Respuesta :
lol you don't give us the table.
$200,000•0.30=$60,000
$140,000 owed.
0.115÷12m/y=0.009583333•$140,000=$1,341.67 (interest incurred yearly)
$1,341.67•30=$40,250.10 interest over 30 years.
$140,000+$40,250.10=$180,250.10
$180,250.10÷360months(30years)= $500.70/m
I believe that is your answer (I rounded up less than 1 cent)
$200,000•0.30=$60,000
$140,000 owed.
0.115÷12m/y=0.009583333•$140,000=$1,341.67 (interest incurred yearly)
$1,341.67•30=$40,250.10 interest over 30 years.
$140,000+$40,250.10=$180,250.10
$180,250.10÷360months(30years)= $500.70/m
I believe that is your answer (I rounded up less than 1 cent)
Answer:
Mark's monthly payment is $1386.40.
Step-by-step explanation:
Marc bought a new split level for $200,000. Marc put down 30%.
So, loan amount = [tex]200000-(0.30\times200000)=140000[/tex] dollars
p = 140000
r = [tex]11.5/12/100=0.0095833[/tex]
n = 360
The EMI formula is :
[tex]\frac{p\times r\times (1+r)^{n} }{(1+r)^{n}-1 }[/tex]
Substituting the values in the formula:
[tex]\frac{140000\times0.0095833\times (1+0.0095833)^{360} }{(1+0.0095833)^{360}-1 }[/tex]
=> [tex]\frac{140000\times0.0095833\times (1.0095833)^{360} }{(1.0095833)^{360}-1 }[/tex]
= $1386.40
Hence, Mark's monthly payment is $1386.40.
