viscosity coefficient मीनिंग इन हिंदी

उदाहरण वाक्य

1. where \ zeta is the volume viscosity coefficient.
2. In this sense, a solid undergoing plastic deformation is a fluid, although no viscosity coefficient is associated with this flow.
3. This modified form is not only more akin to the physics it represents but it also has the advantage of being dependent on only one viscosity coefficient.
4. where \ omega _ { ij } is the average angular velocity of the rotating particles ( as an antisymmetric tensor rather than a pseudovector ) and \ eta _ r is the rotational viscosity coefficient.
5. If the flow is homogeneous within the region, we can set the product of the vertical gradient of the mean horizontal flow and the eddy viscosity coefficient \ K _ m equal to \ u _ * ^ 2:
6. In an isotropic Newtonian fluid, in particular, the linear function of the rate of strain, defined by two coefficients, one relating to the expansion rate ( the bulk viscosity coefficient ) and one relating to the shear rate ( the " ordinary " viscosity coefficient ).
7. In an isotropic Newtonian fluid, in particular, the linear function of the rate of strain, defined by two coefficients, one relating to the expansion rate ( the bulk viscosity coefficient ) and one relating to the shear rate ( the " ordinary " viscosity coefficient ).
8. If the fluid is isotropic as well as Newtonian, the viscosity tensor will have only three independent real parameters : a bulk viscosity coefficient, that defines the resistance of the medium to gradual uniform compression; a dynamic viscosity coefficient that expresses its resistance to gradual shearing, and a rotational viscosity coefficient which results from a coupling between the fluid flow and the rotation of the individual particles.
9. If the fluid is isotropic as well as Newtonian, the viscosity tensor will have only three independent real parameters : a bulk viscosity coefficient, that defines the resistance of the medium to gradual uniform compression; a dynamic viscosity coefficient that expresses its resistance to gradual shearing, and a rotational viscosity coefficient which results from a coupling between the fluid flow and the rotation of the individual particles.
10. If the fluid is isotropic as well as Newtonian, the viscosity tensor will have only three independent real parameters : a bulk viscosity coefficient, that defines the resistance of the medium to gradual uniform compression; a dynamic viscosity coefficient that expresses its resistance to gradual shearing, and a rotational viscosity coefficient which results from a coupling between the fluid flow and the rotation of the individual particles.