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Blub · Answer 1 · 2023-09-24T01:17:10+0000

The continous exponential growth model has the form:

where Po is the starting population, P is the total population after time t, r is the rate growth, t is the time and e is Euler's number. In our case, r = 0.078, P is 2Po and we need to find the time t. By substituting these values, we get

$2P_0=P_0e^{0.078\text{ t}}$

By moving the initial population Po to the left hand side, we get

$(2P_0)/(P_0)=e^{0.078\text{ t}}$

so we can cancel out Po and get

$2=e^{0.078\text{ t}}$

Now, by applying natural logarithm in both sides, we have

$\ln 2=\ln e^{0.078\text{ t}}$

since natural logarithm is the inverse of the exponential function , we get

$\ln 2=0.078t$

then, by moving the coefficient of t to the left hand side,we obtain

$(\ln 2)/(0.078)=t$

since ln2 is 0.693m, we have

finally, the time is

$t=8.886\text{ hours}$

Then, by rounding to the nearest hundredth, the answer is 8.89 hours

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