Answer:
$1,109.62
Step-by-step explanation:
Let's first compute the future value FV.
In order to see the rule of formation, let's see the value (in $) for the first few years
End of year 0
1,000
End of year 1(capital + interest + new deposit)
1,000*(1.09)+10
End of year 2 (capital + interest + new deposit)
(1,000*(1.09)+10)*1.09 +10 =
[tex]\bf 1,000*(1.09)^2+10(1+1.09)[/tex]
End of year 3 (capital + interest + new deposit)
[tex]\bf (1,000*(1.09)^2+10(1+1.09))(1.09)+10=\\1,000*(1.09)^3+10(1+1.09+1.09^2)[/tex]
and we can see that at the end of year 50, the future value is
[tex]\bf FV=1,000*(1.09)^{50}+10(1+1.09+(1.09)^2+...+(1.09)^{49}[/tex]
The sum
[tex]\bf 1+1.09+(1.09)^2+...+(1.09)^{49}[/tex]
is the sum of a geometric sequence with common ratio 1.09 and is equal to
[tex]\bf \frac{(1.09)^{50}-1}{1.09-1}=815.08356[/tex]
and the future value is then
[tex]\bf FV=1,000*(1.09)^{50}+10*815.08356=82,508.35564[/tex]
The present value PV is
[tex]\bf PV=\frac{FV}{(1.09)^{50}}=\frac{82508.35564}{74.35572}=1,109.616829\approx \$1,109.62[/tex]
rounded to the nearest hundredth.
