(1 A 50g mass (1kg = 1000g) stretches a spring 20cm (100cm = 1m). Find a damping constant so that the system is critically damped. If the mass is displaced 15cm from its equilibrium position and released from rest, find the position of the mass as a function of time and plot the solution.
(1 A 50g mass (1kg = 1000g) stretches a spring 20cm (100cm = 1m). Find a damping constant so that the system is critically damped. If the mass is displaced 15cm from its equilibrium position and released from rest, find the position of the mass as a function of time and plot the solution.
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![1m). Find
(1) (
A 50g mass (1kg = 1000g) stretches a spring 20cm (100cm
a damping constant so that the system is critically damped. If the mass is displaced
15cm from its equilibrium position and released from rest, find the position of the mass as
a function of time and plot the solution.
=](/v2/_next/image?url=https%3A%2F%2Fcontent.bartleby.com%2Fqna-images%2Fquestion%2F8afdd76b-9f8e-4d06-9032-45f89de6b192%2Fde5c5391-de88-4698-a6bd-4ff7b8833478%2Fhw65ikb_processed.jpeg&w=3840&q=75)
Transcribed Image Text:1m). Find
(1) (
A 50g mass (1kg = 1000g) stretches a spring 20cm (100cm
a damping constant so that the system is critically damped. If the mass is displaced
15cm from its equilibrium position and released from rest, find the position of the mass as
a function of time and plot the solution.
=
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