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Logarithmsin a research laboratory, biologist studied the growth of a culture of bacteria. From the data collected hourly, they concluded that the culture increases in number according to the formula N(t)=45(1.85)t where N is the number of bacteria present and t is the number of hours since the experiment beganUse the model to calculatea) the number of bacteria at the start of the experiment.b) number of bacteria present after 4 hours, giving your answer to the nearest whole number of bacteria.c) the time it would take for the number of bacteria to reach 1000.

Sagot :

Growth of Culture of bacteria increases in number according to the formula :

[tex]N(t)=45(1.85)^t[/tex]

N = Number of bacteria present

t = number of hours from the initial state.

a) number of bacteria at the start of the experiment.

In the begining when the expreiment start, the time is zero

t = 0

Substitute t = 0 in the growth expression of bacteria

[tex]\begin{gathered} N(t)=45(1.85)^t \\ N(0)=45(1.85)^0 \\ as\colon a^0=1 \\ N(0)=45(1) \\ N(0)=45 \end{gathered}[/tex]

When the experiment start, number of bacteria is 45

b) number of bacteria present after 4 hours, giving your answer to the nearest whole number of bacteria.

After fours hours, i.e. t = 4

Substitute t = 4 in the growth expression of bacteria

[tex]\begin{gathered} N(t)=45(1.85)^t \\ N(4)=45(1.85)^4 \\ N(4)=45\times11.7135 \\ N(4)=527.1077 \\ N(4)=527 \end{gathered}[/tex]

Number of bacteria after 4 hours are 527

c) the time it would take for the number of bacteria to reach 1000.​

Here, we have number of bacteria 1000 i.e. N = 1000

Substitute the value and solve for t:

[tex]\begin{gathered} N(t)=45(1.85)^t \\ 1000=45(1.85)^t \\ \frac{1000}{45}=1.85^t \\ 1.85^t=\frac{200}{9} \\ 1.85^t=22.22 \\ \text{Taking log on both side: } \\ t\ln (1.85)=\ln (22.22) \\ t=\frac{\ln (22.22)}{\ln (1.85)} \\ t=5.0409 \\ t=5 \end{gathered}[/tex]

It will take 5 years to reach upto 1000 bacteria

Answer:

a) Number of bacteria at the start of experiment 45

b) Number of bacteria after 4 hours 527

c) It would take 5 years to reach upto 1000 bacteria

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