Amplitude Change in Oscillations with Varying Spring Constants

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In the discussion, a mass attached to a spring with spring constant k oscillates with an amplitude A when given an initial velocity. When the spring is replaced with one of constant 2k, the same initial velocity results in a new amplitude A'. The relevant energy equation is used to relate the two amplitudes, leading to the conclusion that A^2 = 2(A')^2. By isolating A', it is determined that A' equals 1/√2 A. The solution confirms the relationship between the amplitudes when the spring constant is changed.
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Homework Statement


A mass is attached to the wall by a spring of constant k. When the spring is at its natural length, the mass is given a certain initial velocity, resulting in oscillations of amplitude A. If the spring is replaced by a spring of constant 2k, and the mass is given the same initial velocity, what is the amplitude of the resulting oscillation?

Homework Equations


E = 1/2mv^2 + 1/2kx^2 = 1/2kA^2

The Attempt at a Solution


I am not quite sure what equation to really apply here, or how to approach the problem to find the amplitude. The answer is 1/(√2).
 
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The velocity is given when the spring is relaxed. So you get the amplitude from the equation 1/2mv^2 =1/2kA^2

Double the spring constant: k'=2k. Now you have the equation for the new amplitude A'. 1/2mv^2 =1/2 k' A'^2 . V is the same, so 1/2kA^2= 1/2 k' A'^2. How are A and A' related?


ehild
 
well, by substituting k' = 2k,
you end up with A^2 = 2 (A')^2
 
Isolate A'.

ehild
 
You end up with 1/√2 A, which is the correct answer.
Thank you very much for the help!
 

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