Suppose a spring with spring constant 8 N/m is horizontal and has one end attached to a wall and the other end attached to a 3 kg mass. Suppose that the friction of the mass with the floor (i.e., the damping constant) is 1 N s/m. a. Set up a differential equation that describes this system. Let a denote the displacement, in meters, of the mass from its equilibrium position, and give your answer in terms of x, x',". Assume that positive displacement means the mass is farther from the wall than when the system is at equilibrium. help (equations) b. Find the general solution to your differential equation from the previous part. Use c₁ and c₂ to denote arbitrary constants. Use t for independent variable to represent the time elapsed in seconds. Enter c₁ as c1 and c₂ as c2. Your answer should be an equation of the form x = .... help (equations) c. Is this system under damped, over damped, or critically damped? ? damped. N s/m help (numbers) Enter a value for the damping constant that would make the system critically

Suppose a spring with spring constant 8 N/m is horizontal and has one end attached to a wall and the other end attached to a 3 kg mass. Suppose that the friction of the mass with the floor (i.e., the damping constant) is 1 N s/m. a. Set up a differential equation that describes this system. Let a denote the displacement, in meters, of the mass from its equilibrium position, and give your answer in terms of x, x',". Assume that positive displacement means the mass is farther from the wall than when the system is at equilibrium. help (equations) b. Find the general solution to your differential equation from the previous part. Use c₁ and c₂ to denote arbitrary constants. Use t for independent variable to represent the time elapsed in seconds. Enter c₁ as c1 and c₂ as c2. Your answer should be an equation of the form x = .... help (equations) c. Is this system under damped, over damped, or critically damped? ? damped. N s/m help (numbers) Enter a value for the damping constant that would make the system critically

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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Question

100%

Suppose a spring with spring constant 8 N/m is horizontal and has one end attached to a wall and the other end attached to a 3 kg mass. Suppose that the friction of the mass
with the floor (i.e., the damping constant) is 1 N s/m.
a. Set up a differential equation that describes this system. Let x denote the displacement, in meters, of the mass from its equilibrium position, and give your answer in terms
of x, x',". Assume that positive displacement means the mass is farther from the wall than when the system is at equilibrium.
help (equations)
b. Find the general solution to your differential equation from the previous part. Use c₁ and c₂ to denote arbitrary constants. Use t for independent variable to represent the
time elapsed in seconds. Enter c₁ as c1 and c₂ as c2. Your answer should be an equation of the form x = ....
help (equations)
c. Is this system under damped, over damped, or critically damped??
damped.
N-s/m help (numbers)
Enter a value for the damping constant that would make the system critically

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