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Noelbk · Answer 1 · 2023-05-11T16:34:53+0000

The formula for calculating half-life is as shown below

$N(t)=N_0((1)/(2))^{(t)/(t2)}$

Where:

$\begin{gathered} N(t)=quantity\text{ of the substance remaining} \\ N_0=initial\text{ quantity of the substance} \\ t=time\text{ elapsed} \\ t_{(1)/(2)}=half\text{ life of the substance} \end{gathered}$

Given that

$\begin{gathered} N(t)=\text{?} \\ N_0=30\text{milligrams} \\ t=12\text{hours} \\ t_{(1)/(2)}=36\text{hours} \end{gathered}$

So,

$\begin{gathered} N(t)=30((1)/(2))^{(12)/(36)} \\ N(t)=30((1)/(2))^{(1)/(3)} \\ N(t)=30*0.7937 \\ N(t)=23.811 \\ N(t)=23.8(\text{nearest tenth)} \end{gathered}$

Hence, there is approximately 23.8 milligrams of Valium in the patient's blood at noon on the first day.

B. To estimate when the Valium concentration will reach 20% of its initial level, it is observed that

$\begin{gathered} N(t)=20\text{ \% of }N_0,N_0=30 \\ \\ N(t)=(20)/(100)*30 \\ N(t)=0.2*30=6 \end{gathered}$

Let us substitute into the formula to get t as shown below:

$\begin{gathered} N(t)=N_0((1)/(2))^{(t)/(36)} \\ 6=30_{}(0.5)^{(t)/(36)} \\ (6)/(30)=(0.5)^{(t)/(36)} \\ 0.2=0.5^{(t)/(36)} \\ ^{} \end{gathered}$
$\begin{gathered} In0.2=(t)/(36)In0.5 \\ t=(36In0.2)/(In0.5) \\ t=(36*-1.6094)/(-0.6931) \\ t=83.5894hours \end{gathered}$

Hence, the valium concentration will reach 205 of its initial level at 83.6 hours

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