Answer:
[tex]T = (m + \frac{M}{L}y)g[/tex]
[tex]v = \sqrt{(\frac{mL}{M} + y)g}[/tex]
Part b)
[tex]t = 2(\frac{\sqrt{(\frac{mL}{M} + L)g}}{g} - \frac{\sqrt{(\frac{mL}{M})g}}{g})[/tex]
Explanation:
Part a)
tension in the wire at any distance "y" from the bottom end of the wire is due to the weight of the suspended part of the wire given by the equation
[tex]T = (m + \frac{M}{L}y)g[/tex]
So here we will have speed of the wave is given as
[tex]v = \sqrt{\frac{T}{M/L}}[/tex]
now we have
[tex]v = \sqrt{\frac{(m + \frac{M}{L}y)g}{M/L}}[/tex]
[tex]v = \sqrt{(\frac{mL}{M} + y)g}[/tex]
Part b)
now the time taken by the wave to reach the top is given as
[tex]t = \int \frac{dy}{v} [/tex]
[tex]t = \int_0^L \frac{dy}{\sqrt{(\frac{mL}{M} + y)g}}[/tex]
[tex]t = 2(\frac{\sqrt{(\frac{mL}{M} + L)g}}{g} - \frac{\sqrt{(\frac{mL}{M})g}}{g})[/tex]
