Title: Stress, strain and more on peak broadening
1Stress, strain and more on peak broadening
- Learning Outcomes
- By the end of this section you should
- be familiar with some mechanical properties of
solids - understand how external forces affect crystals at
the Angstrom scale - be able to calculate particle size using both the
Scherrer equation and stress analysis
2Material Properties
- What happens to solids under different forces?
- The lattice is relatively rigid, but.
Note materials properties will be considered
mathematically in PX3508 Energy and Matter
3Mechanical properties of materials
- Tensile strength tensile forces acting on a
cylindrical specimen act divergently along a
single line.
Compressive strength compressive forces on a
cube act convergently in a single line
4Mechanical properties of materials
- Shear strength shear is created by off-axis
convergent forces.
Slipping of crystal planes
5Stress
- Stress force/area
- In simplest form
Normal (or tensile) stress perpendicular to
material Shear stress parallel to material
6Stress
- Thus can resolve into tensile and shear
components
Tensile stress, ? Shear stress, ?
7Strain
- Strain result of stress
- Deformation divided by original dimension
8The Stress-Strain curve
9Elastic region
- In the elastic region, ideally, if the stress is
returned to zero then the strain returns to zero
with no damage to the atomic/molecular structure,
i.e. the deformation is completely reversed
10Plastic region
- In the plastic region, under plastic deformation,
the material is permanently deformed/damaged as a
result of the loading.
In the plastic region, when the applied stress is
removed, the material will not return to original
shape.
The transition from the elastic region to the
plastic region is called the yield point or
elastic limit
11Failure
- At the onset of yield, the specimen experiences
the onset of failure (plastic deformation), and
at the termination of the range of plastic
deformation, the sample experiences a structural
level failure failure point
12Example
13Tensile strength
- Maximum possible engineering stress in tension.
- Metals occurs when noticeable necking starts.
- Ceramics occurs when crack propagation starts.
14Modulus
- The slope of the linear portion of the curve
describes the modulus of the specimen. - Youngs modulus (E) slope of stress-strain
curve with sample in tension (aka Elastic
modulus) - Shear modulus (G) - slope of stress-strain curve
with sample in torsion or linear shear - Bulk modulus (H) slope of stress-strain curve
with sample in compression
Hookes law ? E ?
15Modulus - properties
- Higher values of modulus (steeper gradients of
slope in stress-strain curve) relates to a more
stiff/brittle material more difficult to deform
the material - Lower values of modulus (shallow gradients of
slope in stress-strain curve) relates to a more
ductile material.
- e.g. (GPa)
- Teflon 0.5 Bone 10-20
- Concrete 30
- Copper 120
- Diamond 1100
Spider silk
16Now back to diffraction
- X-ray diffraction patterns can give us some
information on strain - Remember..
Scherrer formula where k0.9
17(micro) Strain uniform
- Uniform strain causes the lattice to
expand/contract isotropically - Thus unit cell parameters expand/contract
- Peak positions shift
18(micro) Strain non-uniform
- Leads to systematic shift of atoms
- Results in peak-broadening
- Can arise from
- point defects (later)
- poor crystallinity
- plastic deformation
19Williamson-Hall plots
- Take the Scherrer equation and the strain effect
So if we plot Bcos? against 4sin ? we (should)
get a straight line with gradient ? and intercept
0.9?/t
20A Williamson-Hall plot (figure 2) indicates that
the cause of the broadening is strain, and most
of this will be the result of chemical disorder
the mean particle size is 4 pm, leading to
insignificant size broadening. . The increase in
slope with decreasing temperature clearly
indicates an increase in the rhombohedral
distortion with falling temperature.
C N W Darlington and R J Cernik J. Phys.
Condens. Matter 1 (1989) 6019-6023.
21Example
22Crystallite size
Halfwidth as before
Can give misleading results
23Crystallite size
Integral breadth
24Summary
- External forces affect the underlying crystal
structure - Strained materials show broadened diffraction
peaks - Width of peaks can be resolved into components
due to particle size and strain