Tag: physics

Potential energy of a string depends only on how much the string is stretchable and not on the wave passing through it. A wave passing through it can provide some energy, thereby stretching it

In the problem given, the string is already stretched by keeping it between two supports. Thus, potential energy is not zero

Potential energy of a string depends on the extent of stretching.

The correct option is (c)

Given that,

Wave number of energy for hydrogen $=20497\,c{{m}^{-1}}$

Now, for hydrogen

$\dfrac{1}{{{\lambda } _{H}}}=R\left( \dfrac{1}{{{2}^{2}}}-\dfrac{1}{{{4}^{2}}} \right)=20497$

Now, for helium

  $ \dfrac{1}{\lambda }=R\left( \dfrac{1}{{{2}^{2}}}-\dfrac{1}{{{4}^{2}}} \right)\times {{2}^{2}} $

 $ \dfrac{1}{{{\lambda } _{He}}}=20497\times 4 $

 $ \dfrac{1}{{{\lambda } _{He}}}=81988\,c{{m}^{-1}} $

Hence, the wave number of energy for helium is $81988\ cm^{-1}$

As $K _1 = \dfrac{\pi}{L}$ and $K _2=\dfrac{2\pi}{L}$ and $\omega _2 = 2\omega _1 $ , 
Wave velocity $v=\dfrac{\omega}{K}$ is same for both the cases as well as amplitudes in both the cases . 
Hence , Energy $\propto f^2 \rightarrow $ Energy $\propto \omega ^2  $
$E _2 = 4 E _1 $

Energy transmitted through the string $E  \propto  \nu^2  A^2$

 Here, we will take ,

At the antinode, the tension and hence the elongation in the string in minimum and hence minimum potential energy. While at the nodes, tension is maximum and hence maximum potential energy. All particles perform SHM with same time period and hence since the phase differecnce between any two particles is constant, they cross mean position simultaneously. 

Whenever any wave travels through a material medium, the particles of the medium start vibrating about their mean positions.

Energy density of wave is given by
$u=2\pi^2n^2pA^2$
or $u \propto A^2$   (As n and p are constant)
$\therefore \dfrac{u _1}{u _2}=\dfrac{A _1^2}{A _2^2}=\dfrac{5^2}{2^2}$
So, $u _1:u _2=25:4$