Respuesta :
The interest earned compounded annually at $80.14
$1000 x (1.07)^2=1144.90 after 2 years
1144.90 x 0.07 = 80.14
A technique of calculating and adding interest to funding or mortgage as soon as a year, in preference to for any other period: if you borrow $100,000 at five% hobby compounded annually, after the first yr you'll owe $five,250 on a principal of $a hundred and five,000.
It's far to be mentioned that the above-given system is the general components while the major is compounded n quantity of instances in a yr. If the given most important is compounded annually, the quantity after the term at percentage fee of interest, r, is given as A = P(1 + r/a hundred)t, and C.I. could be P(1 + r/100)t - P.
That stated, annual hobby is commonly at a higher rate because of compounding. in place of paying out monthly, the sum invested has twelve months of increase. But if you are able to get the equal price of interest for month-to-month payments, as you can for annual bills, then take it.
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The interest earned compounded annually at $80.14
$1000 x (1.07)^2=1144.90 after 2 years
1144.90 x 0.07 = 80.14
A technique of calculating and adding interest to funding or mortgage as soon as a year, in preference to for any other period: if you borrow $100,000 at five% hobby compounded annually, after the first yr you'll owe $five,250 on a principal of $a hundred and five,000.
It's far to be mentioned that the above-given system is the general components while the major is compounded n quantity of instances in a yr. If the given most important is compounded annually, the quantity after the term at percentage fee of interest, r, is given as A = P(1 + r/a hundred)t, and C.I. could be P(1 + r/100)t - P.
That stated, annual hobby is commonly at a higher rate because of compounding. in place of paying out monthly, the sum invested has twelve months of increase. But if you are able to get the equal price of interest for month-to-month payments, as you can for annual bills, then take it.
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#SPJ4
