Solution: A

Let i represent the common yield rate of the two bonds. Since the modified duration is the Macaulay duration divided by (1 + i) and i > 0, the Macaulay duration of each bond is greater than its modified duration. Since a < d < b, the Macaulay duration of d years must be associated with the bond with modified duration a years.

Since the bonds have the same yield rate, the ratio of the two types of duration is the same for each bond. So if x represents the Macaulay duration of the other bond in years, we have d / a = x / b implies ax = bd implies x = bd / a. The Macaulay duration of the other bond is bd / a years.