Step-by-step explanation:
i = interest 3% for 30 years
This is a simple dynamical system for whom the the solutions are given as
[tex]S=R[\frac{(i+1)^n-1}{i}](i+1)[/tex]
putting values we get
S=2000[\frac{(1.03)^{30}-1}{0.03}](1.03)
= $98005.35
withdrawal of money takes place from one year after last payment
To determine the result we use the present value formula of an annuity date
[tex]P = R\frac{1-(1+i)^{-n}}{i}{i+1}[/tex]
we need to calculate R so putting the values and solving for R we get
R= $6542.2356
