Download JNTUK (Jawaharlal Nehru Technological University Kakinada (JNTU kakinada)) M.Tech (ME is Master of Engineering) 2020 R19 ME Mechanical Vibrations Model Previous Question Paper
[M19CAD1105]
I M. Tech I Semester (R19) Regular Examinations
MECHANICAL VIBRATIONS
Department of Mechanical Engineering
MODEL QUESTION PAPER
TIME: 3Hrs. Max. Marks: 75 M
Answer ONE Question from EACH UNIT.
All questions carry equal marks.
*****
CO KL M
UNIT-I
1. a). Determine the differential equation of a spring mass system (shown in
the figure below) and its natural frequency by using (i). D? Alembert?s
principle and (ii). Rayleigh?s method.
1 3 8
b). Explain the classifications of vibration with examples. 1 2 7
OR
2. a). Write short notes on vibration isolation and transmissibility 1 2 7
b). Derive the expression for vibration response of a single degree of
freedom system if the damping provided is under damped system.
1 3 8
UNIT-II
3. Write short notes on convolution integral and shock spectrum. 2 2 15
OR
4. Obtain the response equation for a system subjected to unit step and
unit ramp functions.
2 3 15
UNIT-III
5. For the three degree of freedom system shown in figure below, obtain
the three natural frequencies and the corresponding mode shapes.
3 3 15
OR
6. Determine the natural frequency of torsional vibrations of a shaft with
two circular discs of uniform thickness at the ends. The masses of the
discs are M1 = 500 kg and M2 = 1000 kg and their outer diameters are
D1 = 125 cm and D2 = 190 cm. The length of the shaft is 300 cm and
3 3 15
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[M19CAD1105]
I M. Tech I Semester (R19) Regular Examinations
MECHANICAL VIBRATIONS
Department of Mechanical Engineering
MODEL QUESTION PAPER
TIME: 3Hrs. Max. Marks: 75 M
Answer ONE Question from EACH UNIT.
All questions carry equal marks.
*****
CO KL M
UNIT-I
1. a). Determine the differential equation of a spring mass system (shown in
the figure below) and its natural frequency by using (i). D? Alembert?s
principle and (ii). Rayleigh?s method.
1 3 8
b). Explain the classifications of vibration with examples. 1 2 7
OR
2. a). Write short notes on vibration isolation and transmissibility 1 2 7
b). Derive the expression for vibration response of a single degree of
freedom system if the damping provided is under damped system.
1 3 8
UNIT-II
3. Write short notes on convolution integral and shock spectrum. 2 2 15
OR
4. Obtain the response equation for a system subjected to unit step and
unit ramp functions.
2 3 15
UNIT-III
5. For the three degree of freedom system shown in figure below, obtain
the three natural frequencies and the corresponding mode shapes.
3 3 15
OR
6. Determine the natural frequency of torsional vibrations of a shaft with
two circular discs of uniform thickness at the ends. The masses of the
discs are M1 = 500 kg and M2 = 1000 kg and their outer diameters are
D1 = 125 cm and D2 = 190 cm. The length of the shaft is 300 cm and
3 3 15
9
its diameter is 10 cm. Take the Modulus of rigidity for the material of
shaft is G = 0.83 ? 10
11
N/m
2
.
UNIT-IV
7. Find the lowest natural frequency of transverse vibrations for the
system shown in figure below by Rayleigh?s method. Take E=1.96 ?
10
11
N/m
2
and I=10
-6
m
4
.
4 3 15
OR
8. For the three degree of freedom system shown in figure below find the
lowest natural frequency using Stodola?s method.
4 3 15
UNIT-V
9. Calculate the whirling speed of shaft supported by long bearing so as to
give zero slope at both ends of the shaft.
5 3 15
OR
10. Prove that the critical speed of whirling speed for a rotating shaft is
same as the frequency of natural transverse vibration.
5 3 15
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This post was last modified on 28 April 2020