Futures versus Forwards. Let to = 0,t1, t2, ... denote dates where tn is n days from today (to). An asset's price is $1,000 today, Ato) = 1000, and the continuously compounded interest rates is constant, r = 4% with fractions of time calculated Act/365: ti+1-ti = 1/365. (a) What is the 10-day forward price of the asset, FA(0,t10)? (b) You agree today (to = 0) to buy the asset in 10 days for K = FA(0,t10). How much do you need to pay/receive today to enter into this contract? (c) Assume the asset's price increases by $10 each day for the next 10 days, A(tn) = A(0) + 10n, and compute the missing entries in the following table where CFfut is the cash flow for 1 futures contract, CFFwd is the cash flow for 1 forward contract, QFut is the number of futures contracts needed to replicate 1 forward contract, and FV(Qx CF) is the corresponding cash flow of the modified futures contract, future valued to t1o. A(tn) Fatn, t10) VFA(Int10, K) CFFwd 1,000 1,010 CFFut Fut 0 FVQ X CF)Fut) 0 0 1 ... 10 1,100 1,100 (a) Compare the total cash flows of 1 (unmodified) futures contract ver- sus the forward contract. (e) Would QFut's be different if the underlying had instead dropped by $10 each day to settle at $900 at t10? Futures versus Forwards. Let to = 0,t1, t2, ... denote dates where tn is n days from today (to). An asset's price is $1,000 today, Ato) = 1000, and the continuously compounded interest rates is constant, r = 4% with fractions of time calculated Act/365: ti+1-ti = 1/365. (a) What is the 10-day forward price of the asset, FA(0,t10)? (b) You agree today (to = 0) to buy the asset in 10 days for K = FA(0,t10). How much do you need to pay/receive today to enter into this contract? (c) Assume the asset's price increases by $10 each day for the next 10 days, A(tn) = A(0) + 10n, and compute the missing entries in the following table where CFfut is the cash flow for 1 futures contract, CFFwd is the cash flow for 1 forward contract, QFut is the number of futures contracts needed to replicate 1 forward contract, and FV(Qx CF) is the corresponding cash flow of the modified futures contract, future valued to t1o. A(tn) Fatn, t10) VFA(Int10, K) CFFwd 1,000 1,010 CFFut Fut 0 FVQ X CF)Fut) 0 0 1 ... 10 1,100 1,100 (a) Compare the total cash flows of 1 (unmodified) futures contract ver- sus the forward contract. (e) Would QFut's be different if the underlying had instead dropped by $10 each day to settle at $900 at t10