1. Economics 434 Financial Markets Professor Burton University of Virginia Fall 2015 Fall, 2015

2. US Treasury Securities Main types of U.S. Treasury Securities U.S. Treasury Bills – orig. maturity of under one year U.S. Treasury Notes – orig. maturity of 1 to 10 years U.S. Treasury Bonds – orig. maturity of over 10 years U.S. Treasury Bills Represent about 20% of all debt held by public Discount Securities – one payment to owner

3. US Treasury Securities U.S. Treasury Notes and Bonds Represent about 70% of all debt held by public Coupon Securities – interest payments made every 6 months until maturity, on which interest + principal is paid How are these debt instruments sold? Most U.S. Treasuries are sold via “single-price Dutch auctions.”

4. U.S Treasury Bill Auctions Let’s say the Treasury wants to sell $10 billion (the “offering”) of 6-month Treasury bills. After announcing the auction, it accepts bids from potential buyers. Each bid lists the amount the bidder is willing to purchase at various prices – essentially, it represents the bidder’s entire demand curve for that security.

5. U.S Treasury Bill Auctions A bid may look something like (note that a low quote is a high price): Non-Com is short for non-competitive – this is like bidding a very low quote or an infinite price. QuoteAmount 5.1$100 million 5.05$200 million 5.0$300 million Non-Com$50 million

6. U.S Treasury Bill Auctions The Fed fills bids via Dutch auction Bids filled from the highest price down – Non-Coms filled first – Lowest quote (highest price) filled second – Process continued until entire offering accounted for Quote at which market clears becomes the quote for everyone – “single-price” auction

7. U.S Treasury Bill Auctions Let’s say the total of the bids across all bidders was: $3 billion in Non-Coms $2 billion at 4.90 $2 billion at 5.00 $1 billion at 5.02 Then the auction results would be: Market clears at 5.08 Our firm’s tenders through 5.05 are filled (at 5.08) Tenders at 5.10 are left unfilled $1 billion at 5.05 $1 billion at 5.08 $1 billion at 5.10

8. U.S Treasury Bill Quotes What does this quote mean? It is the bill’s discount, annualized to a 360-day year We want to calculate the bill’s yield, annualized to a 365-day year. To do so: – Calculate the adjusted discount: 180/360 * 5.08 = 2.54 – This means the price today is 2.54% less than the bill’s face value. E.g., face value = $1,000,000, today’s price is $1,000,000 * (1 -.0254) = $974,600, so you pay $ 25,400 – 25,400/974,600 is the yield for 180 days – Multiply that yield by (365/180) to get the true yield

9. U.S Treasury Bill Quotes Let’s say 80 days pass, and the discount moves to 4.5. To calculate the new yield: Calculate the adjusted discount: 100/360 * 4.5 = 1.25 TP = Today’s price = $1,000,000 * (1 - 0.0125) = $987,500 = TP Lastly, we annualize this yield: r * 365/100 = 4.62% $x (1+r) $x TP = (1+r) $x - TP TP r = r =

10. U.S Treasury Bill Quotes More generally, let: – d = quote, – Tsm = Time from settlement to maturity, – F = T-bill’s principal amount, or face value Then: – Bill’s absolute discount D = d x F x – Bill’s price P = F – D – Bill’s annualized yield y = D/P times Note that, in the Treasury bill market, the actual yield will always exceed the quote. 365 Tsm 360

11. U.S Treasury Bills Five types of Treasury Bills: Four-week bills Three-month bills Six-month bills The year bill Cash Management Bill – Used to provide cash when Treasury accounts are low – Rarely issued – only for short-term cash needs

12. Treasury Notes & Bonds As opposed to Treasury Bills, Treasury Notes and Bonds have an orig. maturity over 1 year Examples of Notes and Bonds: – 2-Year Notes – 5-Year Notes – 20-Year Bonds (last auctioned January 1986) – 30-Year Bonds Only difference between notes and bonds is the original maturity – other than that, we will treat them as interchangeable (including the names)

13. U.S Treasury Notes and Bonds As opposed to Treasury Bills, Treasury Notes and Bonds are coupon securities – pay two interest payments annually until maturity How do we know when these interest payments take place? All the information we need to determine interest payment amounts and timing exists in the bond’s name.

14. Example: “ 5¼’s of Feb 29 ” “Feb 29” tells us the security matures on February 15 th, 2029 (most treasury notes and bonds use the 15 th ). This also tells us interest payments will occur on February 15 th and August 15 th every year until (and including) the maturity date. U.S Treasury Notes and Bonds Security’s Maturity Date Security’s Coupon

15. Example: “ 5¼’s of Feb 29 ” “5¼’s” tells us the security pays a total of 5¼% of the principal in interest every year This payment is made in two equal installments semiannually (in this case, on February 15 th and August 15 th of each year) U.S Treasury Notes and Bonds Security’s Maturity Date Security’s Coupon

16. Example: 5¼’s of Feb 29, principal = $100,000 From this, we know all future payments from this bond. Principal on February 15 th, 2029 ! $100,000 payment Total interest paid yearly = 5¼% * $100,000 = $5,250 Half of this interest ($2,625) paid every February 15 th, other half ($2,625) paid every August 15 th until 2/15/29 This represents all future cash flows related to this bond. U.S Treasury Notes and Bonds

17. Example: 4½’s of Aug 33, principal = $100,000 Bond’s future payments: Principal on August 15 th, 2033 ! $100,000 payment Total interest paid yearly = 4½% * $100,000 = $4,500 Until February 15 th, 2033, half of this interest ($2,250) paid every August 15 th, other half ($2,250) paid every February 15 th Again, this represents all future cash flows related to this bond. U.S Treasury Notes and Bonds

18. So the name of the bond and its principal tells us everything we get from the bond - but how do we know what we have to pay to buy it? The price is listed in the market, as a percentage of the principal amount. Example: Bond with $100,000 principal value Listed Price = 90 Actual Price = $90,000 Listed Price = 110 Actual Price = $110,000 Listed Price = 100 Actual Price = $100,000 U.S Treasury Notes and Bonds

19. Prices can be listed in 1/32 nd increments. Example: Bond with $100,000 principal Listed Price = 98 5/32 Actual Price = $98,156.25 Listed Price = 100 3/16 Actual Price = $100,187.50 Listed Price = 103 1/4 Actual Price = $103,250.00 Listed Price = 97 5/8 Actual Price = $97,625.00 Now let’s say the next coupon payment is on Feb. 15, 2016, and we buy the bond on Feb. 14, 2016 – do we essentially get that coupon payment for free? U.S Treasury Notes and Bonds

20. No – we need to account for accrued interest. Example: Let’s say we buy the 4½’s of Aug/33 with $100,000 principal on Oct 31, 2015 at 102 ¼. Price = 102 ¼ * $100,000 / 100 = $102,500.00 Coupon Payments = $2,250 each Most recent coupon payment = August 15 th, 2015 Next payment on February 15 th, 2016, 184 days later; 77 of those days have passed Accrued interest = $2,250 * 77 / 184 = $941.58 U.S Treasury Notes and Bonds

21. We will receive the full $2250 on February 15 th, 2016, even though we only held the bond for 107 of the 184 days between coupon payments. Therefore, we need to compensate the current bondholder for losing this accrued interest. Total price = $102,250 + $941.58 = $103,191.58 This is called the “price plus accrued” – U.S. Treasury Securities always trade with accrued. U.S Treasury Notes and Bonds

22. Example: Same bond, but we buy it today (Suppose today is February 16,2015) at a price of 98 11/32. Price = 98 11/32 * $100,000 / 100 = $98,343.75 Accrued interest = $2,250 * 18 / 184 = $220.11 Price with Accrued = $98,343.75 + $220.11 = $98,563.86 Let’s say we buy this bond (4½’s of Aug/33) on February 15 th, 2016, right after the coupon payment (so no accrued interest) at a price of 100… what return would we be getting on our investment? U.S Treasury Notes and Bonds

23. First, what exactly are we getting? $2,250 coupon payments every 6 months from August 15 th, 2015 until August 15 th, 2033 (37 total) $100,000 maturity payment on August 15 th, 2033 And what exactly are we paying? Listed Price = 100 ! Actual Price = $100,000.00 No accrued, so total cost = $100,000.00 So, we need to find the interest rate that equates the current price to the PV of future cash flows. U.S Treasury Notes and Bonds

24. In other words, we’re looking for the r that solves this equation (note that here, r is the 6-month rate): Could solve this via trial and error… However, note that this is the same stream of cash flows we’d get if we put $100K into an account bearing 2.25% every 6 months. U.S Treasury Notes and Bonds $2.25K (1+r) 1 $100K = + $100K (1+r) 37 + $2.25K (1+r) 2 + $2.25K (1+r) 3 + $2.25K (1+r) 4 + … + $2.25K (1+r) 34 + $2.25K (1+r) 35 + $2.25K (1+r) 36

25. Since we can replicate the future cash flows with a 2.25% 6-month rate, that must be the value of r. We need to annualize this rate… normally, we would consider the compounding from two periods of 6-month interest. However, by convention, we simply double the 6-month rate… here, the annual rate is 4.5%. U.S Treasury Notes and Bonds This is called the bond’s “yield-to-maturity” – it is the most important metric on which we measure bonds.

26. Note that the bond had a 4.5% coupon rate and also ended up yielding a 4.5% interest rate… why is this? In general, when a bond’s listed price is 100, its coupon rate and yield will be the same. What if the price dropped to 98 – what would happen to the yield? U.S Treasury Notes and Bonds

27. Now, we’re looking for the 6-month rate r that solves: The present value of the same future stream of cash flows has gone down. Therefore, the implied interest rate, or the yield, must have increased. U.S Treasury Notes and Bonds $2.25K (1+r) 1 $98K = + $100K (1+r) 37 + $2.25K (1+r) 2 + $2.25K (1+r) 3 + $2.25K (1+r) 4 + … + $2.25K (1+r) 34 + $2.25K (1+r) 35 + $2.25K (1+r) 36

28. What if the price had been 102? Here, the present value of the same future stream of cash flows has gone up. Therefore, the implied interest rate, or the yield, must have decreased. U.S Treasury Notes and Bonds $2.25K (1+r) 1 $102K = + $1M00K (1+r) 37 + $2.25K (1+r) 2 + $2.25K (1+r) 3 + $2.25K (1+r) 4 + … + $2.25K (1+r) 34 + $2.25K (1+r) 35 + $2.25K (1+r) 36

29. This demonstrates an important relationship between bond prices and yields… We’ve covered what happens to bonds in the market, but how are they issued in the first place? U.S Treasury Notes and Bonds Bond prices and yields vary inversely. That is, as prices go up, yields go down, and vice versa.

30. New T-note and T-bond issues are sold via Dutch auction, just like T-bills, except the bids submitted are yields-to-maturity, not discount quotes. Example: The Treasury is auctioning off $15 billion of 30-year bonds. One firm’s bid may look something like: U.S Treasury Notes and Bonds Yield-to-maturityAmount 5.8$100 million 5.7$200 million 5.5$300 million Non-Com$50 million

31. The Fed then fills bids from the lowest yield upwards, eventually reaching a market-clearing yield. The bond’s coupon is then set at that yield, rounding to the nearest 1/8 th, so that the starting price is as close to 100 as possible. Examples: U.S Treasury Notes and Bonds Auction ResultCoupon Rate 4.554.5 4.975.0 5.115.125 5.25

32. If the coupon ends up above the yield, the purchase price will be just above 100. If the coupon ends up below the yield, the purchase price will be just below 100. After the bonds are issued, they are traded openly in the market, and market forces determine price movements. More buyers than sellers ! the price goes up (and hence the implied yield goes down), and vice versa. U.S Treasury Notes and Bonds

33. Fall, 2015