1 Answer

Bdiamante · Answer 1 · 2023-12-15T22:49:26+0000

The model function is

where t is the time in days and P(t) is the population along the time.

Question a.

Initially, at t=0, the population is

$\begin{gathered} P(0)=12*3^0 \\ P(0)=12*1 \\ P(0)=12 \end{gathered}$

that is, there was 12 fruits.

Question b.

After t=6, we have

$\begin{gathered} P(6)=12*3^(0.498\cdot6) \\ P(6)=12*3^(2.988) \\ P(6)=12*26.646 \\ P(6)=319.76 \end{gathered}$

that is, by rounding up, there will be 320 fruits.

Question c.

In this case, we have P(t)=8 000, then we have

If we move 12 to the left hand side, we get

$\begin{gathered} (8000)/(12)=3^(0.498t) \\ 666.666=3^(0.498t) \end{gathered}$

By applying natural logarithms on both sides, we obtain

$\log 666.666=0.498t\log 3$

then, t is equal to

$t=\frac{\log \text{ 666.666}}{\text{0.498log3}}$

therefore, t is

$\begin{gathered} t=(6.502)/(0.498(1.098)) \\ t=(6.502)/(0.547) \end{gathered}$

and t is equal to 11.88 days. By rounding up, t=12 days.

Question d.

The number of fruits

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