Answer:
The exact monthly payment will be $465.66
From the given options: OD is the most closer
Step-by-step explanation:
We got the following situation:
[tex]\sum\limits^n_0 {C/(1+i)^n} = C+ C/(1+i)+C/(1+i)^2 + ... + C/(1+i)^n\\\\\sum\limits^n_0 {C/(1+i)^n} = C / ( 1 + 1/(1+i) + 1/(1+i)^2 + ... + 1/(1+i)^n)\\\\C \sum\limits^n_0 {(1+i)^{-n}} = C \frac{1-(1+i)^{-n}}{1 - (1+i)}[/tex]
We end up with the formula for the present value of an annuity.
[tex]PV \div \frac{1-(1+r)^{-time} }{rate} = C\\[/tex]
PV $ 19,076.00
time 48
rate (0.07966 / 12 months) 0.006663333
[tex]19076 \div \frac{1-(1+0.006663)^{-48} }{0.006663} = C\\[/tex]
C $ 465.66509
