For what value of m will resonance occur for a simple spring-mass system with spring constant...

Spring system, mass and dampers with k = 4000 N / m, m = 10 kg...

Spring system, mass and dampers with k = 4000 N / m, m = 10 kg and c = 40 Ns / m get a harmonic excitation force F (t) = 200 sin 16t N with initial conditions x0 = 0.05 m and a. Response x due to initial conditions (free vibration) b. Response x due to excitation force (forced vibration) c. The magnitude of the total xtot response (in m or mm) at t = 2.5 seconds

Spring system, mass and dampers with k = 4000 N / m, m = 10 kg...

Spring system, mass and dampers with k = 4000 N / m, m = 10 kg and c = 40 Ns / m get a harmonic excitation force F (t) = 200 sin 16t N with initial conditions x0 = 0.05 m and ?̇0 = 10 m / s. Look for it, a. Response x due to initial conditions (free vibration) b. Response x due to excitation force (forced vibration) c. The magnitude of the total xtot response (in m...

Determine if pure resonance occur in the following undamped mass-spring system my''+ ky = f(t) where...

Determine if pure resonance occur in the following undamped mass-spring system my''+ ky = f(t) where m = 1kg, k = 9N/m and the driving force f(t) is given by the 2π-periodic function f(t) = ( −1, 0 < t < π 1, π < t < 2π

1 Consider an undamped mass-spring system with m = 1, and k = 26, under the...

1 Consider an undamped mass-spring system with m = 1, and k = 26, under the influence of an external force F(t) = 82 cos(ωt). a) (4 points) For what value of ω will resonance occur? b) (6 points) In the case of resonance, solve the initial-value problem with the system assumed initially at rest and briefly discuss what happens.

A spring-mass system consists of a 0.5 kg mass attached to a spring with a force...

A spring-mass system consists of a 0.5 kg mass attached to a spring with a force constant of k = 8 N/m. You may neglect the mass of the spring. The system undergoes simple harmonic motion with an amplitude of 5 cm. Calculate the following: 1. The period T of the motion 2. The maximum speed Vmax 3. The speed of the object when it is at x = 3.5 cm from the equilibrium position. 4. The total energy E...

A 0.400-kg object attached to a spring with a force constant of 8.00 N/m vibrates in...

A 0.400-kg object attached to a spring with a force constant of 8.00 N/m vibrates in simple harmonic motion with an amplitude of 12.2 cm. the maximum value of its speed is 54.6 WHAT IS THE MAXIMUM VALUE OF IT'S ACCELERATION? QUESTION 2 A 45.0-g object connected to a spring with a force constant of 40.0 N/m oscillates with an amplitude of 7.00 cm on a frictionless, horizontal surface. the total energy of the system is 98 the speed of...

Consider a system with a vibrating base. The spring constant is given as K = 10.kN/m...

Consider a system with a vibrating base. The spring constant is given as K = 10.kN/m and the mass is also given as M = 200.Kg. If the amplitude of the base is 0.5mm, then what should the damping constant c be for the amplitude of the transmitted force to be equal to 2500.N at resonance.

A) A mass on a spring vibrates in simple harmonic motion at a frequency of 4.0...

A) A mass on a spring vibrates in simple harmonic motion at a frequency of 4.0 Hz and an amplitude of 8.0 cm. If a timer is started when its displacement from equilibrium is a maximum (hence x = 8 cm when t = 0), what is the displacement of the mass when t = 3.7 s? B) A mass of 4.0 kg, resting on a horizontal, frictionless surface, is attached on the right to a horizontal spring with spring...

A spring-mass system has a spring constant of 3 N/m. A mass of 2 kg is...

A spring-mass system has a spring constant of 3 N/m. A mass of 2 kg is attached to the spring, and the motion takes place in a viscous fluid that offers a resistance numerically equal to the magnitude of the instantaneous velocity. (a) If the system is driven by an external force of (12 cos 3t − 8 sin 3t) N, determine the steady-state response. (b) Find the gain function if the external force is f(t) = cos(ωt). (c) Verify...

A 6.5-kg mass is attached to an ideal 750-N/m spring. If the system undergoes simple harmonic...

A 6.5-kg mass is attached to an ideal 750-N/m spring. If the system undergoes simple harmonic motion, what are the frequency, angular frequency, and period of the motion? The frequency, f = The angular frequency, ω = The period, T =   If the total mechanical energy of the system is 72 J, what are the amplitude, maximum speed and maximum acceleration of the motion? The amplitude, A =   The maximum speed, vmax = The maximum acceleration, amax =