Option one is buy or sell

[Problem 3 is a two-step problem. First part (Part A) requires you to find theoretical value of a regular coupon bond. The second part requires you to construct an arbitrage strategy.] Consider three 5-year regular coupon bonds; each bond has a face value of $100. All bonds mature on the same date. All bonds pay annual coupons at the same point in time. The coupons and current market prices for these bonds are given as following. Assuming that current market prices of Bond A and Bond B are correct, then what should be the theoretical (fundamental) market price of Bond C, as per the no-arbitrage principle? [Round-off to at least four decimal places.] Consider three 5-year regular coupon bonds; each bond has a face value of $100. All bonds mature on the same date. All bonds pay annual coupons at the same point in time. The coupons and current market prices for these bonds are given as following. Assuming that the arbitrager can buy/sell bonds only in the integer quantities, construct an arbitrage strategy whereby an arbitrager can have positive cash flow of $2.0592 at time t=0 (Now), and zero cash flows at time t=1, t=2,t=3,t=4, and t=5 ? (In order to match your answer with my answer, DO NOT ROUND-OFF ANY OF THE NUMBERS. If at all you want to round-off a number, then round-off to at least 8 decimal places.) S1) S2) S3) \begin{tabular}{|l|} [ Select ] \\ 1 \\ 2 \\ 3 \\ 4 \\ 5 \\ 6 \\ 7 \end{tabular} [Problem 3 is a two-step problem. First part (Part A) requires you to find theoretical value of a regular coupon bond. The second part requires you to construct an arbitrage strategy.] Consider three 5-year regular coupon bonds; each bond has a face value of $100. All bonds mature on the same date. All bonds pay annual coupons at the same point in time. The coupons and current market prices for these bonds are given as following. Assuming that current market prices of Bond A and Bond B are correct, then what should be the theoretical (fundamental) market price of Bond C, as per the no-arbitrage principle? [Round-off to at least four decimal places.] Consider three 5-year regular coupon bonds; each bond has a face value of $100. All bonds mature on the same date. All bonds pay annual coupons at the same point in time. The coupons and current market prices for these bonds are given as following. Assuming that the arbitrager can buy/sell bonds only in the integer quantities, construct an arbitrage strategy whereby an arbitrager can have positive cash flow of $2.0592 at time t=0 (Now), and zero cash flows at time t=1, t=2,t=3,t=4, and t=5 ? (In order to match your answer with my answer, DO NOT ROUND-OFF ANY OF THE NUMBERS. If at all you want to round-off a number, then round-off to at least 8 decimal places.) S1) S2) S3) \begin{tabular}{|l|} [ Select ] \\ 1 \\ 2 \\ 3 \\ 4 \\ 5 \\ 6 \\ 7 \end{tabular}