Answer: [tex]\frac{ln 2}{ln 1.6 }[/tex], or ~1.4747 [tex]t[/tex]. You didn't specify a unit for t, so if that is days, months, or years, that is the amount of specified time.
Step-by-step explanation:
To calculate how long it will take to double, you need to solve for the variable [tex]t[/tex].
To do this, insert the doubled value of 500 where [tex]A(t)[/tex] currently is.
[tex]1000 = 500(1.6)^{t}[/tex]
Then, simplify the equation by dividing each side by 500.
[tex]2 = (1.6)^{t}[/tex]
Then, take the logarithm of both sides.
㏑2 = ㏑(1.6)^t
Using the rule of logarithms, you can simplify this further:
㏑2 = t * ㏑1.6
Next, you can divide each side by ㏑1.6. This is your final answer.
You can simplify this further by dividing the logarithms.
