During the latter part of the 19th century and continuing up to the
present, a number of basic failure theories were proposed and tested on a
few materials.1 Most of the
theories were based on the assumption that failure occurs when some
physical variable such as stress, strain, or energy reaches a limiting
value.
Deformation:
- Elastic deformation is temporary (reversible) and involves bond
stretching.
- Plastic deformation is permanent (irreversible), and involves bond
breaking.
- Fracture is catastrophic.
Classification System for Mechanical Failure Modes
4
Stress
Theories
Maximum Principal Stress Theory (Rankine,
Lamé)
Applied satisfactorily to many brittle materials, the theory is based on
a limiting normal stress. Failure occurs when the normal stress
reaches a specified upper limit.1
 |
|
|
Failure is predicted when either of the principal stresses, σ1
or σ2, equals or exceeds the yield strength, σyp, of the material.3 |
σ1 < σyp
σ2 < σyp |
|
Examples
Click on image for full size. |
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Maximum Shear Stress Theory (Tresca,
Guest, Coulomb)
Applied satisfactorily to ductile materials, the theory is based on the
concept of limiting shearing stress at which failure occurs.1
Failure by yielding in a more complicated loading situation is assumed to occur
when the maximum shearing stress in the material reaches a value equal to the
maximum shearing stress in a tension test at yield.
This yield criterion gives good agreement with experimental results for
ductile materials; because of its simplicity, it is the most often used
yield theory.2 The main objection to
this theory is that it ignores the possible effect of the intermediate
principal stress, σ2. However,
only one other theory, the maximum distortional strain energy theory,
predicts yielding better than does the Tresca theory, and the differences
between the two theories are rarely more than 15%.
 |
|
| Failure is predicted when any of the three
shear stresses corresponding to the principal stresses, σ1,2,
equals or exceeds the shear stress corresponding to the yield
strength, σyp, of the
material in uniaxial tension or compression.3 |
|
Maximum Octahedral Shearing Stress Theory
Failure by yielding in a more complicated loading situation is assumed to occur
when the octahedral shearing stress in the material reaches a
value equal to the maximum octahedral shearing stress in a tension test at yield.
Plane stress
case
|
|
Uniaxial stress
case |
 |
|
 |
Note: This theory gives the same results as the maximum distortion energy
theory.
Strain
Theories
Maximum Principal Strain Theory (Saint-Venant)
The theory is based on the assumption that inelastic behavior or
failure is governed by a specified maximum normal strain.1
Failure will occur at a particular part in a body subjected to an
arbitrary state of strain when the normal strain reaches a limiting level.
 |
|
| Failure is predicted when either of the
principal strains, resulting from the principal stresses, σ1,2,
equals or exceeds the maximum strain corresponding to the
yield strength, σyp, of
the material in uniaxial tension or compression.3 |
σ1 - ν(σ2
+ σ3) < σyp |
Total Strain Energy Theory (Beltrami-Haigh)
Applicable to many types of materials, the theory predicts failure or
inelastic action at a point when the strain energy per unit volume exceeds a
specified limit.1
 |
|
| Failure is predicted when the total strain
energy associated with the principal stresses, σ1,2,
equals or exceeds the total strain energy corresponding to that
for the yield strength, σyp,
of the material in uniaxial tension or compression.3 |
σ12 + σ22
+ σ32 -2ν(σ1σ2
+ σ2σ3
+ σ1σ3)
< σyp2 |
Maximum Distortion Energy Theory
(Huber-Henky-von
Mises)
The theory is based on a limiting energy of distortion, i.e. energy
associated with shear strains.1
Strain energy can be separated into energy associated with volume change and energy
associated with distortion of the body. The maximum distortion energy failure theory assumes failure
by yielding in a more complicated loading situation to occur when the distortion energy in the material
reaches the same value as in a tension test at yield.
This theory provides the best agreement between experiment and theory
and, along the Tresca theory, is very widely used today.2
Note: This theory gives the same results as the octahedral shear stress theory.
 |
|
| Failure is predicted when the distortional
energy associated with the principal stresses, σ1,2,
equals or exceeds the distortional energy corresponding to that
for the yield strength, σyp,
of the material in uniaxial tension or compression.3 |
0.5 ( (σ1 - σ2)2
+ (σ2 - σ3)2
+ (σ3 - σ1)2)
< σyp2 |
Summary
Of the failure criteria, the Tresca is the most conservative for all
materials, the von Mises the most representative for ductile materials, and
the Rankine the best fit for brittle materials.3
Laminated-Composite Failure Envelopes
More
on failure theories
Below is a summary of two of most popular theories of failure applied to
a simple uniaxial stress state and to a pure shear stress state.
|
Failure
Criteria
|
| Theory |
Loading |
Relationship |
| Uniaxial |
Pure Shear |
| Maximum principal stress |
σmax
= σYP |
σmax
= τYP |
τYP
= σYP |
| Maximum principal strain |
εmax
= σYP / E |
εmax
= 5τYP / 4E |
τYP
= 0.8 σYP |
| Maximum octahedral shear stress |
 |
 |
τYP
= 0.577 σYP |
| Maximum distortional energy density |
|
|
τYP
= 0.577 σYP |
| Maximum shear stress |
τmax
= σYP / 2 |
τmax
= τYP |
τYP
= 0.5 σYP |
