formula is [tex]A=P(1-\frac{r}{n})^{nt}[/tex]
where A=final amount
P=principal
r=interest rate in decimal
n=number of times per year it is compounded
t=time in years
we want to find where
A=2P
and P=5745
and r=6.5%=0.065
n=monthly=12
remember that [tex]ln(x^a)=a(ln(x))[/tex]
also that [tex](a^b)^c=a^{bc}[/tex]
[tex]2(5745)=5745(1+\frac{0.065}{12})^{12t}[/tex], solving for t
divide both sides by 5745 to simplify things a bit
[tex]2=(1+\frac{0.065}{12})^{12t}[/tex] I'd rather not simplify this because it give us a decimals and those aren't exact, if we combine, we get 12.065/12 for inside parenthases
[tex]2=(\frac{12.065}{12})^{12t}[/tex]
take ln of both sides
[tex]ln(2)=ln((\frac{12.065}{12})^{12t})[/tex]
[tex]ln(2)=(12t)ln(\frac{12.065}{12})[/tex]
divide both sides by [tex]12ln(\frac{12.065}{12})[/tex]
[tex]\frac{ln(2)}{12ln(\frac{12.065}{12})}=t[/tex]
using our calculator, t≈10.6927
so rounded, we get 10.7 years
