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Using both cinservation of energy and conservation of momentum, show that the spring constant k is given by k=2mg/H[1+mg/(m+M)H]
I thought that this would go easier if I rewrote the expression for kinetic energy in terms of momentum, but I cant exactly get around figuring the change in momentum to build an equation. would (m1v1/2) be correct?
Hootenanny
Mar12-06, 08:48 AM
Do you have defintions for your symbols?
as in initial mass and initial velocity?
topsquark
Mar12-06, 09:08 AM
as in initial mass and initial velocity?
"Initial mass?" :surprised: Perhaps you'd better tell us what the question is.
-Dan
Hootenanny
Mar12-06, 09:12 AM
"Initial mass?" :surprised: Perhaps you'd better tell us what the question is.
-Dan
Hmm, a mass spring system oscillating at close to the speed of light. I've never done relativistic effects with SHM before...could be interesting...:surprised
It seems I have taken a wrong approach. I need to show that the spring constant k can be given by 2mg/H[1+mg/(m+M)H] using thr conservation of energy and momentum.
Hootenanny
Mar12-06, 09:25 AM
Does the question not give you any definitions for the symbols used?
I worked it out. No matter
topsquark
Mar13-06, 06:39 AM
I worked it out. No matter
:mad: Then at least have the decency to tell us! You've got ME curious, anyway.
-Dan
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