- #1
Rob Hal
- 13
- 0
Hi,
I'm looking for some advice on whether or not I'm doing a problem correctly.
The problem is:
A particle of mass m rests on a smooth plane. (the particle starts at r) The plane is raised to an inclination [tex]\theta[/tex], at a constant rate [tex]\alpha[/tex], with [tex]\theta = 0[/tex] at t=0, causing the particle to move down the plane.
So, I'm taking the x to be the distance the particle travels down the slope.
I come up with the following as the Lagrangian:
[tex]L = \frac{1}{2} m\dot{x}^2 - mg(r-x)sin\theta[/tex]
I'm not sure if this is correct.
I would then get the equations of motion to be [tex]mgsin\theta - m\ddot{x}=0[/tex] and [tex]-mgsin(r-x)cos\theta=0[/tex].
I'm looking for some advice on whether or not I'm doing a problem correctly.
The problem is:
A particle of mass m rests on a smooth plane. (the particle starts at r) The plane is raised to an inclination [tex]\theta[/tex], at a constant rate [tex]\alpha[/tex], with [tex]\theta = 0[/tex] at t=0, causing the particle to move down the plane.
So, I'm taking the x to be the distance the particle travels down the slope.
I come up with the following as the Lagrangian:
[tex]L = \frac{1}{2} m\dot{x}^2 - mg(r-x)sin\theta[/tex]
I'm not sure if this is correct.
I would then get the equations of motion to be [tex]mgsin\theta - m\ddot{x}=0[/tex] and [tex]-mgsin(r-x)cos\theta=0[/tex].
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