[tex]A=P(1+ \frac{r}{n})^ \frac{t}{n} [/tex]
A=future amount
P=present amount
r=rate in decimal
n=number of times per year compounded
t=time in years
how many years to double
basically
A=2P at t=?
so we can simplify and ignore the pricipal given and do
[tex]2=(1+ \frac{r}{n})^ \frac{t}{n} [/tex]
r=5.5%=0.055
n=1
t=t
[tex]2=(1+ \frac{0.055}{1})^ \frac{t}{1} [/tex]
[tex]2=(1+ 0.055)^t [/tex]
[tex]2=(1.055)^t [/tex]
take the ln of both sides
[tex]ln2=t(ln(1.055)) [/tex]
divide both sides by ln1.055
[tex] \frac{ln2}{ln1.055}=t [/tex]
use calculator to aproximate
12.9462=t
about 12.9 years
