{-{-$02V-mK"mmm- .!!!m.y-!my-!!r*@,ЄH!,e-6.0f./,V3n3,3,mm!mmmmm--!mmmf.mmmm3mmmmmmmmm > :  CHAPTER 7 Swaps Practice Questions Problem 7.8. A bank enters into an interest rate swap with a nonfinancial counterparty using bilaterally clearing where it is paying a fixed rate of 3% and receiving LIBOR. No collateral is posted and no other transactions are outstanding between the bank and the counterparty. What credit risk is the bank subject to? Discuss whether the credit risk is greater when the yield curve is upward sloping or when it is downward sloping. At the start of the swap, the contract has a value of approximately zero. As time passes, it is likely that the swap value will change. If at the time of a counterparty default the swap has a positive value to the bank and a negative value to the counterparty, the bank is likely to lose money. If the yield curve is upward sloping, the early exchanges are expected to be negative to the bank and the later exchanges are expected to be positive to the bank. This means that the swap is expected to have a positive value as time passes and, as a result, the banks credit exposure is relatively high. When the yield curve is downward sloping the early exchanges are expected to be positive to the bank and the later exchanges are expected to be negative to the bank. This means that the swap is expected to have a negative value as time passes and, as a result, the banks credit exposure is relatively low. Problem 7.9. Companies X and Y have been offered the following rates per annum on a $5 million 10-year investment: Fixed RateFloating RateCompany X8.0%LIBORCompany Y8.8%LIBOR Company X requires a fixed-rate investment; company Y requires a floating-rate investment. Design a swap that will net a bank, acting as intermediary, 0.2% per annum and will appear equally attractive to X and Y. The spread between the interest rates offered to X and Y is 0.8% per annum on fixed rate investments and 0.0% per annum on floating rate investments. This means that the total apparent benefit to all parties from the swap is 0.8% per annum. Of this 0.2% per annum will go to the bank. This leaves 0.3% per annum for each of X and Y. In other words, company X should be able to get a fixed-rate return of 8.3% per annum while company Y should be able to get a floating-rate return LIBOR + 0.3% per annum. The required swap is shown in Figure S7.1. The bank earns 0.2%, company X earns 8.3%, and company Y earns LIBOR + 0.3%.  Figure S7.1 Swap for Problem 7.9 Problem 7.10. A financial institution has entered into an interest rate swap with company X. Under the terms of the swap, it receives 4% per annum and pays six-month LIBOR on a principal of $10 million for five years. Payments are made every six months. Suppose that company X defaults on the sixth payment date (end of year 3) when the six-month forward LIBOR rates for all maturities are 2% per annum. What is the loss to the financial institution? Assume that six-month LIBOR was 3% per annum halfway through year 3 and that at the time of default all OIS rates are 1.8% per annum. OIS rates are expressed with continuous compounding; other rates are expressed with semiannual compounding. At the end of year 3 the financial institution was due to receive $200,000 (=0.54% of $10 million) and pay $150,000 (=0.53% of $10 million). The immediate loss is therefore $50,000. To value the remaining swap we assume that LIBOR forward rates are realized. All forward rates are 2% per annum. The remaining cash flows are therefore valued on the assumption that the floating payment is 0.50.0210,000,000 = $100,000. The fixed payment is $200,000 and the net payment that would be received is 200,000"100,000=$100,000. The total cost of default is therefore the cost of foregoing the following cash flows: 3 year: $50,000 3.5 year: $100,000 4 year: $100,000 4.5 year: $100,000 5 year: $100,000 Discounting these cash flows to year 3 at 1.8% per annum, we obtain the cost of the default as $441,120. Problem 7.11. A financial institution has entered into a 10-year currency swap with company Y. Under the terms of the swap, the financial institution receives interest at 3% per annum in Swiss francs and pays interest at 8% per annum in U.S. dollars. Interest payments are exchanged once a year. The principal amounts are 7 million dollars and 10 million francs. Suppose that company Y declares bankruptcy at the end of year 6, when the exchange rate is $0.80 per franc. What is the cost to the financial institution? Assume that, at the end of year 6, the risk-free interest rate is 3% per annum in Swiss francs and 8% per annum in U.S. dollars for all maturities. All interest rates are quoted with annual compounding. When interest rates are compounded annually  EMBED Equation.DSMT4  where  EMBED Equation.DSMT4  is the T-year forward rate,  EMBED Equation.DSMT4  is the spot rate,  EMBED Equation.DSMT4  is the domestic risk-free rate, and  EMBED Equation.DSMT4  is the foreign risk-free rate. As  EMBED Equation.DSMT4  and  EMBED Equation.DSMT4 , the spot and forward exchange rates at the end of year 6 are Spot: 0.8000 1 year forward: 0.8388 2 year forward: 0.8796 3 year forward: 0.9223 4 year forward: 0.9670 The value of the swap at the time of the default can be calculated on the assumption that forward rates are realized. The cash flows lost as a result of the default are therefore as follows: YearDollar PaidCHF ReceivedForward RateDollar Equiv of CHF ReceivedCash Flow Lost6560,000300,0000.8000240,000-320,0007560,000300,0000.8388251,600-308,4008560,000300,0000.8796263,900-296,1009560,000300,0000.9223276,700-283,300107,560,00010,300,0000.96709,960,1002,400,100 Discounting the numbers in the final column to the end of year 6 at 8% per annum, the cost of the default is $679,800. Note that, if this were the only contract entered into by company Y, it would make no sense for the company to default just before the exchange of payments at the end of year 6 as the exchange has a positive value to company Y. In practice, company Y may be defaulting and declaring bankruptcy for reasons unrelated to this particular transaction. Problem 7.12. Companies A and B face the following interest rates (adjusted for the differential impact of taxes): ABUS Dollars (floating rate)LIBOR+0.5%LIBOR+1.0%Canadian dollars (fixed rate)5.0%6.5% Assume that A wants to borrow U.S. dollars at a floating rate of interest and B wants to borrow Canadian dollars at a fixed rate of interest. A financial institution is planning to arrange a swap and requires a 50-basis-point spread. If the swap is equally attractive to A and B, what rates of interest will A and B end up paying? Company A has a comparative advantage in the Canadian dollar fixed-rate market. Company B has a comparative advantage in the U.S. dollar floating-rate market. (This may be because of their tax positions.) However, company A wants to borrow in the U.S. dollar floating-rate market and company B wants to borrow in the Canadian dollar fixed-rate market. This gives rise to the swap opportunity. The differential between the U.S. dollar floating rates is 0.5% per annum, and the differential between the Canadian dollar fixed rates is 1.5% per annum. The difference between the differentials is 1% per annum. The total potential gain to all parties from the swap is therefore 1% per annum, or 100 basis points. If the financial intermediary requires 50 basis points, each of A and B can be made 25 basis points better off. Thus a swap can be designed so that it provides A with U.S. dollars at LIBOR  EMBED Equation.DSMT4  0.25% per annum, and B with Canadian dollars at 6.25% per annum. The swap is shown in Figure S7.2.  Figure S7.2 Swap for Problem 7.12 Principal payments flow in the opposite direction to the arrows at the start of the life of the swap and in the same direction as the arrows at the end of the life of the swap. The financial institution would be exposed to some foreign exchange risk which could be hedged using forward contracts. Problem 7.13. After it hedges its foreign exchange risk using forward contracts, is the financial institutions average spread in Figure 7.11 likely to be greater than or less than 20 basis points? Explain your answer. The financial institution will have to buy 1.1% of the AUD principal in the forward market for each year of the life of the swap. Since AUD interest rates are higher than dollar interest rates, AUD is at a discount in forward markets. This means that the AUD purchased for year 2 is less expensive than that purchased for year 1; the AUD purchased for year 3 is less expensive than that purchased for year 2; and so on. This works in favor of the financial institution and means that its spread increases with time. The spread is always above 20 basis points. Problem 7.14. Nonfinancial companies with high credit risks are the ones that cannot access fixed-rate markets directly. They are the companies that are most likely to be paying fixed and receiving floating in an interest rate swap. Assume that this statement is true. Do you think it increases or decreases the risk of a financial institutions swap portfolio? Assume that companies are most likely to default when interest rates are high. Consider a plain-vanilla interest rate swap involving two companies X and Y. We suppose that X is paying fixed and receiving floating while Y is paying floating and receiving fixed. The quote suggests that company X will usually be less creditworthy than company Y. (Company X might be a BBB-rated company that has difficulty in accessing fixed-rate markets directly; company Y might be a AAA-rated company that has no difficulty accessing fixed or floating rate markets.) Presumably company X wants fixed-rate funds and company Y wants floating-rate funds. The financial institution will realize a loss if company Y defaults when rates are high or if company X defaults when rates are low. These events are relatively unlikely since (a) Y is unlikely to default in any circumstances and (b) defaults are less likely to happen when rates are low. For the purposes of illustration, suppose that the probabilities of various events are as follows: Default by Y: 0.001 Default by X: 0.010 Rates high when default occurs: 0.7 Rates low when default occurs: 0.3 The probability of a loss is  EMBED Equation.DSMT4  If the roles of X and Y in the swap had been reversed the probability of a loss would be  EMBED Equation.DSMT4  Assuming companies are more likely to default when interest rates are high, the above argument shows that the observation in quotes has the effect of decreasing the risk of a financial institutions swap portfolio. It is worth noting that the assumption that defaults are more likely when interest rates are high is open to question. The assumption is motivated by the thought that high interest rates often lead to financial difficulties for corporations. However, there is often a time lag between interest rates being high and the resultant default. When the default actually happens interest rates may be relatively low. Problem 7.15. Why is the expected loss to a bank from a default on a swap less than the expected loss from the default on a loan to the counterparty with the same principal? Assume no other transactions between the bank and the counterparty, that the swap is cleared bilaterally, and that no collateral is provided by the counterparty in the case of either the swap or the loan.. In an interest-rate swap a financial institutions exposure depends on the difference between a fixed-rate of interest and a floating-rate of interest. It has no exposure to the notional principal. In a loan the whole principal can be lost. Problem 7.16. A bank finds that its assets are not matched with its liabilities. It is taking floating-rate deposits and making fixed-rate loans. How can swaps be used to offset the risk? The bank is paying a floating-rate on the deposits and receiving a fixed-rate on the loans. It can offset its risk by entering into interest rate swaps (with other financial institutions or corporations) in which it contracts to pay fixed and receive floating. Problem 7.17. Explain how you would value a swap that is the exchange of a floating rate in one currency for a fixed rate in another currency. Suppose that floating payments are made in currency A and fixed payments are made in currency B. The floating payments can be valued in currency A by (i) assuming that the forward rates are realized, and (ii) discounting the resulting cash flows at appropriate currency A discount rates. Suppose that the value is  EMBED Equation.DSMT4 . The fixed payments can be valued in currency B by discounting them at the appropriate currency B discount rates. Suppose that the value is  EMBED Equation.DSMT4 . If  EMBED Equation.DSMT4 is the current exchange rate (number of units of currency A per unit of currency B), the value of the swap in currency A is  EMBED Equation.DSMT4 . Alternatively, it is  EMBED Equation.DSMT4  in currency B. Problem 7.18 OIS rates have been estimated as 3.4% for all maturities. The three-month LIBOR rate is 3.5%. For a six-month swap where payments are exchanged every three months the swap rate is 3.6%. All rates are expressed with quarterly compounding. What is the LIBOR forward rate for the three-month to six-month period? Suppose that the LIBOR forward rate is F. Assume a principal of $1000. A swap where 3.6% ($9 per quarter) is received and LIBOR is paid is worth zero. The exchange at the three-month point to the party receiving fixed is worth  EMBED Equation.3  The exchange at the six-month point to the party receiving fixed is worth  EMBED Equation.3  Hence  EMBED Equation.3 +0.2479 = 0 so that F = 3.701%. Problem 7.19 Six-month LIBOR is 5%. LIBOR forward rates for the 6- to 12-month period and for the 12- to 18-month period are both 5.5%. Swap rates for 2- and 3-year semiannual pay swaps are 5.4% and 5.6%, respectively. Estimate the LIBOR forward rates for maturities of 18-month to 2 years, 2 to 2.5 years, and 2.5 to 3 years. Assume that the 2.5-year swap rate is the average of the 2- and 3-year swap rates and that OIS zero rates for all maturities are 4.5%. OIS rates are expressed with continuous compounding; all other rates are expressed with semiannual compounding. Suppose the 18 month to 2 year forward rate is F. The two-year swap rate is 5.4%. Setting the value of the two-year swap equal to zero: (0.05"0.054)e"0.0450.5 + (0.055"0.054) e"0.0451.0 + (0.055"0.054) e" 0.0451.5 +(F"0.054)e"0.0452 = 0 which gives F = 0.0562. The 18 month to two year forward LIBOR rate is therefore 5.62%. Suppose next that the 2 year to 2.5 year forward rate is F. The 2.5 year swap rate is 5.5%. Setting the value of the 2.5 year swap equal to zero: (0.05"0.055)e-0.0450.5 + (0.055"0.055) e-0.0451.0 + (0.055"0.055) e-0.0451.5 +(0.0562"0.055)e-0.0452 +(F"0.055) e-0.0452.5 = 0 which gives F = 0.0592. The 2 to 2.5 year forward LIBOR rate is therefore 5.92%. Suppose next that the 2.5 year to 3 year forward rate is F. The three-year swap rate is 5.6%. Setting the value of the 3-year swap equal to zero: (0.05"0.056)e"0.0450.5 + (0.055"0.056) e"0.0451.0 + (0.055"0.056) e"0.0451.5 +(0.0562"0.056)e"0.0452 +(0.0592"0.056) e"0.0452.5 + (F"0.056) e"0.0453 = 0 which gives F = 0.0614. The 2 to 2.5 year forward LIBOR rate is therefore 6.14%. Further Questions Problem 7.20 (a) Company A has been offered the rates shown in Table 7.3. It can borrow for three years at 3.45%. What floating rate can it swap this fixed rate into? (b) Company B has been offered the rates shown in Table 7.3. It can borrow for 5 years at LIBOR plus 75 basis points. What fixed rate can it swap this floating rate into? Explain the rollover risks that Company B is taking (a) Company A can pay LIBOR and receive 2.97% for three years. It can therefore exchange a loan at 3.45% into a loan at LIBOR plus 0.48% or LIBOR plus 48 basis points (b) Company B can receive LIBOR and pay 3.30% for five years. It can therefore exchange a loan at LIBOR plus 0.75% for a loan at 4.05%. But there is a danger that the spread is pays over LIBOR on the loan increases during the five years. Problem 7.21 (a) Company X has been offered the rates shown in Table 7.3. It can invest for four years at 2.8%. What floating rate can it swap this fixed rate into? (b) Company Y has been offered the rates shown in Table 7.3. It is confident that it will be able to invest at LIBOR minus 50 basis points for the next ten years. What fixed rate can it swap this floating rate into? (a) Company X can pay 3.19% for four years and receive LIBOR. It can therefore exchange the investment at 2.8% for an investment at LIBOR minus 0.39% or LIBOR minus 39 basis points. (b) Company Y can receive 3.48% and pay LIBOR for 10 years. It can therefore exchange an investment at LIBOR minus 0.5% for an investment at 2.98%. Problem 7.22. The one-year LIBOR rate is 3% and the forward rate for the one- to two-year period is 3.2%. The three-year swap rate for a swap with annual payments is 3.2%. What is the LIBOR forward rate for the 2 to 3 year period if OIS zero rates for one, two, and three year maturities are 2.5%, 2.7%, and 2.9%, respectively. What is the value of a three-year swap where 4% is received and LIBOR is paid on a principal of $100 million. All rates are annually compounded. The swap with a fixed rate of 3.2% is worth zero. The value of the first exchange to the party receiving fixed per dollar of principal is  EMBED Equation.3  The value of the second exchange is  EMBED Equation.3  The value of the third exchange is  EMBED Equation.3  Hence  EMBED Equation.3  so that R = 0.034126 or 3.4126%. A swap where 4% is received on a principal of $100 million provides 0.8% of $100 million or $800,000 per year more than a swap worth zero. Its value is  EMBED Equation.3  or about $2.27 million. Problem 7.23. In an interest rate swap, a financial institution has agreed to pay 3.6% per annum and to receive three-month LIBOR in return on a notional principal of $100 million with payments being exchanged every three months. The swap has a remaining life of 14 months. Three-month forward LIBOR for all maturities is currently 4% per annum. The three-month LIBOR rate one month ago was 3.2% per annum. OIS rates for all maturities are currently 3.8% with continuous compounding. All other rates are compounded quarterly. What is the value of the swap? We can value the swap as a series of forward rate agreements. The value in $ millions is (0.8 0.9)e-0.0382/12 + (1.0 0.9)e-0.0385/12 + (1.0 0.9)e-0.0388/12 + (1.0 0.9)e-0.03811/12 + (1.0 0.9)e-0.03814/12 = 0.289 Problem 7.24. Company A, a British manufacturer, wishes to borrow U.S. dollars at a fixed rate of interest. Company B, a U.S. multinational, wishes to borrow sterling at a fixed rate of interest. They have been quoted the following rates per annum (adjusted for differential tax effects): SterlingUS DollarsCompany A11.0%7.0%Company B10.6%6.2% Design a swap that will net a bank, acting as intermediary, 10 basis points per annum and that will produce a gain of 15 basis points per annum for each of the two companies. The spread between the interest rates offered to A and B is 0.4% (or 40 basis points) on sterling loans and 0.8% (or 80 basis points) on U.S. dollar loans. The total benefit to all parties from the swap is therefore  EMBED Equation.DSMT4  It is therefore possible to design a swap which will earn 10 basis points for the bank while making each of A and B 15 basis points better off than they would be by going directly to financial markets. One possible swap is shown in Figure S7.3. Company A borrows at an effective rate of 6.85% per annum in U.S. dollars. Company B borrows at an effective rate of 10.45% per annum in sterling. The bank earns a 10-basis-point spread. The way in which currency swaps such as this operate is as follows. Principal amounts in dollars and sterling that are roughly equivalent are chosen. These principal amounts flow in the opposite direction to the arrows at the time the swap is initiated. Interest payments then flow in the same direction as the arrows during the life of the swap and the principal amounts flow in the same direction as the arrows at the end of the life of the swap. Note that the bank is exposed to some exchange rate risk in the swap. It earns 65 basis points in U.S. dollars and pays 55 basis points in sterling. This exchange rate risk could be hedged using forward contracts.  SHAPE \* MERGEFORMAT  Figure S7.3 One Possible Swap for Problem 7.24 Problem 7.25. Suppose that the term structure of risk-free interest rates is flat in the United States and Australia. The USD interest rate is 7% per annum and the AUD rate is 9% per annum. The current value of the AUD is 0.62 USD. Under the terms of a swap agreement, a financial institution pays 8% per annum in AUD and receives 4% per annum in USD. The principals in the two currencies are $12 million USD and 20 million AUD. Payments are exchanged every year, with one exchange having just taken place. The swap will last two more years. What is the value of the swap to the financial institution? Assume all interest rates are continuously compounded. The financial institution is long a dollar bond and short a USD bond. The value of the dollar bond (in millions of dollars) is  EMBED Equation.DSMT4   $%&3e  3 R W  5 b d q ʾyunjnjnjnjfjfjn\nXh-h%Ah-6]hQh< h%Ah-h8-h<h8-6h<h<6mH nH sH tH h8-h8-6mH nH sH tH hth-5hrh\5CJaJhthrh\5CJaJhtht5CJaJhthrh\CJ aJ hthtCJ aJ htht5CJ \aJ hthrh\5CJ \aJ hrh\ &3< c d q $$Ifa$gd-gd<1$gd<1$gd8-gd-$a$gd%A$a$$a$   !"lmoz#UuxEF /acpX$QRyֽڶڶگڶڶڶڶhE/h|h-6 h-6] h=6]hth-5 jhTh-UmHnHuh-h%Ah-6] h%Ah- h%h-h%h-6CJ]aJ@  qeee $$Ifa$gd-kd$$IflF b t06    44 layt-   qeee $$Ifa$gd-kd$$IflF b t06    44 layt- !"noqlllllllllllgd-kd"$$IflF b t06    44 layt- +BYr238DQ^{ $$Ifa$gd-  H$1$H$gd-gd-T    !ƹ袕草{neh%Ah-EHjNh%Ah-EHUjST h%Ah-UVh-hh-6jKh%Ah-EHUjRT h%Ah-UVh%Ah-EHjGh%Ah-EHUjQT h%Ah-UVh%Ah-EHjh%Ah-U h%Ah- hI6]h%Ah-6]#!"#$IJK_`abc*+p023һҥҗ|okkkk_hth-6CJaJh-jYh%Ah-EHUjWT h%Ah-UVjVh%Ah-EHUjVT h%Ah-UVh%Ah-EHj Th%Ah-EHUjUT h%Ah-UVh%Ah-EH h%Ah-jh%Ah-UjiQh%Ah-EHUjTT h%Ah-UV%8,,, $$Ifa$gd-kd\$$Iflֈ # t0644 layt-  67jk[ f l !?!A!O!!!!!!!"""b#&&&&&&''F'e'g'h'k'v'Ƹ疉x jdhTh-UmHnHujbh%Ah-EHUjXT h%Ah-UVh%Ah-EHjh%Ah-Uh%h-6CJ]aJ h-6]h%Ah-6]hth-5hQh- h%Ah-h%h-CJaJ h%h-/,kd]$$Iflֈ # t0644 layt- $$Ifa$gd- $$Ifa$gd-8,,, $$Ifa$gd-kd^$$Iflֈ # t0644 layt-  ,kd^$$Iflֈ # t0644 layt- $$Ifa$gd- %-6 $$Ifa$gd-67:DO8,,, $$Ifa$gd-kd@_$$Iflֈ # t0644 layt-OV`jk,kd_$$Iflֈ # t0644 layt- $$Ifa$gd-klA!O!!!!!!!Xkdb`$$IflF " 2j t06    44 layt- $$Ifa$gd-gd-$a$gd- !!!!! 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As an alternative we can value the swap as a series of forward foreign exchange contracts. The one-year forward exchange rate is  EMBED Equation.DSMT4 . The two-year forward exchange rate is  EMBED Equation.DSMT4 . The value of the swap in millions of dollars is therefore  EMBED Equation.DSMT4  which is in agreement with the first calculation. Problem 7.26. The five-year swap rate when cash flows are exchanged semiannually is 4%. A company wants a swap where it receives payments at 4.2% per annum. The OIS zero curve is flat at 3.6%. How much should a derivatives dealer charge the company. All rates are expressed with semiannual compounding. (Ignore bidoffer spreads.) We know that exchanging 4% for LIBOR is worth zero. Receiving 4.2% in exchange for LIBOR is therefore worth the present value of 0.5(0.042"0.04)$10,000,000 =$10,000 received every six months for five years. 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