Answer :
Answer:
ballon payment: $ 435,151.67
Explanation:
We need to solve for the PMT fo the mortgage
Then, the amount amortized for the mortage over an 8 years period
Last, we subtract the amortized amount on the principal to knwo the balloon payment.
[tex]PV \div \frac{1-(1+r)^{-time} }{rate} = C\\[/tex]
PV 500,000
time 360 (30 years x 12 months)
rate 0.004666667 (5.6% annual rate divide into 12 months)
[tex]500000 \div \frac{1-(1+0.00466666666666667)^{-360}}{0.00466666666666667} = C\\[/tex]
C $ 2,870.395
Next, we calculate the amortization on the first period:
payment less interest = amortization
$2,870.395 - $500,000 x 0.004666667 = $ 537.06
Now the value of this amortization over an 8 years period annuity:
[tex]C \times \frac{(1+r)^{-time} -1}{rate} = PV\\[/tex]
C $ 537.06
time 96 (8 years x 12 months)
rate 0.004666667
[tex]537.061 \times \frac{(1+0.00466666666666667)^{96} -1}{0.00466666666666667} = PV\\[/tex]
PV $64,848.3291
Last, the ballon payment: 500,000 - 64,848.33 = 435,151.67