Answer:
Explanation:
1. Calculate the value of the annuity one year from now.
The following equation is used to calculate the present value of an annuity that starts payments one year from now:
[tex]PV=C\times \bigg[\dfrac{1}{r}-\dfrac{1}{r(1+r)^t}\bigg][/tex]
Where:
Substitute and compute:
[tex]PV=\$8,000\times \bigg[\dfrac{1}{0.13}-\dfrac{1}{0.13(1+0.13)^{10}}\bigg][/tex]
[tex]PV=\$43,409.95[/tex]
Notice that, since the annuity will begin the payment two years from today, that value is the value in a year. Then, to find the value today you must discount the calculated value one year, at the same rate.
2. Value today
[tex]V_{today}=\dfrac{PV}{(1+r)}=\dfrac{\$43,409.95}{1.13}=\$38,415.88[/tex]
