Mechanics of Materials II
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Mechanics of Materials II
UET, TaxilaLecture No. (4&5)
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Mechanisms of material failure
In order to understand the various approaches to modeling fracture, fatigue and failure, it is helpful to review briefly the features and mechanisms of failure in solids.
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Failure under monotonic loading
If you test a sample of any material under uni-axial tension it will eventually fail. The features of the failure depend on several factors, including:
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1-The materials involved and their micro-sctructure
2-The applied stress state 3- Loading rate 4-Temperature 5-Ambient environment (water vapor; or presence of corrosive environments)
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Materials are normally classified loosely as either `brittle’ or `ductile’ depending on the characteristic features of the failure.
Brittle and Ductile failures
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Brittle Materials
Examples of `brittle’ materials include:
glasses, ceramics (Oxides, Carbides & Nitrides)
and Cast Iron
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Features of a brittle material are
1-Very little plastic flow occurs in the specimen prior to failure;
2-The two sides of the fracture surface fit together very well after failure.
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3- The fracture surface appears faceted – you can make out individual grains and atomic planes.
4- In many materials, fracture occurs along certain crystallographic planes. In other materials, fracture occurs along grain boundaries
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Ductile Materials Examples of `ductile’ Tin and lead FCC metals at all temperatures;
BCC metals at high temperatures;
polymers at relatively high temperature.
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Features of a `ductile’ fracture are
Extensive plastic flow occurs in the material prior to fracture.
There is usually evidence of considerable necking in the specimen
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Fracture surfaces don’t fit together.
The fracture surface has a dimpled appearance – you can see little holes
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Complex Materials
Of course, some materials have such a complex microstructure (especially composites) that it’s hard to classify them as entirely brittle or entirely ductile.
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How Brittle Fracture occurs
Brittle fracture occurs as a result of a single crack, propagating through the specimen. Most materials contain pre-existing cracks, in which case fracture is initiated when a large crack in a region of high tensile stress starts to grow.
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How ductile fracture occurs
Ductile fracture occurs as a result of the nucleation, growth and coalescence of voids in the material
Failure is controlled by the rate of nucleation of the voids and their rate of growth.
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Schematic Representation for Ductile & Brittle Fracture
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Does material fail under stresses lower than yield strength?
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The answer is: yes
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This chapter would not be complete, therefore, without reference to certain loading conditions under which materials can fail at stresses much less than the yield stress, namely creep and fatigue.
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Creep and FatigueIn the preceding sections it has been suggested that failure of materials occurs when the ultimate strengths have been exceeded.
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Definition of creep
Creep is the gradual increase of plastic strain in a material with time at constant load.
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Creep at high temperatureAt elevated temperatures some materials (most metals) are susceptible to this phenomenon and even under the constant load mentioned, strains can increase continually until fracture.
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Applications of creep
This form of fracture is particularly relevant to turbine blades, nuclear reactors, furnaces, rocket motors, etc.
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Typical creep curve.
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In previous figure:
The general form of the strain versus time graph or creep curve is shown for two typical operating conditions.
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Four features
In each case the curve can be considered to exhibit four principal features:
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(a) An initial strain, due to the initial application of load. In most cases this would be an elastic strain.
(b) A primary creep region, during which the creep rate (slope of the graph) diminishes.
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(c) A secondary creep region, when the creep rate is sensibly low (Constant).
(d) A tertiary creep region, during which the creep rate accelerates to final fracture.
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Design for creep It is clearly vital that a material which is susceptible to creep effects should only be subjected to stresses which keep it in the secondary (straight line) region throughout its service life.
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This enables the amount of creep extension to be estimated and allowed in design.
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Fatigue
Definition of FatigueFatigue is the failure of a material under fluctuating stresses each of which is believed to produce minute amounts of plastic strain.
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Applications of fatigue
Fatigue is particularly important in components subjected to repeated and often rapid load fluctuations, e.g. aircraft components, turbine blades, vehicle suspensions, etc.
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Representation of FatigueFatigue behaviour of materials is usually described by afatigue life or S-N curve
in which the number of stress cycles N to produce failure
is plotted against S.
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A typical S-N curve for mild steel is shown in next figure:
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S-N Curve
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Fatigue limit The particularly relevant feature of this curve is the limiting stress Sn since it is assumed that stresses below this value will not produce fatigue failure however many cycles are applied, i.e. there is infinite life.
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Design for fatigue
In the simplest design cases, therefore, there is an aim to keep all stresses below this limiting level.
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Solved
Examples
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Example 1 Determine the stress in each section of
the bar shown in next Figure when subjected to an axial tensile load of 20 kN. The central section is 30 mm square cross-section; the other portions are of circular section, their diameters being indicated.
What will be the total extension of the bar? For the bar material E = 210GN/m2.
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Figure (1)
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Solution
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Stress in section (1)
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Stress in section 2
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Stress in section 3
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Now the extension of a bar can always be written in terms of the stress in the bar since
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Example 2(a) A 25 mm diameter bar is subjected to
an axial tensile load of 100 kN. Under the action of this load a 200mm gauge length is found to extend by the distance:
0.19 x 10-3 mm. Determine the modulus of elasticity for
the bar material.
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Solution (a)
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(b) If, in order to reduce weight whilst keeping the external diameter constant, the bar is bored axially to produce a cylinder of uniform thickness, what is the maximum diameter of bore possible, given that the maximum allowable stress is 240MN/m2?
The load can be assumed to remain constant at 100 kN.
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Let the required bore diameter be ‘d’ mm; the cross-sectional area of the bar will then be reduced to:
Solution (b)
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But this stress is restricted to a maximum allowable value of 240 MN/m2.
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The maximum bore possible is thus 9.72 mm.
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(c) What will be the change in the outside diameter of the bar under the limiting stress quoted in (b)?
Where: E = 210 GN/m2
and = 0.3
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The change in the outside diameter of the bar will be obtained from the lateral strain,
Solution (C)
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d/d
σ/E
a
t
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Example 3The coupling shown in next Figure is constructed from steel of rectangular cross-section and is designed to transmit a tensile force of 50 kN. If the bolt is of 15 mm diameter calculate:
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(a) the shear stress in the bolt;
(b) the direct stress in the plate;
(c) the direct stress in the forked end of the coupling.
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Double Shear
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Solution
(a) The bolt is subjected to double shear, tending to shear it as shown in Figure. There is thus twice the area of the bolt resisting the shear and from equation:
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v
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(c) The force in the coupling is shared by the forked end pieces, each being subjected to a direct stress
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Problems