You deposit $14,000 annually into a life insurance fund for the next 10 years, a

Question

You deposit $14,000 annually into a life insurance fund for the next 10 years, after which time you plan to retire.

If the deposits are made at the beginning of the year and earn an interest rate of 6 percent, what will be the amount in the retirement fund at the end of year 10? (Do not round intermediate calculations. Round your answer to 2 decimal places. (e.g., 32.16))

Instead of a lump sum, you wish to receive annuities for the next 20 years (years 11 through 30). What is the constant annual payment you expect to receive at the beginning of each year if you assume an interest rate of 6 percent during the distribution period? (Do not round intermediate calculations. Round your answer to 2 decimal places. (e.g., 32.16))

Repeat parts (a) and (b) above assuming earning rates of 5 percent and 7 percent during the deposit period and earning rates of 5 percent and 7 percent during the distribution period. (Do not round intermediate calculations. Round your answers to 2 decimal places. (e.g., 32.16))

You deposit $14,000 annually into a life insurance fund for the next 10 years, after which time you plan to retire.

Explanation / Answer

a)If the deposits are made at the beginning of the year and earn an interest rate of 6 percent, amount in the retirement fund at the end of year 10 will be = 14,000*FVIFA(6%,11)

=14,000*14.9716

= $209,602.40 ..Ans

..

b)Amount at the end of the 10th year = $209,602.40

Let the annuity (Annual Payment) from 11 th year to 30th year be x

.. Therefore,

209,602.40 = x*PVIFA(6%,20)

209,602.40 = x*11.4699

x = $18,274.13 ...Ans

..

..

.

..

Likewise solve for interest rate at 5% and 7% just by Changing PVIFA & FVIFA factors at 5% and 7% respectively.

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