Final answer:
To find the six-month forward rate with a spot rate of 0.7000 and interest rates of 0% (domestic) and 7% (foreign), we use the IRP formula. Calculating using continuous compounding for six months, the result is approximately 0.6759. Therefore, the correct option is B.
Step-by-step explanation:
To calculate the six-month forward rate given an exchange rate of 0.7000 and a differential in continuous compounding interest rates (domestic at 0% and foreign at 7%), we can use the Interest Rate Parity (IRP) formula: F = Se^(d - f)t, where F is the forward exchange rate, S is the spot exchange rate, d and f are the domestic and foreign interest rates respectively, and t is the time in years. For this problem:
- S = 0.7000
- d = 0%
- f = 7%
- t = 0.5 years (since we are looking for the six-month forward rate)
The formula becomes F = 0.7000e^(0 - 0.07 × 0.5). Calculating this, you get:
Forward Rate F ≈ 0.7000 × e^(-0.035) ≈ 0.7000 × 0.9659 ≈ 0.6761
Thus, the closest answer to the six-month forward rate from the options provided is B) 0.6759.