Revision as of 00:27, 22 November 2023 by Admin (Created page with "Brian purchases a 7 year annuity with payments at the end of every quarter for $X. The first payment is $350 and each subsequent payment is $50 more. How much did Brian pay for the annuity if the interest was 14% convertible quarterly? <ul class="mw-excansopts"><li>$75,990.43</li><li>$16,155.86</li><li>$50,816.33</li><li>$16,721.00</li><li>$1,982.40</li></ul> {{cite web |url=https://digitalcommons.calpoly.edu/cgi/viewcontent.cgi?article=1008&context=statsp |last=Hard...")
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ABy Admin
Nov 22'23

Exercise

Brian purchases a 7 year annuity with payments at the end of every quarter for $X. The first payment is $350 and each subsequent payment is $50 more.

How much did Brian pay for the annuity if the interest was 14% convertible quarterly?

  • $75,990.43
  • $16,155.86
  • $50,816.33
  • $16,721.00
  • $1,982.40

Hardiek, Aaron (June 2010). "Study Questions for Actuarial Exam 2/FM". digitalcommons.calpoly.edu. Retrieved November 20, 2023.

ABy Admin
Nov 22'23

Solution: B

The first thing we must do is recognize the arithmetic pattern which we must separate from the other payments.

Thus the annuity payments are: 300, 300, 300, . . .

And the increasing annuity pay is 50, 100, 150, . . .

Thus the present value would be:

[[math]] \begin{aligned} & \mathrm{pv}=300 \mathrm{a}_{\overline{28} |.035}+50\left(\mathrm{I}_{\mathrm{a}}\right)_{\overline{28} | .035} \\ & =300\left(1-\mathrm{v}^{28} / .035\right)+50\left(\ddot{\mathrm{a}}_{\overline{28} | .035}-28 \mathrm{v}^{28} / .035\right) \\ & =300(17.667)+50(217.1155) \\ & =16,155.55\end{aligned} [[/math]]

Hardiek, Aaron (June 2010). "Study Questions for Actuarial Exam 2/FM". digitalcommons.calpoly.edu. Retrieved November 20, 2023.

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