When a mass of 4 kilograms is attached to a spring whose constant is 64 N/m, it comes to rest in the equilibrium position. Starting at t = 0, a force equal to f(t) = 68e-2t cos(4t) is applied to the system. Find the equation of motion in the absence of damping. x(t) = m

When a mass of 4 kilograms is attached to a spring whose constant is 64 N/m, it comes to rest in the equilibrium position. Starting at t = 0, a force equal to f(t) = 68e-2t cos(4t) is applied to the system. Find the equation of motion in the absence of damping. x(t) = m

Linear Algebra: A Modern Introduction

4th Edition

ISBN:9781285463247

Author:David Poole

Publisher:David Poole

Chapter6: Vector Spaces

Section6.7: Applications

Problem 18EQ

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When a mass of 4 kilograms is attached to a spring whose constant is 64 N/m, it comes to rest in the equilibrium position. Starting at t = 0, a force equal to f(t) = 68e-2t cos(4t) is applied to the system.
Find the equation of motion in the absence of damping.
x(t) =
m

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