Understanding Young’s Modulus
Understanding
Young’s Modulus
Young’s Modulus is one of the
three main elastic constants which are: -
1) Shear Modulus
2)
Bulk Modulus
3)
Young’s Modulus
These moduli are
used to describe how a material deforms under the loading.
Let’s introduce
Young’s Modulus using a tensile test. In a tensile test, we take a test piece,
e.g. metal rod and stretch it along its length. It is a uniaxial test which
means it applies the load in one direction only. The test machine in test
measures the applied load and changes in the dimension of the applied test piece.
The main output from this test is the stress-strain curve.
(σ) Stress (pressure)= Force/Area
(ε) Strain = Change in length/Original Length
Fig:
- Stress-Strain Curve
This
curve describes how much the material we are testing will deform for different
levels of stress. This test ends when the material fractures. As shown above we
can split the curve in two reasons which is the elastic region where the curve
is linear and the plastic region.
When
applied stress is low and we remain in the elastic region then the original
dimension of the component will be completely recovered when the applied load is
removed. This means the material acts as a plastic material. For more stress
applied then we enter the plastic region. Here permanent plastic deformation
will remain after removal of applied stress.
In elastic region, the stress-strain curve is a straight line. This means the strain is proportional to
applied stress.
i.e. (σ) Stress ∝ (ε) Strain
=> Stress (σ) = Young’s
Modulus(E) * Strain(ε)
=> Young’s Modulus(E) = Stress (σ)/Strain(ε) Young’s Modulus is the gradient of the line in elastic
region. Its unit is the same as stress (N/m2).
Young’s Modulus is actually the
measure of how much stiff material is. While calculating the stiffness of a
structure Young’s Modulus is also used. The higher the young’s modulus the
stiffer the material and so the smaller elastic deformation for the applied
load.
If we conduct tests of different
other materials then the slope of each material is different from another. Hence,
different materials can have vastly different values of Young’s Modulus.
|
|
Mild Steel |
High Carbon Steel |
|
Carbon Content |
0.05 to 0.25 % |
0.6 to 0.95 % |
|
Young’s Modulus |
205Gpa |
200Gpa |
|
Yield Strength |
370Gpa |
490Gpa |
|
Ultimate Tensile Strength |
440Gpa |
635Gpa |
Notes: -
# Elastic Deformation:
a) Caused by
stretching of the bonds between atoms.
b) Deformation is
reversed when the load is removed.
# Plastic Deformation:
a) Caused by the
breaking of the atom bonds.
b) Deformation is
permanent and remains after the load are removed.
Why is Young’s Modulus important in
engineering?
Young’s Modulus is a very
important material property when it comes to engineering. In engineering
design, a common objective for many different applications is to keep elastic
deformation as small as possible which means young’s modulus is a key parameter
that needs to be considered in the material selection process. For example, while
constructing a bridge if we take the material having low young’s modulus then
it will show large deflection when some load moves over it. Selecting a higher
stiffness (i.e. higher young’s modulus) material ensures that the elastic
deformations remain small for larger loads.
Reference:- The Efficient Engineer
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