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NotACrook
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Homework Statement
A spring has mass Ms=120g and, if unstreched, length l=65cm. A boy attaches a point mass m=500g to one end of the spring. He holds the spring at the other end and spins it horizontally around his head, such that the point mass moves with speed v=12ms-1 and the spring is streched by 4.5cm. The effect of gravity can be neglected.
A: Determine the force constant of the spring and list all forces that act upon the point mass.
B: Find the total energy of the spring and point mass.
Homework Equations
arad=V2/r
F=kx
The Attempt at a Solution
Forces on point mass:
Tension from spring.
I want to say centrifugal force pointing outwards, but I have a feeling I remember being told not to call it that?
Gravity is told to be neglected, its a point mass and I have no info on friction so assume that can be neglected.
Attempt at force on spring:
Moving at constant velocity, so no linear acceleration. arad=v2/r. For the body as a whole, I'd think the r used here would be for the center of mass, which would be (rcm, spring*Mspring+rpoint*Mpoint)/Mtotal, which is 62.8cm from the middle. (Note: Rounded here, stored on calc for precise value in later calculations).
(1/Mmass)*Fspring=0.5*0.045*k=v2/rcm
k=(v2/rcm)/(lextention/Mmass)
V=12, rcm=0.628, lext=0.045, mmass=0.5
This gives over 2500 as the answer, which is obviously extremely wrong, and I'm really not sure what to do.For part B: Etot=Klinear+Krot+Uspring
=0.5*Mtotal*12^2+0.5*I*ω2+0.5*k*lextension^2
EDIT: Although thinking through this a bit more, I'm not sure I need both the Kinetic Energy terms...
If that is correct:
Not entirely sure on the moment of inertia - I know it's integrate of r^2 dm, but would I treat it as a line with an extremely high density at one end, sum the I of the spring with something?
So, I'm stuck. Anyone able to point me in the right direction?
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