Susan Baker is a new hire at Crinson Bank’s Chicago office. She has joined the risk arbitrage desk where she will be training to take advantage of price discrepancies in the U.S. T-note futures and spot markets.
Her managing director, Gerald Bigelow, has asked her to calculate parameters for potential arbitrage opportunities for the bank given current market conditions. At the time he asked the question, the cheapest-to-deliver T-notes were at par, with a coupon rate of 8.5 percent. When trading futures, the risk arbitrage desk borrows at 12 percent and lends at 4 percent.
Looking at the calendar, Baker calculates that there are 184 days to the first coupon payment and 181 days from the first coupon payment to the second. Any interest accrued will be paid when the T-note is delivered against the futures contract, but Bigelow asks Baker not to concern herself in the calculations with the impact of reinvesting the coupons or with transaction costs.
To get a feel for the market, Baker first prices a 6-month futures contract that has 184 days to expiration in a “simplified scenario.” She decides to use the same interest rate for borrowing and lending, taking the average of the bank’s borrowing and lending rates. Calculating the futures price under these simplified assumptions, Baker tells Bigelow that the futures contract should trade at 99.7059. Bigelow explains that the futures price is below par even though the spot price is at par because of the benefit to a short seller of receiving the T-note coupon payments.
Having calculated the futures price in the “simplified scenario,” Baker modifies it to reflect the bank’s current borrowing and lending rates, and calculates the corresponding no-arbitrage bands. She tells Bigelow that the lower band will be at 97.7468. Bigelow checks her calculations, confirming that the higher band will be at 101.6294.
Once they know the no-arbitrage bands for current market conditions, Baker and Bigelow check the screen. They see that the market price of the futures contract for which they’ve been calculating no-arbitrage bands is 103. Together, they execute Baker’s first arbitrage play.
Part 5)
How much does Baker expect to earn in profits on her first arbitrage play (in dollars per contract, ignoring transaction costs and any reinvestment of coupon payments)?
A)$523,000.
B)$1,371.
C)$40,003.
D)$370.
第1题
Susan Baker is a new hire at Crinson Bank’s Chicago office. She has joined the risk arbitrage desk where she will be training to take advantage of price discrepancies in the U.S. T-note futures and spot markets.
Her managing director, Gerald Bigelow, has asked her to calculate parameters for potential arbitrage opportunities for the bank given current market conditions. At the time he asked the question, the cheapest-to-deliver T-notes were at par, with a coupon rate of 8.5 percent. When trading futures, the risk arbitrage desk borrows at 12 percent and lends at 4 percent.
Looking at the calendar, Baker calculates that there are 184 days to the first coupon payment and 181 days from the first coupon payment to the second. Any interest accrued will be paid when the T-note is delivered against the futures contract, but Bigelow asks Baker not to concern herself in the calculations with the impact of reinvesting the coupons or with transaction costs.
To get a feel for the market, Baker first prices a 6-month futures contract that has 184 days to expiration in a “simplified scenario.” She decides to use the same interest rate for borrowing and lending, taking the average of the bank’s borrowing and lending rates. Calculating the futures price under these simplified assumptions, Baker tells Bigelow that the futures contract should trade at 99.7059. Bigelow explains that the futures price is below par even though the spot price is at par because of the benefit to a short seller of receiving the T-note coupon payments.
Having calculated the futures price in the “simplified scenario,” Baker modifies it to reflect the bank’s current borrowing and lending rates, and calculates the corresponding no-arbitrage bands. She tells Bigelow that the lower band will be at 97.7468. Bigelow checks her calculations, confirming that the higher band will be at 101.6294.
Once they know the no-arbitrage bands for current market conditions, Baker and Bigelow check the screen. They see that the market price of the futures contract for which they’ve been calculating no-arbitrage bands is 103. Together, they execute Baker’s first arbitrage play.
Part 5)
How much does Baker expect to earn in profits on her first arbitrage play (in dollars per contract, ignoring transaction costs and any reinvestment of coupon payments)?
A)$523,000.
B)$1,371.
C)$40,003.
D)$370.
第2题
Susan Baker is a new hire at Crinson Bank’s Chicago office. She has joined the risk arbitrage desk where she will be training to take advantage of price discrepancies in the U.S. T-note futures and spot markets.
Her managing director, Gerald Bigelow, has asked her to calculate parameters for potential arbitrage opportunities for the bank given current market conditions. At the time he asked the question, the cheapest-to-deliver T-notes were at par, with a coupon rate of 8.5 percent. When trading futures, the risk arbitrage desk borrows at 12 percent and lends at 4 percent.
Looking at the calendar, Baker calculates that there are 184 days to the first coupon payment and 181 days from the first coupon payment to the second. Any interest accrued will be paid when the T-note is delivered against the futures contract, but Bigelow asks Baker not to concern herself in the calculations with the impact of reinvesting the coupons or with transaction costs.
To get a feel for the market, Baker first prices a 6-month futures contract that has 184 days to expiration in a “simplified scenario.” She decides to use the same interest rate for borrowing and lending, taking the average of the bank’s borrowing and lending rates. Calculating the futures price under these simplified assumptions, Baker tells Bigelow that the futures contract should trade at 99.7059. Bigelow explains that the futures price is below par even though the spot price is at par because of the benefit to a short seller of receiving the T-note coupon payments.
Having calculated the futures price in the “simplified scenario,” Baker modifies it to reflect the bank’s current borrowing and lending rates, and calculates the corresponding no-arbitrage bands. She tells Bigelow that the lower band will be at 97.7468. Bigelow checks her calculations, confirming that the higher band will be at 101.6294.
Once they know the no-arbitrage bands for current market conditions, Baker and Bigelow check the screen. They see that the market price of the futures contract for which they’ve been calculating no-arbitrage bands is 103. Together, they execute Baker’s first arbitrage play.
Part 1)
Regarding Baker’s and Bigelow’s statements about the futures price in the simplified scenario:
A)Baker’s statement is correct and Bigelow’s statement is correct.
B)Baker’s statement is incorrect and Bigelow’s statement is correct.
C)Baker’s statement is incorrect and Bigelow’s statement is incorrect.
D)Baker’s statement is correct and Bigelow’s statement is incorrect.
第3题
Susan Baker is a new hire at Crinson Bank’s Chicago office. She has joined the risk arbitrage desk where she will be training to take advantage of price discrepancies in the U.S. T-note futures and spot markets.
Her managing director, Gerald Bigelow, has asked her to calculate parameters for potential arbitrage opportunities for the bank given current market conditions. At the time he asked the question, the cheapest-to-deliver T-notes were at par, with a coupon rate of 8.5 percent. When trading futures, the risk arbitrage desk borrows at 12 percent and lends at 4 percent.
Looking at the calendar, Baker calculates that there are 184 days to the first coupon payment and 181 days from the first coupon payment to the second. Any interest accrued will be paid when the T-note is delivered against the futures contract, but Bigelow asks Baker not to concern herself in the calculations with the impact of reinvesting the coupons or with transaction costs.
To get a feel for the market, Baker first prices a 6-month futures contract that has 184 days to expiration in a “simplified scenario.” She decides to use the same interest rate for borrowing and lending, taking the average of the bank’s borrowing and lending rates. Calculating the futures price under these simplified assumptions, Baker tells Bigelow that the futures contract should trade at 99.7059. Bigelow explains that the futures price is below par even though the spot price is at par because of the benefit to a short seller of receiving the T-note coupon payments.
Having calculated the futures price in the “simplified scenario,” Baker modifies it to reflect the bank’s current borrowing and lending rates, and calculates the corresponding no-arbitrage bands. She tells Bigelow that the lower band will be at 97.7468. Bigelow checks her calculations, confirming that the higher band will be at 101.6294.
Once they know the no-arbitrage bands for current market conditions, Baker and Bigelow check the screen. They see that the market price of the futures contract for which they’ve been calculating no-arbitrage bands is 103. Together, they execute Baker’s first arbitrage play.
Part 4)
If the T-notes that Baker priced in the “simplified scenario” were not the cheapest to deliver, and the cheapest-to-deliver note had a conversion factor of 1.07, what would be the no-arbitrage futures price?
A)106.6853.
B)137.6041.
C)93.1831.
D)98.6359.
第4题
Susan Baker is a new hire at Crinson Bank’s Chicago office. She has joined the risk arbitrage desk where she will be training to take advantage of price discrepancies in the U.S. T-note futures and spot markets.
Her managing director, Gerald Bigelow, has asked her to calculate parameters for potential arbitrage opportunities for the bank given current market conditions. At the time he asked the question, the cheapest-to-deliver T-notes were at par, with a coupon rate of 8.5 percent. When trading futures, the risk arbitrage desk borrows at 12 percent and lends at 4 percent.
Looking at the calendar, Baker calculates that there are 184 days to the first coupon payment and 181 days from the first coupon payment to the second. Any interest accrued will be paid when the T-note is delivered against the futures contract, but Bigelow asks Baker not to concern herself in the calculations with the impact of reinvesting the coupons or with transaction costs.
To get a feel for the market, Baker first prices a 6-month futures contract that has 184 days to expiration in a “simplified scenario.” She decides to use the same interest rate for borrowing and lending, taking the average of the bank’s borrowing and lending rates. Calculating the futures price under these simplified assumptions, Baker tells Bigelow that the futures contract should trade at 99.7059. Bigelow explains that the futures price is below par even though the spot price is at par because of the benefit to a short seller of receiving the T-note coupon payments.
Having calculated the futures price in the “simplified scenario,” Baker modifies it to reflect the bank’s current borrowing and lending rates, and calculates the corresponding no-arbitrage bands. She tells Bigelow that the lower band will be at 97.7468. Bigelow checks her calculations, confirming that the higher band will be at 101.6294.
Once they know the no-arbitrage bands for current market conditions, Baker and Bigelow check the screen. They see that the market price of the futures contract for which they’ve been calculating no-arbitrage bands is 103. Together, they execute Baker’s first arbitrage play.
Part 2)
Which of the following most accurately describes the arbitrage strategy that Baker and Bigelow executed?
A)Sell futures contract, use proceeds to buy asset, borrow difference, sell asset, buy back futures, and collect difference between finance charges and interest from asset.
B)Borrow funds, buy spot asset, buy futures, deliver asset against long futures, and repay loan and finance charges.
C)Borrow funds, buy spot asset, sell futures, collect accrued interest on spot asset, deliver asset against short futures, and repay loan with interest.
D)Short spot asset, lend proceeds from short sale, buy futures contract, collect principal and interest on loan, pay interest on short asset, take delivery of asset against futures, and replace short asset.
第5题
Susan Baker is a new hire at Crinson Bank’s Chicago office. She has joined the risk arbitrage desk where she will be training to take advantage of price discrepancies in the U.S. T-note futures and spot markets.
Her managing director, Gerald Bigelow, has asked her to calculate parameters for potential arbitrage opportunities for the bank given current market conditions. At the time he asked the question, the cheapest-to-deliver T-notes were at par, with a coupon rate of 8.5 percent. When trading futures, the risk arbitrage desk borrows at 12 percent and lends at 4 percent.
Looking at the calendar, Baker calculates that there are 184 days to the first coupon payment and 181 days from the first coupon payment to the second. Any interest accrued will be paid when the T-note is delivered against the futures contract, but Bigelow asks Baker not to concern herself in the calculations with the impact of reinvesting the coupons or with transaction costs.
To get a feel for the market, Baker first prices a 6-month futures contract that has 184 days to expiration in a “simplified scenario.” She decides to use the same interest rate for borrowing and lending, taking the average of the bank’s borrowing and lending rates. Calculating the futures price under these simplified assumptions, Baker tells Bigelow that the futures contract should trade at 99.7059. Bigelow explains that the futures price is below par even though the spot price is at par because of the benefit to a short seller of receiving the T-note coupon payments.
Having calculated the futures price in the “simplified scenario,” Baker modifies it to reflect the bank’s current borrowing and lending rates, and calculates the corresponding no-arbitrage bands. She tells Bigelow that the lower band will be at 97.7468. Bigelow checks her calculations, confirming that the higher band will be at 101.6294.
Once they know the no-arbitrage bands for current market conditions, Baker and Bigelow check the screen. They see that the market price of the futures contract for which they’ve been calculating no-arbitrage bands is 103. Together, they execute Baker’s first arbitrage play.
Part 6)
If the bank enters an arbitrage play involving the cheapest-to-deliver Treasury bond, which of the following statements is INCORRECT?
A)The short position decides which bond to deliver.
B)The arbitrage play is no longer risk-free if the bank has a long position in the cheapest-to-deliver bond.
C)The long position has the advantage in the arbitrage play.
D)The cheapest-to-deliver bond may change during the life of the contract.
第6题
John Baker works in the loan department of a bank in Denver, Colorado. He is a loan of- ricer. Stanley Fanelli has an appointment with him now to ask about a loan. He needs money to buy a new car.
Mr. B: Hello, Mr. Fanelli. Please have a seat. What can I do for you today?
Mr. F: I want to borrow some money to buy a car. A friend of mine, Jack Richardson, bought a new car last week. He told me that he got his loan here.
Mr. B: Oh yes. I remember him. I was the loan officer who spoke with him.
Mr. F: He said that you were very helpful. I know very little about loans and I hope you can explain things to me.
Mr. B: I will certainly try. What questions did you have for me?
Mr. F: First, I want to know if loans for buying cars are commercial loans or personal loans.
Mr. B: Neither, Mr. Fanelli. They're auto loans. A commercial loan is principal that banks lend to businesses. Personal loans are made to individuals, but not for buying cars.
Mr. F: What about interest rates?
Mr. B: The rate of interest currently in effect on auto loans is 16%.
Mr. F: For how long will I have to make monthly payments?
Mr. B: The term of the loan is three years, so there will be 36 monthly payments.
Mr. F: Do I have to give the bank any collateral?
Mr. B: The car serves as collateral. If you default, the bank can take possession of the car. The bank also checks your credit file to make sure that you always paid back your loans in the past. Do you have any charge accounts?
Mr. F: My wife and I bought our furniture with our charge card and we even used it to buy airplane tickets for our vacation in California last year. We paid off both those debts promptly.
Mr. B: That's very good. I assume there will be no problem. But the first thing you have to do is fill out this loan application.
Mr. F: Thank you very much. I'll start right now.
State whether each statement is true or false based on the dialogue between John Baker and Stanley Fanelli.
Mr. Fanelli needs a loan to buy his new car.
A.True
B.False
第7题
Why might Greg Saito receive many calls?
A.He has been assigned a large amount of clients.
B.The employee directory has not been updated.
C.He is gathering information for the employee directory.
D.There are technical problems with the telephone system.
第8题
W: Dr. Baker, do you think an independent candidate could become president?
Q: What most probably is Mary?
(18)
A.A student.
B.A reporter.
C.A visitor.
D.A lecturer,
第9题
A.an improvement in the retailing sector.
B.the previous work done on the store.
C.Rowena Baker's choice of designer.
D.a change in the products on sale.
第10题
A.some
B.so much
C.particular
D.especially
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