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32 votes
Bt= 8500 *(8/27)^t/3After a special medicine is introduced into a Petri dish full of bacteria, the number of bacteria remaining in the dish decreases rapidly.

User Noel Walters
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2 Answers

9 votes
9 votes

Answer:

Every 1.71 seconds, the bacteria loses
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Explanation:

Given


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Required [Missing from the question]

Every __ seconds, the bacteria loses
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First, we model the function from t/3 to t.


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Apply law of indices


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Evaluate each exponent


image --- This gives the number of bacteria at time t

At time 0, we have:


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Let r be the time 1/2 disappears.

When 1/2 disappears, we have:


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So, we have:


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Substitute r for t


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Substitute
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Divide both sides by 8500


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Take log of both sides


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Apply law of logarithm


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Make r the subject


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Hence, it reduces by 1/2 after every 1.71 seconds

User Timothy Winters
by
2.6k points
10 votes
10 votes

Answer:

Every second, the number of bacteria is multiplied by a factor of 0.67

Explanation:

Let's rewrite the base so that the exponent is just t.

(8/27)^t/3=((8/27)^1/3)t=(2/3)^t

Therefore, we can rewrite the modeling function as follows.

B(t)=8500⋅(2/3)t

According to this model, the number of bacteria is multiplied by 2/3 every second. Rounding this to two decimal places, we get 2/3 ≈0.67

User Mcwitt
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3.1k points