Answer:
[tex]sin\theta - \mu_k cos\theta = \frac{m}{M}[/tex]
[tex]sin\theta - \mu_k cos\theta = 1[/tex]
Explanation:
Force of friction on M mass so that it will move down the inclined plane is given as
[tex]F_f = \mu Mgcos\theta[/tex]
now if it is moving down the inclined plane at constant speed
so we will have
[tex]Mgsin\theta - T - \mu mgcos\theta = 0[/tex]
on other side the mass "m" will go up at constant speed
so we have
[tex]T - mg = 0[/tex]
so we have
[tex]Mgsin\theta = \mu Mgcos\theta + mg[/tex]
so we have
[tex]sin\theta - \mu_k cos\theta = \frac{m}{M}[/tex]
for special case when m = M
then we have
[tex]sin\theta - \mu_k cos\theta = 1[/tex]
