Revision as of 00:18, 19 November 2023 by Admin (Created page with "'''Solution: E''' At the time of the final deposit the fund has <math display = "block">750 s_{\overline{18}|0.07} = 25, 499.27</math> This is an immediate annuity because the evaluation is done at the time the last payments is made (which is the end of the final year). A tuition payment of 6000 (1.05)<sup>17</sup> = 13, 752.11 is made, leaving 11,747.16. It earns 7%, so a year later the fund has 11,747.16(1.07) = 12,569.46. Tuition has grown to 13,752.11(1.05) = 14,439...")
Exercise
ABy Admin
Nov 19'23
Answer
Solution: E
At the time of the final deposit the fund has
[[math]]750 s_{\overline{18}|0.07} = 25, 499.27[[/math]]
This is an immediate annuity because the evaluation is done at the time the last payments is made (which is the end of the final year). A tuition payment of 6000 (1.05)17 = 13, 752.11 is made, leaving 11,747.16. It earns 7%, so a year later the fund has 11,747.16(1.07) = 12,569.46. Tuition has grown to 13,752.11(1.05) = 14,439.72. The amount needed is 14,439.72 – 12,569.46 = 1,870.26
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