Revision as of 12:22, 20 November 2023 by Admin (Created page with "'''Solution: E''' The correct answer is the lowest cost portfolio that provides for $11,000 at the end of year one and provides for $12,100 at the end of year two. Let H, I, and J represent the face amount of each purchased bond. The time one payment can be exactly matched with H + 0.12J = 11,000. The time two payment can be matched with I + 1.12J = 12,100. The cost of the three bonds is H/1.1 + I/1.2321 + J. This function is to be minimized under the two constraints. S...")
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Exercise

AAdmin
Nov 20'23

Answer

Solution: E

The correct answer is the lowest cost portfolio that provides for $11,000 at the end of year one and provides for $12,100 at the end of year two. Let H, I, and J represent the face amount of each purchased bond. The time one payment can be exactly matched with H + 0.12J = 11,000. The time two payment can be matched with I + 1.12J = 12,100. The cost of the three bonds is H/1.1 + I/1.2321 + J. This function is to be minimized under the two constraints. Substituting for H and I gives (11,000 – 0.12J)/1.1 + (12,100 – 1.12J)/1.2321 + J = 19,820 – 0.0181J. This is minimized by purchasing the largest possible amount of J. This is 12,100/1.12 = 10,803.57. Then, H = 11,000 – 0.12(10,803.57) = 9703.57. The cost of Bond H is 9703.57/1.1 = 8,821.43.

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

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