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8/11/2019 102159508 Thin Cylinder Sec 2 Group 6
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UNIVERSITI TENAGA NASIONAL
COLLEGE OF ENGINEERING
DEPARTMENT OF MECHANICAL ENGINEERING
MEMB221 - MECHANICS & MATERIALS LAB
Experiment title : Thin cylinder (6)
Author : Zaiful Fadly Bin Zawawi
Student ID : ME086677
Section : 02 (group 6)
Lecturer : Siti Zubaidah Bte Othman
Performed Date Due Date Submitted Date
25/06/2012 09/07/2012 09/07/2012
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Table of Content
1.0 Abstract ..22.0 Objective ....3
3.0 Theory 4
4.0 Equipment .7
5.0 Procedure 10
6.0 Data and Observations 11
7.0 Analysis and Results . ..16
8.0 Discussion ... 18
9.0 Conclusions .20
10.0 References ..21
11.0 Appendices .22
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1.0 Abstract
To examine the stress and strain in a thin walled cylinder, students conduct the
experiment by using thin cylinder apparatus (SM1007). The experiment clearly shows the principles, theories and analytical techniques and does help the student in studies.
By using SM1007, student will be able to measure the strains of the cylinder in 2 endscondition. Open ends and closed ends. The difference between opened ends and closedends is that, open ends does not have axial load and no direct axial stress, meanwhile in aclosed ends there is axial load and axial stress.
As the result of the experiment, the value of circumferential stress both under opencondition and closed condition has been obtained. Analysis has been made and so thecalculation. From the data collected in opened ends condition the values of Youngsmodulus and Poissons ratio are calculated.
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2.0 Objective
The objective of this experiment is to determine the circumferential stress under open and
closed condition and to analyze the combined stress and circumferential stress.
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3.0 Theory
Because this is a thin cylinder, i.e. the ratio of wall thickness to internal diameter is less thanabout 1/20, the value of H and L may be assumed reasonably constant over the area, i.e.
throughout the wall thickness, and in all subsequent theory the radial stress, which is small, will
be ignored. I symmetry the two principal stresses will be circumferential (hoop) and longitudinal
and these, from elementary theory, will be given by:
H = (1)
and
L = (2)
As previously stated, there are two possible conditions of stress obtainable; 'open end' and the
'closed ends'.
Figure 1: Stresses in a thin walled cylinder
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a) Open Ends Condition:
The cylinder in this condition has no end constraint and therefore the longitudinal component of
stress L will be zero, but there will be some strain in this direction due to the Poisson effect.
Considering an element of material:
H will cause strains of:-
H1 = . (3)
and
L1 = . (4)
These are the two principal strains. As can be seen from equation 4, in this condition L will be
negative quantity, i.e. the cylinder in the longitudinal direction will be in compression.
b) Closed Ends Condition :
By constraining the ends, a longitudinal as well as circumferential stress will be imposed upon
the cylinder. Considering an element of material:
H will cause strains of:-
H1 = . (5)
and
L1 = . (6)
L will cause strains of:-
L = . (7)
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and
H = . (8)
The principal strains are a combination of these values which are:
H = (H - ) . (9)
L = (L - ) . (10)
The principal of the strains may be evaluated and the Mohr Strain Circle constructed for each of
the test condition. From this circle the strain at any position relative to the principal axes may be
determined.
c) To determine a value for Poisson's Ratio :
Dividing equations 3 and 4 gives:-
= (11)
This equation is only applicable to the open ends condition.
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4.0 Equipment
Thin Cylinder SM1007
Figure 2: Thin Cylinder SM1007
Figure 2 shows a thin walled cylinder of aluminum containing a freely supported piston. The
piston can be moved in or out to alter end conditions by use of the hand wheel. An operating
range of 0 - 3.5 MN/m 2 pressure gauge is fitted to the cylinder. Pressure is applied to the cylinder
by closing the return valve, situated near the pump outlet and operating the pump handle of the
self-contained hand pump unit. In purpose to release the pressure the return valve is unscrewed.
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Figure 3: Sectional plan of the thin cylinder
The cylinder unit, which is resting on four dowels, is supported in a frame and located axially by the
locking screw and the adjustment screw (hand wheel). When the hand wheel is screwed in, it forces the
piston away from the end plate and the entire axial load is taken on the frame, thus relieving the cylinder
of all longitudinal stress. This creates open ends. Pure axial load transmission from the cylinder to frame
is ensured by the hardened steel rollers situated at the end of the locking and adjustment screws. When the
hand wheel is screwed out, the pressurized oil in the cylinder forces the piston against caps at the end of
the cylinder and become closed ends of the cylinder. The cylinder wall then takes the axial stress.
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Figure 4: Strain gauges positions
Six active strain gauges are cemented onto the cylinder in the position shown in Figure 4; these are self-temperature compensation gauges and are selected to match the thermal characteristics of the thin
cylinder. Each gauge forms one arm of a bridge, the other three arms consisting of close tolerance high
stability resistors mounted on a p.c.b. Shunt resistors are used to bring the bridge close to balance in its
unstressed condition (this is done on factory test). The effect on gauge factor of this balancing process is
negligible.
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5.0 Procedure
The power of the thin cylinder is switched on and it leaves for at least 5 minutes before theexperiment is conducted. This allows the strain gauges to reach a stable temperature and to give
the accurate readings.
Two conditions of stress may be achieved in the cylinder during test:
(i) A purely circumferential stress system which is the 'open ends' condition
(ii) A biaxial stress system which is the 'closed ends' condition.
To obtain the circumferential condition of stress,
Ensure that the return valve on the pump is fully unscrewed so that oil can return to the oil
reservoir. The hand wheel is screwed in until it reaches the stop. This moves the piston away
from the left-hand end plate and thus the longitudinal load is transmitted onto the frame. When in
this condition, the value of the Young's Modulus for the cylinder material may be determined
and also the value for Poisson's Ratio can also be determined.
To obtain the biaxial stress system,
Ensure that the return valve on the pump is fully unscrewed. The hand wheel is unscrewed and
the crosspiece is pushed to the left until it contacts the frame end plate. The return valve is closed
and the hand pump is operated to pump oil into the cylinder and push the piston to the end of the
cylinder. Thus, when the cylinder is pressurized, both longitudinal and circumferential stressesare set up in the cylinder. Before any test being made, and at zero pressure, each strain gauge
channel should be brought to zero or the initial strain readings recorded as appropriate.
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6.0 Data and Observation
Table 1: Open Ends Results
Cylinder Condition: OPEN ENDS
Reading
Pressure
(MN.m -2)
Direct
Hoop
Stress
(MN.m -2)
Strain ( )
Gauge
1
Gauge
2 Gauge
3 Gauge
4 Gauge
5 Gauge
6
1 0.03 0.40 0 0 0 1 0 0
2 0.51 6.80 94 -33 -3 30 62 96
3 1.02 13.60 200 -72 -6 64 130 204
4 1.50 20.00 297 -110 -11 96 193 305
5 2.00 26.67 400 -146 -13 130 261 410
6 2.50 33.33 502 -181 -16 165 328 518
7 3.00 40.00 605 -217 -17 202 394 621
Values from actual Mohrs Circle(at 3 MN.m -2) - -217 -9 200 405 -
Values from theoretical Mohrs
Circle
(at 3 MN.m -2)
580 -191 2 195 388 580
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Sample Calculations for Open Ends (Theoretical values) :
Thickness = 3mm
Internal Diameter = 80mm
Poissons ratio = 0.33
Youngs Modulus = 69 10 9 N.m -2
H = (1)
H =
= 40 MN.m -2
H1 = . (3)
H1 = = 580 (for 1,6)
L1 = . (4)
L1 = = -191 (for 2)
1 = 580 , 2 = -191
n = ( ) + ( ) cos2 (=30)
n = 2 (for 3)
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m = ( ) + ( ) cos2
m = 388 (for 5)
When is equal 45
= ( ) = 195 (for 4)
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Table 2: Closed Ends Results
Cylinder Condition: CLOSED ENDS
Reading
Pressure
(MN.m -2)
Direct
Hoop
Stress
(MN.m -2)
Strain ( )
Gauge
1
Gauge
2
Gauge
3
Gauge
4
Gauge
5
Gauge
6
1 0.01 0.13 0 0 0 0 1 1
2 0.50 6.67 78 15 32 50 64 78
3 1.00 13.33 164 33 67 102 133 167
4 1.51 20.13 248 48 99 152 199 254
5 1.99 26.53 329 63 131 203 334 425
6 2.50 33.33 414 82 167 257 334 425
7 3.01 40.13 499 99 199 310 401 512
Values from actual Mohrs Circle
(at 3 MN.m -2) - 99 199 203 400 -
Values from theoretical Mohrs
Circle(at 3 MN.m -2)
484 99 195 292 388 484
Sample Calculations for Closed Ends (Theoretical Values):
Thickness = 3mm
Internal Diameter = 80mm
Poissons ratio = 0.33
Youngs Modulus = 69 10 9 N.m -2
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H = 40 MN.m -2
L = 20 MN.m -2
H = (H - ) . (9)
H = 484 (for 1,6)
L = (L - ) . (10)
L = 99 (for 2)
1 = 484 , 2 = 99
n = ( ) + ( ) cos2 (=30)
n = 195 (for 3)
m = ( ) + ( ) cos2
m = 388 (for 5)
When is equal 45
= ( ) = 292 (for 4)
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7.0 Analysis and Result
Graph 1: Graph of Hoop Stress against Hoop Strain
From the Graph, we know that the value of the Youngs Modulus is 65.3GPa.
(Gradient of graph is 0.0653TPa)
The actual value of Youngs Modulus is 69GPa.
Percentage Error = (69-65.3)/(69) = 5.36%
y = 0.0653x + 0.5373R = 1
0
10
20
30
40
50
0 100 200 300 400 500 600 700
H o o p S t r e s s
( M N
. m
)
Hoop Strain ( )
Graph of Hoop Stress against HoopStrain
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Graph 2: Graph of Longitudinal Strain against Hoop Strain
From the graph, we know that the Poissons ratio is 0.33
(Gradient of the graph is 0.3606)
The actual value of the Poissons ratio given is also 0.33
The Percentage error = (0.33-0.3606)/(0.33) = 9.27%
y = -0.3606x - 0.3457R = 0.9997
-250
-200
-150
-100
-50
0
0 100 200 300 400 500 600 700
L o n g i t u
d i n a
l S t r a i n
( )
Hoop Strain ( )
Graph of Longitudinal Strain againstHoop Strain
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8.0 Discussions
Table 3: Open Ends Condition at a cylinder pressure of 3MN.m -2
Gauge no Actual Strain
()
Theoretical Strain
()
Error
(%)
1 - 580 -
2 -217 -191 13.6
3 -9 2 550
4 200 195 2.6
5 405 388 4.4
6 - 580 -
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Table 4: Closed Ends Condition at a cylinder pressure of 3MN.m -2
Gauge no Actual Strain
()
Theoretical Strain
()
Error
(%)
1 - 484 -
2 99 99 0
3 199 195 2.05
4 203 292 30.47
5 400 388 3.1
6 - 484 -
From the Graph 1, Graph of Hoop Stress against Hoop Strain, we know that the value of the
Youngs Modulus is 65.3GPa. (Gradient of graph is 0.0653TPa). The actual value of Youngs
Modulus is 69GPa. The Percentage Error = 5.36%.
From the G raph 2, Graph of Longitudinal Strain against Hoop Strain we know that the Poissons
ratio is 0.3606 (Gradient of the graph is 0.3606). The actual value of the Poissons ratio given is
also 0.33. The Percentage error = 9.27%
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9.0 Conclusion
From the experiment we can determine the circumferential stress under open condition and under
the closed condition. We are being able to analyses the theoretical values of each condition byusing the formula which is given from the theory parts. We are also being able to analyses the
theoretical value which the actual values by self-drawing of Mohr Strain Circles. By using
details from the open condition, we are also being able to get the values of Youngs Modulus and
the Poissons ratio. For this experiment, we get the value of Youngs Modulus is 65.3 GPa and
the value of Poissons ratio is 0.3606 .
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10.0 References1. Laboratory Manual Mechanics & Materials Lab 2012.
2. Mechanics of Materials.2009.5 th edtion.Singapore.McGraw-Hill.pp423
3. Material Testing.2012
http://www.tecquipment.com/Materials-Testing/Stress-Strain/SM1007.aspx
4. Thin Wall Cylinder.2012
http://homepage.mac.com/sami_ashhab/courses/strength/subjects/thin_wall_cylinder/thin
_wall_cylinder.html
5. Thin Cylinder.2012
http://www.tech.plym.ac.uk/sme/mech226/Thincylinders/thincyl.pdf
http://www.tecquipment.com/Materials-Testing/Stress-Strain/SM1007.aspxhttp://www.tecquipment.com/Materials-Testing/Stress-Strain/SM1007.aspxhttp://homepage.mac.com/sami_ashhab/courses/strength/subjects/thin_wall_cylinder/thin_wall_cylinder.htmlhttp://homepage.mac.com/sami_ashhab/courses/strength/subjects/thin_wall_cylinder/thin_wall_cylinder.htmlhttp://homepage.mac.com/sami_ashhab/courses/strength/subjects/thin_wall_cylinder/thin_wall_cylinder.htmlhttp://www.tech.plym.ac.uk/sme/mech226/Thincylinders/thincyl.pdfhttp://www.tech.plym.ac.uk/sme/mech226/Thincylinders/thincyl.pdfhttp://www.tech.plym.ac.uk/sme/mech226/Thincylinders/thincyl.pdfhttp://homepage.mac.com/sami_ashhab/courses/strength/subjects/thin_wall_cylinder/thin_wall_cylinder.htmlhttp://homepage.mac.com/sami_ashhab/courses/strength/subjects/thin_wall_cylinder/thin_wall_cylinder.htmlhttp://www.tecquipment.com/Materials-Testing/Stress-Strain/SM1007.aspx8/11/2019 102159508 Thin Cylinder Sec 2 Group 6
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