User:Fluidsolved

'''Skin friction drag is a component of profile drag, which is resistant force exerted on an object moving in a fluid. Skin friction drag is caused by the viscosity of fluids and is developed from laminar drag to turbulent drag as a fluid moves on the surface of an object. Skin friction drag is generally expressed in term of the Reynolds number, which is the ratio between inertial force and viscous force.'''

Flow and effect on skin friction drag
Laminar flow over a body occurs when layers of the fluid move smoothly past each other in parallel lines. In nature, this kind of flow is rare. As the fluid flows over an object, it applies frictional forces to the surface of the object which works to impede forward movement of the object; the result is called skin friction drag. Skin friction drag is often the major component of parasitic drag on objects in a flow.

The flow over a body may begin as laminar. As a fluid flows over a surface shear stresses within the fluid slow additional fluid particles causing the boundary layer to grow in thickness. At some point along the flow direction, the flow becomes unstable and becomes turbulent. Turbulent flow has a fluctuating and irregular pattern of flow which are made obvious by the formation of vortices. While the turbulent layer grows, the laminar layer thickness decreases. This results in a thinner laminar boundary layer which, relative to laminar flow, depreciates the magnitude of friction force as fluid flows over the object.

Calculation
Fluid flow is characterized by the dimensionless Reynolds number, and hence skin friction drag, either laminar or turbulent. Reynolds number (Re) is the ratio of the inertial forces to the viscous forces acting on a fluid, in other words the frictional shearing forces attempt to move the fluid and the inertial mass resists that force. Reynolds number is calculated:


 * $$Re_L=\frac{\rho { v} { L}}{\mu}$$

or


 * $$Re_L = \frac{{ v} { L}} \ $$

where:
 * $${\rho}$$ is the fluid mass density
 * $${v}$$ is the fluid speed far from the body's surface (undisturbed flow)
 * $${L}$$ is a characteristic dimension, pipe diameter, chord length of a wing etc.
 * $${\mu}$$ is a fluid viscosity
 * $${\nu}$$ is the kinematic viscosity of the fluid

Definition
$$C_{f} = \frac{\tau_w}{\frac{1}{2}\rho v^2} $$

where:
 * $$C_{f} $$ is a skin friction coefficient.

The skin friction coefficient is a dimensionless skin shear stress which is nondimensionalized by the dynamic pressure of a free stream.
 * $${\rho}$$ is the density of a fluid.
 * $${v}$$ is the free stream speed, which is the fluid speed far from the body's surface.
 * $${\tau_w}$$ is a skin shear stress on a surface.
 * $${\frac{1}{2}\rho v^2}$$ is the dynamic pressure of a free stream.

Blasius solution
$$C_{f} = \frac{0.664}{\sqrt{\mathrm{Re}_x}} \ $$

where: The above relation derived from Blasius boundary layer, which assumes constant pressure throughout the boundary layer and a thin boundary layer '''. The above relation that the skin friction coefficient decreases as the Reynolds number ($$Re_x $$) increases.'''
 * $$ Re_x = \frac{\rho vx}{\mu}$$, which is the Reynolds number.
 * $$ x$$ is the distance from the reference point at which a boundary layer starts to form.

The Computational Preston Tube Method (CPM)
'''CPM, suggested by Nitsche, estimates the skin shear stress of transitional boundary layers by fitting the equation below to a velocity profile of a transitional boundary layer. $$K_1$$(Karman constant), and $${\tau}_w$$(skin shear stress) are determined numerically during the fitting process.'''
 * $$u^{+} = \int_0^{Y^+}\frac{2(1+K_3y^+)dy^+}{1+[1+4(K_1 y^+)^2(1+K_3y^+(1-exp(-y^+/K_2))^2]^{0.5}}\,dy^+ $$

where:
 * $$ u^{+} = \frac{u}{u_{\tau}},~u_{\tau}=\sqrt{\frac{{\tau}_w}{\rho}},~y^+=\frac{u_{\tau}y}{\nu}$$
 * $$ y$$ is a distance from the wall.
 * $$ u$$ is a speed of a flow at a given $$ y$$.


 * $$K_1$$ is the Karman constant, which is lower than 0.41, the value for turbulent boundary layers, in transitional boundary layers.
 * $$K_2$$ is the Van Driest constant, which is set to 26 in both transitional and turbulent boundary layers.
 * $$K_3$$ is a pressure parameter, which is equal to $$ \frac{\nu}{\rho}{u_{\tau}}^3\frac{dp}{dx}$$ when $$ p$$ is a pressure and $$ x$$ is the coordinate along a surface where a boundary layer forms.

Prandtl's one-seventh-power law

 * $$C_{f} = \frac{0.027}{Re_x^{1/7}}\ $$

'''The above equation, which is derived from Prandtl's one-seventh-power law, provided a reasonable approximation of the drag coefficient of low-Reynolds-number turbulent boundary layers. Compared to laminar flows, the skin friction coefficient of turbulent flows lowers more slowly as the Reynolds number increases.'''

Drag
A total skin friction drag force can be calculated by integrating skin shear stress on the surface of a body.
 * $$F = \int\limits_{surface}C_f \frac{\rho v^{2}}{2}dA$$

Relationship between skin friction and heat transfer
In the point of view of engineering, calculating skin friction is useful in estimating not only total frictional drag exerted on an object but also convectional heat transfer rate on its surface '''. This relationship is well developed in the concept of Reynolds analogy, which links two dimensionless parameters: skin friction coefficient (Cf), which is a dimensionless frictional stress, and Nusselt number (Nu), which indicates the magnitude of convectional heat transfer. Turbine blades, for example, require the analysis of heat transfer in their design process since they are imposed in high temperature gas, which can damage them with the heat. Here, engineers calculate skin friction on the surface of turbine blades to predict heat transfer occurred through the surface.'''