Stiffness in mass spring system

Smileyxx

1. The problem statement, all variables and given/known data
What happens to the frequency of oscillation if stiffness increases and why?

2. Relevant equations

?

3. The attempt at a solution
Frequency increases but trying to figure out why.

SHISHKABOB

By stiffness I'm assuming you mean the spring constant, often known as k. It's found in Hooke's law F = -kx where F is the force the spring is exerting and x is the distance from the equilibrium point.

Don't you have some equations relating the frequency of the oscillations of the spring-mass system and the spring constant of the spring?

Smileyxx

Quote by SHISHKABOB

By stiffness I'm assuming you mean the spring constant, often known as k. It's found in Hooke's law F = -kx where F is the force the spring is exerting and x is the distance from the equilibrium point.

Don't you have some equations relating the frequency of the oscillations of the spring-mass system and the spring constant of the spring?

a=[2pie f]^2x. So if k increases f increases which increases a(acceleration) and according to the formula given at the start frequency increases. If that make sense

SHISHKABOB

[itex]a = \left( 2 \pi f\right)^{2x}[/itex] ?

I don't recognize that equation >.> I'm very sorry

do you recognize

[itex]x \left( t \right) = Acos \left( \omega t - \phi \right)[/itex]

where

[itex]\omega = \sqrt{ \frac{k}{m}}[/itex]

is the angular frequency of the oscillation, A is the amplitude and [itex]\phi[/itex] is the phase shift?

Smileyxx

Quote by SHISHKABOB

[itex]a = \left( 2 \pi f\right)^{2x}[/itex] ?

I don't recognize that equation >.> I'm very sorry

do you recognize

[itex]x \left( t \right) = Acos \left( \omega t - \phi \right)[/itex]

where

[itex]\omega = \sqrt{ \frac{k}{m}}[/itex]

is the angular frequency of the oscillation, A is the amplitude and [itex]\phi[/itex] is the phase shift?

Its a = \left( 2 \pi f\right)^{2} x.
I dint knew the 2nd equation but i get it now. stiffness is proportional to frequency according to that.but does the natural frequency of spring increases as well?

SHISHKABOB

Quote by Smileyxx

Its a = \left( 2 \pi f\right)^{2} x.
I dint knew the 2nd equation but i get it now. stiffness is proportional to frequency according to that.but does the natural frequency of spring increases as well?

[itex]a = \left( 2 \pi f\right)^{2}x[/itex] makes much more sense :)

angular frequency is just the natural frequency times 2π

or

[itex] \omega = 2 \pi f[/itex]

Smileyxx

Quote by SHISHKABOB

[itex]a = \left( 2 \pi f\right)^{2}x[/itex] makes much more sense :)

angular frequency is just the natural frequency times 2π

or

[itex] \omega = 2 \pi f[/itex]

Thanks alot

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Smileyxx	Stiffness in mass spring system 1. The problem statement, all variables and given/known data What happens to the frequency of oscillation if stiffness increases and why? 2. Relevant equations ? 3. The attempt at a solution Frequency increases but trying to figure out why.

SHISHKABOB	By stiffness I'm assuming you mean the spring constant, often known as k. It's found in Hooke's law F = -kx where F is the force the spring is exerting and x is the distance from the equilibrium point. Don't you have some equations relating the frequency of the oscillations of the spring-mass system and the spring constant of the spring?

SHISHKABOB	Stiffness in mass spring system [itex]a = \left( 2 \pi f\right)^{2x}[/itex] ? I don't recognize that equation >.> I'm very sorry do you recognize [itex]x \left( t \right) = Acos \left( \omega t - \phi \right)[/itex] where [itex]\omega = \sqrt{ \frac{k}{m}}[/itex] is the angular frequency of the oscillation, A is the amplitude and [itex]\phi[/itex] is the phase shift?