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Eiver · Answer 1 · 2023-08-16T03:43:41+0000

Doubling time is the amount of time it takes for a given quantity to double in size or value at a constant growth rate. This means that the ratio of the final and initial values of the exponential function will be equal to 2:

$\begin{gathered} \text{For} \\ y=a(b)^x^{} \\ We\text{ have} \\ (y)/(a)=2 \end{gathered}$

The function is given to be:

$y=At^(\rho)$

For the doubling time, we have that:

If we divide both sides of the equation by A, we have:

$(y)/(A)=t^(\rho)$

Substituting for the ratio, we have:

$2=t^(\rho)$

Finding the natural logarithm of both sides, we have:

$\ln 2=\ln t^(\rho)$

Applying the law of exponents given to be:

$\ln a^b=b\ln a$

we have that:

$\ln 2=\rho\ln t$

Divide both sides by ln(t), we have:

$\rho=(\ln2)/(\ln t)$

Since we have:

We can have the time to be:

$\begin{gathered} \rho=(\ln ((y)/(A)))/(\ln t) \\ \text{Given} \\ (y)/(A)=2 \end{gathered}$

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