Answer:
5 years
Step-by-step explanation:
In the question we are given;
We are required to determine the time taken for the money invested to accrue to the given amount;
Using compound interest formula;
[tex]A=P(1+\frac{r}{100})^n[/tex]
where n is the interest period and r is the rate of interest, in this case, 4/12%(0.33%)
Therefore;
[tex]6,163.59=5,048(1+\frac{0.333}{100})^n[/tex]
[tex]1.221=(1+\frac{0.333}{100})^n[/tex]
[tex]1.221=(1.0033)^n[/tex]
introducing logarithms on both sides;
[tex]log1.221=log(1.0033)^n\\n=\frac{log1.221}{log1.0033} \\n=60.61[/tex]
But, 1 year = 12 interest periods
Therefore;
Number of years = 60.61 ÷ 12
= 5.0508
= 5 years
Therefore, it will take 5 years for the invested amount to accrue to $6163.59
