Note: The percent sign is already taken care of.
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Explanation:
The continuously compounded interest formula is
[tex]A = Pe^{rt}\\\\[/tex]
where,
Since the unknown variable r is in the exponent, we'll need logs to solve it. A handy phrase is "if the exponent is in the trees, log it down to find it". By "log it down" I mean in terms of lumber, and not a journal.
We could use any base logarithm, but it's handy to use the special base 'e' log. This is the natural logarithm abbreviated as Ln.
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Solving for r involves these steps
[tex]A = Pe^{rt}\\\\1431 = 1200*e^{r*6}\\\\e^{6r} = 1431/1200\\\\e^{6r} = 1.1925\\\\6r = \text{Ln}(1.1925)\\\\r = \frac{1}{6}*\text{Ln}(1.1925)\\\\r \approx 0.02934199063006\\\\r \approx 0.0293\\\\[/tex]
Move the decimal over 2 spots to the right to convert 0.0293 to 2.93%
This is the same as multiplying by 100.
