The period is given by

[latex]\begin{align}\frac{2\pi }{\omega }&=\frac{2\pi }{160\pi } \\ &=\frac{1}{80} \end{align}[/latex]

In a blood pressure function, frequency represents the number of heart beats per minute. Frequency is the reciprocal of period and is given by

[latex]\begin{align}\frac{\omega }{2\pi }&=\frac{160\pi }{2\pi }\\ &=80\end{align}[/latex]

The blood pressure reading on the graph is [latex]\frac{120}{80}\text{ }\left(\frac{\text{maximum}}{\text{minimum}}\right)[/latex].

Analysis of the Solution

Blood pressure of [latex]\frac{120}{80}[/latex] is considered to be normal. The top number is the maximum or systolic reading, which measures the pressure in the arteries when the heart contracts. The bottom number is the minimum or diastolic reading, which measures the pressure in the arteries as the heart relaxes between beats, refilling with blood. Thus, normal blood pressure can be modeled by a periodic function with a maximum of 120 and a minimum of 80.

The amplitude begins at 5 in. and deceases 30% each second. Because the spring is initially compressed, we will write A as a negative value. We can write the amplitude portion of the function as

[latex]A\left(t\right)=5{\left(1 - 0.30\right)}^{t}=[/latex]

[latex]A\left(t\right)=5{\left(0.70\right)}^{t}=[/latex]

We put [latex]{\left(0.70\right)}^{t}[/latex] in the form [latex]{e}^{ct}[/latex] as follows:

[latex]\begin{gathered}0.7={e}^{c} \\ c=\mathrm{ln}(0.7) \\ c=-0.357 \end{gathered}[/latex]

Now let’s address the period. The spring cycles through its positions every 3 seconds, this is the period, and we can use the formula to find omega.

[latex]\begin{gathered} 3=\frac{2\pi }{\omega }\\ \omega =\frac{2\pi }{3}\end{gathered}[/latex]

The natural length of 10 inches is the midline. We will use the cosine function, since the spring starts out at its maximum displacement. This portion of the equation is represented as

[latex]y=\cos \left(\frac{2\pi }{3}t\right)+10[/latex]

Finally, we put both functions together. Our the model for the position of the spring at [latex]t[/latex] seconds is given as

[latex]y=-5{e}^{-0.357t}\cos \left(\frac{2\pi }{3}t\right)+10[/latex]

The displacement factor represents the amplitude and is determined by the coefficient [latex]a{e}^{-ct}[/latex] in the model for damped harmonic motion. The damping constant is included in the term [latex]{e}^{-ct}[/latex]. It is known that after 3 seconds, the local maximum measures one-half of its original value. Therefore, we have the equation

[latex]a{e}^{-c\left(t+3\right)}=\frac{1}{2}a{e}^{-ct}[/latex]

Use algebra and the laws of exponents to solve for [latex]c[/latex].

[latex]\begin{align} a{e}^{-c\left(t+3\right)}&=\frac{1}{2}a{e}^{-ct} \\ {e}^{-ct}\cdot {e}^{-3c}&=\frac{1}{2}{e}^{-ct} && \text{Divide out }a.\\ {e}^{-3c}&=\frac{1}{2}&& \text{Divide out }{e}^{-ct}. \\ {e}^{3c}&=2 && \text{Take reciprocals}. \end{align}[/latex]

Then use the laws of logarithms.

[latex]\begin{align}{e}^{3c}&=2 \\ 3c&=\mathrm{ln}2 \\ c&=\frac{\mathrm{ln}2}{3} \end{align}[/latex]

The damping constant is [latex]\frac{\mathrm{ln}2}{3}[/latex].