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3-35. Figure 3P-35 represents a damping in the vibration absorption. Assuming the harmonic force Fl) Asin(ot)...
A single dof vibration system, modeled by a mass of 50 kg, damping coefficient of 300...
A single dof vibration system, modeled by a mass of 50 kg, damping coefficient of 300 Ns/m, and spring constant of 5000 N/m, is subjected to periodic displacement excitation u(t) as shown in the figure below. 1. Derive the equation of motion 2. Using Laplace transform, find characteristic equation. 3. Find the undamped and damped natural frequencies. 4. Find the damping ratio. 5. Find the transfer function of output x(t) to the periodic input u(t) using Laplace transform.
3. (20%) A vibration absorber, which is a spring-mass system (k2, m2), is added to a...
3. (20%) A vibration absorber, which is a spring-mass system (k2, m2), is added to a system (ki, m) subject to a harmonic force F(t) Fo cos @t. (a) Derive the amplitudes of steady-state response for mi and m2. (b) Find the relation between k2 and m2 that leads to no steady state vibration of mi.
3. (20%) A vibration absorber, which is a spring-mass system (k2, m2), is added to a system (ki, m) subject to a harmonic force...
3. (20%) A vibration absorber, which is a spring-mass system (k2, m2), is added to a...
3. (20%) A vibration absorber, which is a spring-mass system (k2, m2), is added to a system (ki, mi) subject to a harmonic force F(t) = Fo cosot. (a) Derive the amplitudes of steady-state response for mi and m2. (b) Find the relation between k2 and m2 that leads to no steady state vibration of m.
3. (20%) A vibration absorber, which is a spring-mass system (k2, m2), is added to a system (ki, mi) subject to a harmonic force...
PROBLEM 1 (35 %) The mechanical system in the figure below consists of a disk of radius r, a block of mass m, a spr...
PROBLEM 1 (35 %) The mechanical system in the figure below consists of a disk of radius r, a block of mass m, a spring of stiffness (spring constant) k, and a damper with damping ratio b. The disk has moment of inertia Jabout its center of mass (pivot point O), and the block is subjected to an external force t) as shown in the figure. The spring is unstressed when x 0= 0. Assume small 0. (a) (10 points)...
Figure 4 shows a two-mass translational mechanical system. The applied force falt) acts on mass mi....
Figure 4 shows a two-mass translational mechanical system. The applied force falt) acts on mass mi. Displacements z1 and 22 are absolute positions of masses mi and m2, respectively, measured relative to fixed coordinates (the static equilibrium positions with fa(t) = 0). An oil film with viscous friction coefficient b separates masses mi and m2. Draw the free body diagram and derive the mathematical model of the vibration system using the diagram. falt) Oil film, friction coefficient b K m2...
F Fosin t m k 2 Figure Qla: System is subjected to a periodic force excitation (a) Derive the equation of motion of the...
F Fosin t m k 2 Figure Qla: System is subjected to a periodic force excitation (a) Derive the equation of motion of the system (state the concepts you use) (b) Write the characteristic equation of the system [4 marks 12 marks (c) What is the category of differential equations does the characteristic equation [2 marks fall into? (d) Prove that the steady state amplitude of vibration of the system is Xk Fo 25 + 0 marks (e) Prove that...
Question B A machine on a viscoelastic foundation (Figure 31.1), modelled as a spring mass-damper system...
Question B A machine on a viscoelastic foundation (Figure 31.1), modelled as a spring mass-damper system is acted upon by a force modelled as a harmonic force: F(t) = 0.2 sin(wt) Force is given in N and time in seconds. W Figure 31.1 Nos Given numerical values: m = 10 kg C=5 M k = 1000 = 1) draw the correct Free-Body-Diagram and determine the equation of motion [2 marks) 2) determine the natural frequency and the damping ratio of...
A vibration isolation system for a 1-DOF mechanical system is shown below. Displacement of the mass...
A vibration isolation system for a 1-DOF mechanical system is shown below. Displacement of the mass x is measured from the static equilibrium position and the system parameters are m = 0.3 kg. k=10N/m, b = 4.4 Ns/m, and by = 0.5 Ns/m. Fixed 1. TI W Fixed base Figure / sehen voulon tem a) Derive the mathematical model of the system. Make sure you have the FBD and all equations and signs are properly showcased. b) Use the system...
IlI. Vibration isolation taking into account the stiffness of the beam A machine subject to a sin...
IlI. Vibration isolation taking into account the stiffness of the beam A machine subject to a single frequency harmonic excitation of the form F()Fo sin at is to be analyzed over a range of frequencies ω, < ω < ω.. The machine is mounted on a beam at a location where the of equivalent stiffness is keg. The model of a machine mounted on a damped isolator then attached to a beam of negligible mass is Fosinut xit) yit) kea...
Olt) 1422LLA 1. The system at the right is subject to the harmonic + x(t) force...
Olt) 1422LLA 1. The system at the right is subject to the harmonic + x(t) force f(t) = Fo sin ot as shown, with amplitude 50 N and a forcing frequency due to a motor (not m shown) with speed = 191 rotations per minute (RPM). Mass m can only translate horizontally and the rod is pinned at point O. The parameters are: r = 5 cm, m= 10 kg, Jo = 1 kg m-, kı = 1000 N/m, ka...
A single dof vibration system, modeled by a mass of 50 kg, damping coefficient of 300 Ns/m, and spring constant of 5000 N/m, is subjected to periodic displacement excitation u(t) as shown in the figure below. 1. Derive the equation of motion 2. Using Laplace transform, find characteristic equation. 3. Find the undamped and damped natural frequencies. 4. Find the damping ratio. 5. Find the transfer function of output x(t) to the periodic input u(t) using Laplace transform.
3. (20%) A vibration absorber, which is a spring-mass system (k2, m2), is added to a system (ki, m) subject to a harmonic force F(t) Fo cos @t. (a) Derive the amplitudes of steady-state response for mi and m2. (b) Find the relation between k2 and m2 that leads to no steady state vibration of mi.
3. (20%) A vibration absorber, which is a spring-mass system (k2, m2), is added to a system (ki, m) subject to a harmonic force...
3. (20%) A vibration absorber, which is a spring-mass system (k2, m2), is added to a system (ki, mi) subject to a harmonic force F(t) = Fo cosot. (a) Derive the amplitudes of steady-state response for mi and m2. (b) Find the relation between k2 and m2 that leads to no steady state vibration of m.
3. (20%) A vibration absorber, which is a spring-mass system (k2, m2), is added to a system (ki, mi) subject to a harmonic force...
PROBLEM 1 (35 %) The mechanical system in the figure below consists of a disk of radius r, a block of mass m, a spring of stiffness (spring constant) k, and a damper with damping ratio b. The disk has moment of inertia Jabout its center of mass (pivot point O), and the block is subjected to an external force t) as shown in the figure. The spring is unstressed when x 0= 0. Assume small 0. (a) (10 points)...
Figure 4 shows a two-mass translational mechanical system. The applied force falt) acts on mass mi. Displacements z1 and 22 are absolute positions of masses mi and m2, respectively, measured relative to fixed coordinates (the static equilibrium positions with fa(t) = 0). An oil film with viscous friction coefficient b separates masses mi and m2. Draw the free body diagram and derive the mathematical model of the vibration system using the diagram. falt) Oil film, friction coefficient b K m2...
F Fosin t m k 2 Figure Qla: System is subjected to a periodic force excitation (a) Derive the equation of motion of the system (state the concepts you use) (b) Write the characteristic equation of the system [4 marks 12 marks (c) What is the category of differential equations does the characteristic equation [2 marks fall into? (d) Prove that the steady state amplitude of vibration of the system is Xk Fo 25 + 0 marks (e) Prove that...
Question B A machine on a viscoelastic foundation (Figure 31.1), modelled as a spring mass-damper system is acted upon by a force modelled as a harmonic force: F(t) = 0.2 sin(wt) Force is given in N and time in seconds. W Figure 31.1 Nos Given numerical values: m = 10 kg C=5 M k = 1000 = 1) draw the correct Free-Body-Diagram and determine the equation of motion [2 marks) 2) determine the natural frequency and the damping ratio of...
A vibration isolation system for a 1-DOF mechanical system is shown below. Displacement of the mass x is measured from the static equilibrium position and the system parameters are m = 0.3 kg. k=10N/m, b = 4.4 Ns/m, and by = 0.5 Ns/m. Fixed 1. TI W Fixed base Figure / sehen voulon tem a) Derive the mathematical model of the system. Make sure you have the FBD and all equations and signs are properly showcased. b) Use the system...
IlI. Vibration isolation taking into account the stiffness of the beam A machine subject to a single frequency harmonic excitation of the form F()Fo sin at is to be analyzed over a range of frequencies ω, < ω < ω.. The machine is mounted on a beam at a location where the of equivalent stiffness is keg. The model of a machine mounted on a damped isolator then attached to a beam of negligible mass is Fosinut xit) yit) kea...
Olt) 1422LLA 1. The system at the right is subject to the harmonic + x(t) force f(t) = Fo sin ot as shown, with amplitude 50 N and a forcing frequency due to a motor (not m shown) with speed = 191 rotations per minute (RPM). Mass m can only translate horizontally and the rod is pinned at point O. The parameters are: r = 5 cm, m= 10 kg, Jo = 1 kg m-, kı = 1000 N/m, ka...
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