Question 2 [20 points]. The current date is t. The term structure of discount factors on date t is as in the following table: 1. [2 points] Consider a 30 year coupon bond with (1) a coupon rate of 4% per annum, and (2) coupons are paid annually (at the end of each year). The bond is priced at par. What is its continuously compounded yield to maturity? 2. [4 points] Compute the forward price for a forward contract with the following details: (1). Underlying asset: a 5% coupon bond with maturity T=5 and face value of 100 . Coupons are paid semi-annually. (2). Delivery occurs at T=3 (immediately after the coupon payout at T=3 ). 3. [6 points] Consider the following bond A : (1). [1 points] Bond A has a face value of $100. A is a 2 year coupon bond with coupon rate of 6% per annum. Coupons are paid semi-annually. What is the price of A,PA ? (2). [2 points ] Consider bond B. B is identical to A exoept that its coupons are paid on a quarterly basis. Which has larger duration, bond A or bond B ? Explain your answer without explicitly computing. (3). [3 points] You have purchased bond . You would like to duration hedge this bond using a 5 year zero coupon bond completely financed by repeatedly rolling over (overnight) repo. What does your hedging portfolio look like following the idea of duration hedging? What fraction of your hedging portfolio is in the 5 year zero coupon bond? 4. [2 points] Consider bond C. C is a 3-year floating rate bond with a spread of zero, a face value of 100 , and coupons paid on a quarterly basis. What is the price of C,PC ? 5. [ 2 points] What is the duration and convexity of bond C immediately after it is issued? 6. [4 points] You just purchased $100 million worth of 10 year ZCBs. Using a first order approximation and taking the change in the interest rate over the next month to be normally distributed with a mean of 0 and a volatility of 1%, what is the 99%VaR of your portfolio over the next month? In the event that losses exceed this 99%-VaR, how much would you expect to lose