Respuesta :
Answer:
Explanation:
When the central shaft rotates , the seat along with passenger also rotates . Their rotation requires a centripetal force of mw²R where m is mass of the passenger and w is the angular velocity and R is radius of the circle in which the passenger rotates.
This force is provided by a component of T , the tension in the rope from which the passenger hangs . If θ be the angle the rope makes with horizontal ,
T cos θ will provide the centripetal force . So
Tcosθ = mw²R
Tsinθ component will balance the weight .
Tsinθ = mg
Dividing the two equation
Tanθ = [tex]\frac{g}{\omega^2R}[/tex]
Hence for a given w , θ depends upon g or weight .
Answer:
In the expression the mass is cancelled out and angle is independent of the weight of the person
Explanation:
Let the swing is rotating with constant angular speed
now due to rotation of swing the string will make some angle with the vertical
now we have
[tex]Tcos\theta = mg[/tex]
[tex]T sin\theta = m\omega^2 r[/tex]
now we will have
[tex]tan\theta = \frac{\omega^2 r}{g}[/tex]
here we know that
[tex]r = R + L sin\theta[/tex]
where
R = 3.00 m
L = 5.00 m
Now as we can see the above expression the mass is cancelled out and angle is independent of the weight of the person
