Math 22 Exponential Growth and Decay

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Exponential Growth and Decay

 If ${\displaystyle y}$ is a positive quantity whose rate of change with respect to time
 is proportional to the quantity present at any time ${\displaystyle t}$, then  is of the form
 ${\displaystyle y=Ce^{kt}}$
 where ${\displaystyle C}$ is the initial value and ${\displaystyle k}$ is the constant of proportionality. 
 Exponential growth is indicated by ${\displaystyle k>0}$ and exponential decay by ${\displaystyle k<0}$.

Guidelines for Modeling Exponential Growth and Decay

 1. Use the given information to write two sets of conditions involving ${\displaystyle y}$ and ${\displaystyle t}$
 2. Substitute the given conditions into the model ${\displaystyle y=Ce^{kt}}$ and 
 use the results to solve for the constants ${\displaystyle C}$ and ${\displaystyle k}$.
 3. Use the model ${\displaystyle y=Ce^{kt}}$ to answer the question.

Exercises

1) The number of a certain type of bacteria increases continuously at a rate proportional to the number present. There are 150 bacteria at a given time and 450 bacteria 5 hours later. How many bacteria will there be 10 hours after the initial time?

Solution:
At the initial time: ${\displaystyle y_{0}=Ce^{kt_{0}}}$, so ${\displaystyle 150=Ce^{kt_{0}}}$
After 5 hours: ${\displaystyle y_{1}=Ce^{k(t_{0}+5)}}$, so ${\displaystyle 450=Ce^{k(t_{0}+5)}=Ce^{kt_{0}+5k}=Ce^{kt_{0}}e^{5k}}$
Take the second equation and divided it by the first equation, we get:
${\displaystyle {\frac {450}{150}}={\frac {Ce^{kt_{0}}e^{5k}}{Ce^{k(t_{0}+5)}}}}$
${\displaystyle 3=e^{5k}}$
Now, consider the equation after 10 hours: ${\displaystyle y_{2}=Ce^{k(t_{0}+10)}=Ce^{k[(t_{0}+5)+5]}=Ce^{k(t_{0}+5)}e^{kt}=450.3=1350}$

b) ${\displaystyle f(x)=\ln(x^{8})}$

Solution:
Solution 1: ${\displaystyle f'(x)={\frac {1}{x^{8}}}(x^{8})'={\frac {8x^{7}}{x^{8}}}={\frac {8}{x}}}$
Solution 2: ${\displaystyle f(x)=\ln(x^{8})=8\ln x}$, so ${\displaystyle f'(x)=8{\frac {1}{x}}={\frac {8}{x}}}$

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