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A periodic variable's amplitude is a measure of how much it changes in a single period (such as time or spatial period). A non-periodic signal's amplitude is its magnitude in comparison to a reference value. In a variety of ways, the amount of the differences between the variable's extreme values is utilised to define amplitude.

Write the equation for the amplitude$A$ .

$A=\frac{{{蝇}_F}^2}{\sqrt{{\left({蝇}_F^2-{蝇}_D^2\right)}^2+{\left(\frac{c}{m}{蝇}_D\right)}^2}}D$

When$c鈮�0$ then ${\left(\frac{c}{m}{蝇}_D\right)}^2鈮�0$ and when${蝇}_F鈮�{蝇}_D$ then ${\left({蝇}_F^2-{蝇}_D\right)}^2鈮�0$.

By using the approximation $c鈮�0$ and ${蝇}_F鈮�{蝇}_D$ the result is .

$\sqrt{{\left({蝇}_F^2-{{蝇}_D}^2\right)}^2+{\left(\frac{c}{m}{蝇}_D\right)}^2}鈮�0$

On using this result in the equation of amplitude the value of amplitude is$A鈫�鈭�$ .

Write the phase shift equation.

$\cos \left(蠒\right)=\frac{\left({蝇}_F^2-{蝇}_D^2\right)}{\sqrt{{\left({蝇}_F^2-{蝇}_D^2\right)}^2+{\left({\displaystyle \frac{c}{m}}{蝇}_D\right)}^2}}$

When${蝇}_D<<{蝇}_F$ then ${\left({蝇}_F^2-{蝇}_D^2\right)}^2鈮�{蝇}_F^2$ and ${蝇}_F^2-{蝇}_D^2鈮�{蝇}_F^2$.

By using the approximation${蝇}_D<<{蝇}_F$ the result is .

role="math" localid="1668513686939" $\sqrt{{\left({蝇}_F^2-{蝇}_D^2\right)}^2+{\left(\frac{c}{m}{蝇}_D\right)}^2}鈮�\sqrt{{蝇}_F^4+{\left(\frac{c}{m}\right)}^2{蝇}_D^2鈮�{蝇}_F^2}$

use these results into the equation of phase shift.

$\begin{array}{rcl}\cos \left(蠒\right)& 鈮�& \frac{{蝇}_F^2}{{蝇}_{F^2}^2}\\ \cos \left(蠒\right)& 鈮�& 1\\ 蠒& 鈮�& 0掳\end{array}$

Write the phase shift equation.

$\cos \left(蠒\right)=\frac{\left({蝇}_F^2-{蝇}_D^2\right)}{\sqrt{{\left({蝇}_F^2-{蝇}_D^2\right)}^2+{\left({\displaystyle \frac{c}{m}}{蝇}_D\right)}^2}}$

When${蝇}_D>>{蝇}_F$ then $\sqrt{{\left({蝇}_F^2-{蝇}_D^2\right)}^2+{\left(\frac{c}{m}{蝇}_D\right)}^2}鈮�\sqrt{{蝇}_D^4+{\left(\frac{c}{m}{蝇}_D\right)}^2},\sqrt{{蝇}_D^4+{\left(\frac{c}{m}{蝇}_D\right)}^2}鈮�{蝇}_D^2$ , and ${蝇}_F^2-{蝇}_D^2鈮�-{蝇}_D^2$.

use these results into the equation of phase shift.

$\begin{array}{rcl}\cos \left(蠒\right)& 鈮�& -\frac{{蝇}_D^2}{{蝇}_D^2}\\ & 鈮�& -1\\ 蠒& 鈮�& 180掳\end{array}$

In the resonance case,${蝇}_F={蝇}_D$the result is ${蝇}_F^2-{蝇}_D^2=0$.

Use this into the equation of phase shift.

$\begin{array}{rcl}\cos \left(蠒\right)& =& 0\\ 蠒& =& 90掳\end{array}$

Therefore, the below results are concluded:

• For a low viscous friction coefficient and${蝇}_F鈮�{蝇}_D$ , the amplitude is$A鈫�鈭�$ .
• For${蝇}_D<<{蝇}_F$ , the phase shift is$蠒=0掳$.
• For ${蝇}_D>>{蝇}_F$, the phase shift is $蠒=180掳$.
• For${蝇}_D={蝇}_F$ , the phase shift is$蠒=90掳$ .

The amplitude is given by $A=\frac{{蝇}_F^2}{\sqrt{{\left({蝇}_F^2-{蝇}_D^2\right)}^2+{\left({\displaystyle \frac{c}{m}}{蝇}_D\right)}^2}}D$ when the amplitude drops to $\frac{1}{\sqrt{2}}$of the maximum value, solve the denominator.

$\begin{array}{rcl}{\left({蝇}_F^2-{蝇}_D^2\right)}^2& =& {\left(\frac{c}{m}{蝇}_D\right)}^2\\ \left|{蝇}_F^2-{蝇}_D^2\right|& =& \frac{c}{m}{蝇}_D\end{array}$

The left part of the equation can be written as${蝇}_F^2-{蝇}_D^2=\left({蝇}_F-{蝇}_D\right)脳\left({蝇}_F+{蝇}_D\right)$ .

Near resonance,${蝇}_F+{蝇}_D鈮�2{蝇}_F鈮�2{蝇}_D$ use this into the above equation.

$\begin{array}{rcl}\left({蝇}_F-{蝇}_D\right)脳2{蝇}_D& =& \frac{c}{m}{蝇}_D\\ \left({蝇}_F-{蝇}_D\right)& =& \frac{c}{2m}\end{array}$

When the expression above is valid than the amplitude will be reduced by$\frac{1}{\sqrt{2}}$.

Therefore, when the expression$\left({蝇}_F-{蝇}_D\right)=\frac{c}{2m}$ is valid than the amplitude will be reduced by$\frac{1}{\sqrt{2}}$ but, on the other hand$\left|{蝇}_F^2-{蝇}_D^2\right|=\frac{c}{2m}{蝇}_D$ must also be true.