In thermal fluid dynamics, the Nusselt number (after Wilhelm Nusselt) is the ratio of total heat transfer to conductive heat transfer at a boundary in a fluid. Total heat transfer combines conduction and convection. Convection includes both advection (fluid motion) and diffusion (conduction). The conductive component is measured under the same conditions as the convective but for a hypothetically motionless fluid. It is a dimensionless number, closely related to the fluid's Rayleigh number.[1]
A Nusselt number of order one represents heat transfer by pure conduction. A value between one and 10 is characteristic of slug flow or laminar flow.[2] A larger Nusselt number corresponds to more active convection, with turbulent flow typically in the 100–1000 range.[2]
A similar non-dimensional property is the Biot number, which concerns thermal conductivity for a solid body rather than a fluid. The mass transfer analogue of the Nusselt number is the Sherwood number.
The Nusselt number is the ratio of total heat transfer (convection + conduction) to conductive heat transfer across a boundary. The convection and conduction heat flows are parallel to each other and to the surface normal of the boundary surface, and are all perpendicular to the mean fluid flow in the simple case.
NuL=
| Totalheattransfer | |
| Conductiveheattransfer |
=
| h | |
| k/L |
=
| hL | |
| k |
where h is the convective heat transfer coefficient of the flow, L is the characteristic length, and k is the thermal conductivity of the fluid.
In contrast to the definition given above, known as average Nusselt number, the local Nusselt number is defined by taking the length to be the distance from the surface boundary to the local point of interest.
Nux=
| hxx | |
| k |
The mean, or average, number is obtained by integrating the expression over the range of interest, such as:[3]
\overline{Nu
An understanding of convection boundary layers is necessary to understand convective heat transfer between a surface and a fluid flowing past it. A thermal boundary layer develops if the fluid free stream temperature and the surface temperatures differ. A temperature profile exists due to the energy exchange resulting from this temperature difference.
The heat transfer rate can be written using Newton's law of cooling as
Qy=hA\left(Ts-Tinfty\right)
where h is the heat transfer coefficient and A is the heat transfer surface area. Because heat transfer at the surface is by conduction, the same quantity can be expressed in terms of the thermal conductivity k:
| Q | ||||
|
\left.\left(T-Ts\right)\right|y=0
These two terms are equal; thus
| -kA | \partial |
| \partialy |
\left.\left(T-Ts\right)\right|y=0=hA\left(Ts-Tinfty\right)
Rearranging,
| h | = | |
| k |
| ||||||
| \left(Ts-Tinfty\right) |
Multiplying by a representative length L gives a dimensionless expression:
| hL | = | |
| k |
| ||||||
|
The right-hand side is now the ratio of the temperature gradient at the surface to the reference temperature gradient, while the left-hand side is similar to the Biot modulus. This becomes the ratio of conductive thermal resistance to the convective thermal resistance of the fluid, otherwise known as the Nusselt number, Nu.
Nu=
| h | |
| k/L |
=
| hL | |
| k |
The Nusselt number may be obtained by a non-dimensional analysis of Fourier's law since it is equal to the dimensionless temperature gradient at the surface:
q=-kA\nablaT
\nabla'=L\nabla
T'=
| T-Th | |
| Th-Tc |
we arrive at
-\nabla'T'=
| L | q= | |
| kA(Th-Tc) |
| hL | |
| k |
then we define
| Nu | ||||
|
so the equation becomes
NuL=-\nabla'T'
By integrating over the surface of the body:
\overline{Nu
where
S'=
| S | |
| L2 |
Typically, for free convection, the average Nusselt number is expressed as a function of the Rayleigh number and the Prandtl number, written as:
Nu=f(Ra,Pr)
Otherwise, for forced convection, the Nusselt number is generally a function of the Reynolds number and the Prandtl number, or
Nu=f(Re,Pr)
Empirical correlations for a wide variety of geometries are available that express the Nusselt number in the aforementioned forms.See also Heat transfer coefficient#Convective_heat_transfer_correlations.
Cited as coming from Churchill and Chu:
\overline{Nu
If the characteristic length is defined
L =
| As | |
| P |
where
As
P
Then for the top surface of a hot object in a colder environment or bottom surface of a cold object in a hotter environment
\overline{Nu
\overline{Nu
And for the bottom surface of a hot object in a colder environment or top surface of a cold object in a hotter environment
\overline{Nu
Cited[4] as coming from Bejan:
\overline{Nu
This equation "holds when thehorizontal layer is sufficiently wide so that the effect of the short vertical sidesis minimal."
It was empirically determined by Globe and Dropkin in 1959:[5] "Tests were made in cylindrical containers having copper tops and bottoms and insulating walls." The containers used were around 5" in diameter and 2" high.
The local Nusselt number for laminar flow over a flat plate, at a distance
x
Nux =0.332
| 1/2 | |
| Re | |
| x |
Pr1/3,(Pr>0.6)
The average Nusselt number for laminar flow over a flat plate, from the edge of the plate to a downstream distance
x
\overline{Nu
In some applications, such as the evaporation of spherical liquid droplets in air, the following correlation is used:[6]
NuD ={2}+0.4
| 1/2 | |
| Re | |
| D |
Pr1/3
Gnielinski's correlation for turbulent flow in tubes:[7] [8]
NuD=
| \left(f/8\right)\left(ReD-1000\right)Pr | |
| 1+12.7(f/8)1/2\left(Pr2/3-1\right) |
where f is the Darcy friction factor that can either be obtained from the Moody chart or for smooth tubes from correlation developed by Petukhov:
f=\left(0.79ln\left(ReD\right)-1.64\right)-2
The Gnielinski Correlation is valid for:
0.5\lePr\le2000
3000\leReD\le5 x 106
The Dittus–Boelter equation (for turbulent flow) as introduced by W.H. McAdams[9] is an explicit function for calculating the Nusselt number. It is easy to solve but is less accurate when there is a large temperature difference across the fluid. It is tailored to smooth tubes, so use for rough tubes (most commercial applications) is cautioned. The Dittus–Boelter equation is:
NuD=0.023
| 4/5 | |
| Re | |
| D |
Prn
where:
D
Pr
n=0.4
n=0.3
The Dittus–Boelter equation is valid for
0.6\lePr\le160
ReD\gtrsim10000
| L | |
| D |
\gtrsim10
The Dittus–Boelter equation is a good approximation where temperature differences between bulk fluid and heat transfer surface are minimal, avoiding equation complexity and iterative solving. Taking water with a bulk fluid average temperature of, viscosity and a heat transfer surface temperature of (viscosity, a viscosity correction factor for
({\mu}/{\mus})
The Sieder–Tate correlation for turbulent flow is an implicit function, as it analyzes the system as a nonlinear boundary value problem. The Sieder–Tate result can be more accurate as it takes into account the change in viscosity (
\mu
\mus
NuD=
| 4/5 | |
| 0.027Re | |
| D |
Pr1/3\left(
| \mu | |
| \mus |
\right)0.14
where:
\mu
\mus
The Sieder–Tate correlation is valid for
0.7\lePr\le16700
ReD\ge10000
| L | |
| D |
\gtrsim10
For fully developed internal laminar flow, the Nusselt numbers tend towards a constant value for long pipes.
For internal flow:
Nu=
| hDh | |
| kf |
where:
Dh = Hydraulic diameter
kf = thermal conductivity of the fluid
h = convective heat transfer coefficient
From Incropera & DeWitt,
NuD=3.66
OEIS sequence gives this value as
NuD=3.6567934577632923619...
For the case of constant surface heat flux,
NuD=4.36