A spring with spring constant 4 N/m is attached to a 1kg mass and a dashpot...

When a mass of 4 kilograms is attached to a spring whose constant is 64 N/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) = 80e−4t cos 4t is applied to the system. Find the equation of motion in the absence of damping.

When a mass of 3 kilograms is attached to a spring whose constant is 48 N/m,...

When a mass of 3 kilograms is attached to a spring whose constant is 48 N/m, it comes to rest in the equilibrium position. Starting at t = 0, a force equal to f(t) = 51e−2t cos 4t  is applied to the system. Find the equation of motion in the absence of damping. x(t)= ?? m

a 3 kg mass is attached to a spring whose constant is 147 N/m, comes to...

a 3 kg mass is attached to a spring whose constant is 147 N/m, comes to rest in the equilibrium position. Starting at  t = 0, a force equal to  f (t)  =  12e−5t cos 2t  is applied to the system. In the absence of damping, (a) find the position of the mass when  t = π. (b) what is the amplitude of vibrations after a very long time?

when a mass of 2 kg is attached to a spring whose constant is 32 N/m,...

when a mass of 2 kg is attached to a spring whose constant is 32 N/m, it come to rest in the equilibrium position. at a starting time t=0, an external force of y=80e^(-4t)*cos(4t) is applied to the system. find the motion equation in the absence of damping.

Mass m=1 is attached to a spring with constant k = 4 and dashpot constant c=2....

Mass m=1 is attached to a spring with constant k = 4 and dashpot constant c=2. Suppose the spring is at the equilibrium position resting at time t=0. At t=0 the mass is struck with a hammer with an impulse of 1. Determine the motion of the mass over time (compute for x(t)).

A body of mass equal to 4 kg is attached to a spring of constant k...

A body of mass equal to 4 kg is attached to a spring of constant k = 64 N / m. If an external force F (t) = 3/2 cos 4t is applied to the system, determine the position and speed of the body at all times; suppose that the mass was in position x (0) = 0.3 m and, at rest, at time t = 0 s

A mass of 4 Kg attached to a spring whose constant is 20 N / m...

A mass of 4 Kg attached to a spring whose constant is 20 N / m is in equilibrium position. From t = 0 an external force, f (t) = et sin t, is applied to the system. Find the equation of motion if the mass moves in a medium that offers a resistance numerically equal to 8 times the instantaneous velocity. Draw the graph of the equation of movement in the interval.

A 1/4​-kg mass is attached to a spring with stiffness 52 N/m. The damping constant for...

A 1/4​-kg mass is attached to a spring with stiffness 52 N/m. The damping constant for the system is 6 ​N-sec/m. If the mass is moved 3/4 m to the left of equilibrium and given an initial rightward velocity of 1 ​m/sec, determine the equation of motion of the mass y(t) = and give its damping​ factor, quasiperiod, and quasifrequency.

A spring-mass-dashpot system has a mass of 1 kg and its damping constant is 0.2 N−Sec...

A spring-mass-dashpot system has a mass of 1 kg and its damping constant is 0.2 N−Sec m . This mass can stretch the spring (without the dashpot) 9.8 cm. If the mass is pushed downward from its equilibrium position with a velocity of 1 m/sec, when will it attain its maximum displacement below its equilibrium?

A 1-kilogram mass is attached to a spring whose constant is 16 N / m, and...

A 1-kilogram mass is attached to a spring whose constant is 16 N / m, and then the entire system is immersed in a liquid that imparts a damping force equal to 10 times the instantaneous speed. Determine the equations of motion if the mass is initially released from a point 1 meter below the equilibrium position. differential equations