Illustrate the difference between a fluid and a solid. A fluid has the ability to move and deform continuously when a shear stress is applied and therefore a fluid cannot resist shear stress.
A solid
, on the other hand, has the ability to resist shear stress by a static deflection.
What can resist shear stress?
A solid
can resist an applied shear by deforming its shape whereas a fluid deforms continuously under the influence of shear stress, no matter how small is its shape. In solids, stress is proportional to strain, but in fluids, stress is proportional to ‘strain rate. ‘
When shear stress is applied to a substance it is found to resist it by static deformation The substance is?
When a shear stress is applied to a substance, it is found to resist it by static deformation, the substance is.
liquid
. solid.
Which of the following can resist shear stress answer?
A solid
can resist an applied shear by deforming its shape whereas a fluid deforms continuously under the influence of shear stress, no matter how small is its shape. In solids, stress is proportional to strain, but in fluids, stress is proportional to ‘strain rate.
Is there shear stress in static fluid?
In a stationary fluid stress consists of only pressure.
There are no tangential or shear stresses
in a stationary fluid,.
When shear stress is applied to a substance?
When a shear stress is applied to a substance, it is found to resist it by static deformation, the substance is. liquid. solid.
gas
.
When in any fluid shear stress is not directly proportional to rate of shear strain the fluid is?
4.
Non-Newtonian Fluid
: A real fluid in which the shear stress is not proportional to the rate of shear strain.
Can fluids resist shear?
A fluid at rest can not resist shearing forces
. Under the action of such forces it deforms continuously, however small they are. The resistance to the action of shearing forces in a fluid appears only when the fluid is in motion. This implies the principal difference between fluids and solids.
What is the difference between pressure and shear stress?
Pressure is an example of a normal stress, and acts inward, toward the surface, and perpendicular to the surface. A shear stress is an example of a
tangential stress
, i.e. it acts along the surface, parallel to the surface.
What is the meaning of shear rate?
Shear rate is
the rate of change in velocity at which one layer of fluid passes over an adjacent layer
, which plays an important role in biofilm formation, especially when operated in continuous mode.
Why can a static fluid not have a shear stress?
For a static fluid, the only stress is the normal stress because by definition a fluid subjected to shear stress must deform and undergo motion. So normal stress exists. For static fluid, there will be large linear deformation because there exists no
viscous force
for static fluid.
When the fluid is in static condition the shear stress is equal to?
One definition of a fluid is a substance that continually deforms under shear stress. So if we find a fluid that is static, i.e. not continually deforming, then
it cannot have any shear stress
by definition. Note that the condition “continually deforms under shear stress” depends on the time period of observation.
What is shear stress in fluids?
Fluid shear stress refers to
the stress coplanar component along with a cross section of a material
. This occurs due to the component’s force vector that is analogous to the cross section.
What is shear force in liquid?
Definition of shear stress – Shear stress is defined as
a force per unit area
, acting parallel to an infinitesimal surface element. Shear stress is primarily caused by friction between fluid particles, due to fluid viscosity. … In other words, one can say that the fluid (at rest) is unable to resist the shear stress.
Which of the following is a shear thinning fluid?
Shear thinning fluids, also known as pseudo-plastics, are ubiquitous in industrial and biological processes. Common examples include
ketchup, paints and blood
.
What is applied shear?
A shearing force is
applied to the top of the rectangle while the bottom is held in place
. The resulting shear stress, τ, deforms the rectangle into a parallelogram. The area involved would be the top of the parallelogram.