Revision as of 21:00, 20 November 2023 by Admin (Created page with "'''Solution: D''' The present value of the liabilities is 1000, so that requirement is met. The duration of the liabilities is <math display = "block">402.1\,[1.1^{-1}+2(1.1)^{-2}+3(1.1)^{-3}]/1000=1.9365.</math> Let X be the investment in the one-year bond. The duration of a zero-coupon is its term. The duration of the two bonds is then <math display = "block"> [X + (1000-X)(3)]/1000 = 3-0.002X. </math> Setting this equal to 1.9365 and solving yields X = 531.75....")
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Exercise

AAdmin
Nov 20'23

Answer

Solution: D

The present value of the liabilities is 1000, so that requirement is met. The duration of the liabilities is

[[math]]402.1\,[1.1^{-1}+2(1.1)^{-2}+3(1.1)^{-3}]/1000=1.9365.[[/math]]

Let X be the investment in the one-year bond. The duration of a zero-coupon is its term. The duration of the two bonds is then

[[math]] [X + (1000-X)(3)]/1000 = 3-0.002X. [[/math]]

Setting this equal to 1.9365 and solving yields X = 531.75.

Copyright 2023 . The Society of Actuaries, Schaumburg, Illinois. Reproduced with permission.

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