Answer:
Find out the how much interest is earned on the investment .
To prove
Formula
[tex]Amount =P ( 1 +\frac{r}{12})^{12t}[/tex]
Where P is the principle, r is rate in decimal form , t is the time.
As given
An investment of $6,599.20 earns 4.2% interest compounded monthly over 7 years.
4.2% is written in the decimal form
[tex]= \frac{4.2}{100}[/tex]
= 0.042
P = $6,599.20
T = 7 years
Put in the formula
[tex]Amount = 6599.20( 1 +\frac{0.042}{12})^{12\times 7}[/tex]
[tex]Amount = 6599.20( 1 +\frac{0.042}{12})^{84}[/tex]
[tex]Amount = 6599.20( 1 + 0.0035)^{84}[/tex]
[tex]Amount = 6599.20( 1.0035)^{84}[/tex]
[tex]Amount = 6599.20\times 1.3411[/tex]
Amount = $ 8850.187
Interest = Amount - Principle
= $ 8850.187 - $6,599.20
= $2250.987
Therefore the interest is $2250.987
Option (a) is correct.
