Answer:
a. $0.81 ÷ A$
b. $42,035.31
Step-by-step explanation:
a. Current Spot Rate = $ 0.85 ÷ A $,
Interest Rate of US = 3.5%
Interest Rate of Australia = 4.2%
If IRP holds, so the one-year forward exchange rate
= 0.85 × [(1.035) ÷ (1.042)]
= $0.844 ÷ A $
Therefore, the actual forward rate is $0.81 ÷ A$, it indicating that International Fisher Effect does not hold .
b. As we can observe in part a., the IRP is not holding, therefore offering an opportunity to benefit from arbitrage. The same can be done as mentioned hereafter:
Borrow A$1,176,471 at the Australian Interest Rate of 4.2%.
Borrowing creates repayment liability worth (A$1,176,471 × 1.042)
= A$1,225,882.78 after one year
Convert the loan into $at current spot rate = $0.85 ÷ A$ to yield
= (A$1,176,471 ÷ 0.85) ~ $1,000,000
Invest the converted $balance for one year at a US interest rate of 3.5%
= $1,000,000 × 1.035
= $1,035,000
After one year convert the investment yield of $1,035,000 into A $ at the forward rate of $0.81 ÷ A $ to yield = $1,035,000 ÷ 0.81
= A$1,277,778.22
Arbitrage Profit = A$1,277,778.22 - $1,225,882.78
= A $51,895.44 or
($51,895.44 × 0.81)
= $42,035.31