Suppose a borrower knows at time t = 0 that it will have available at time t
Question:
Suppose a borrower knows at time t = 0 that it will have available at time t = 1 an opportunity to invest $340in a risky project that will pay off at time t = 2. The borrower knows that it will be able to invest in one of two mutually exclusive projects, S or R, each requiring a $340investment. If the borrower invests in S at time t = 1, the project will yield a gross payoff of $615with a probability of 0.8 and $180with a probability of 0.2 at time t = 2. If the borrower invests inR attime t = 1, the project will yield a gross payoff of $685with a probability of 0.6 and $100with a probability of 0.4 at time t = 2. The borrower's project choice is not observable to the bank.
The riskless, single-period interest rate at time t = 0 is3%. It is not known at time t = 0 what the riskless, single period interest rate at time t = 1 will be, but it is common knowledge that this rate will be4% (with probability 0.65) or10% (with probability 0.35). Assume universal risk neutrality and that the borrower has no assets than the project on which you (as the lender) can have a claim.
Suppose you are this borrower's bank and both you and the borrower recognize that this borrower has two choices: (1) it can do nothing at time t = 0 and simply borrow at the spot market at interest rate prevailing for it at time t = 1, or (2) it can negotiate at time t = 0 with you (or some other bank) for a loan commitment that will permit it to borrow at predetermined terms at time t = 1.
What advice should you give this borrower? Assume a competitive loan market in which each bank is constrained to earn zero expected profit. Determine the NPV of thealternative(s) that you recommend.