Convective heat transfer coefficients, materializing exchanges between solid wall (here typha) and its environment, influence its behavior under excitation pulse. Temperature of wall and its density of flow vary with these coefficients according to its thickness (in depth). This study therefore focuses on the evaluation of convective heat transfer coefficient on front face and the optimal insulation thickness.
Use of local insulation materials from vegetable (biodegradable) or mineral origin [
External parameters that can influence behavior of wall are: excitation pulse, solar radiation and convection coefficients [
Heat transfer coefficient influences behavior of the material in response to excitations it undergoes. It materializes heat exchanges between walls of material and its surrounding environment (exterior and interior). Much research has focused on his determination [
In this paper, we will study spectroscopy of convection coefficient at front face of typha panel [
Study model is shown in
· T1 (˚C) and T2 (˚C): temperature in frequency dynamic mode of external and indoor environment respectively;
· T01 and T02 (˚C): maximum amplitude of T1 and T2 respectively;
· T0 (˚C): initial temperature of insulating material;
· L (m): length of material along x-axis;
· h1 and h2 (W∙m−2∙K−1): heat transfer coefficient at front and back face panel respectively.
Conservation of energy at any point of material is governed by following heat equation:
ρ C ∂ T ∂ t = ∂ ∂ x ( λ ⋅ ∂ T ∂ x ) + P (1)
where:
· ρ (kg∙m−3): density of material;
· C (J∙kg−1∙K−1): mass thermal capacity;
· λ (W∙m−1∙K−1): thermal conductivity of material;
· P (W∙m−3): internal heat supply (heat sink) of material;
· x (m): depth position.
Simplified form of this equation, in absence of internal heat sinks and for constant thermal conductivity (assumed isotropic material) is given by:
∂ T ∂ t = λ ρ C p ⋅ Δ T (2)
Study is done in one dimension and equation becomes:
∂ 2 T ( x , h 1 , h 2 , ω , t ) ∂ x 2 = 1 α ∂ T ( x , h 1 , h 2 , ω , t ) ∂ t (3)
where:
· T ( x , h 1 , h 2 , ω , t ) : Temperature in material.
α = λ ρ C p (4)
· h1: heat exchange coefficient front face;
· h2: heat exchange coefficient rear face;
· α: Thermal diffusivity coefficient of the material (m2∙s−1).
Solving this equation requires establishment of boundary conditions:
λ ∂ T ∂ x | x = 0 = h 1 ( T ( 0 , h 1 , h 2 , ω , t ) − T 1 ) (5)
− λ ∂ T ∂ x | x = L = h 2 ( T ( L , h 1 , h 2 , ω , t ) − T 2 ) (6)
Form of the solution of Equation (3) in dynamic frequency regime is:
T ( x , h 1 , h 2 , ω , t ) = A sinh ( β x ) + B cosh ( β x ) e i ω t + T 0 (7)
where:
β = ω 2 α ( 1 + i ) (8)
1 β : complex diffusion length.
Expression of heat flow density
φ = − λ g r a d T (9)
φ (W∙m−2): heat density flow modulus, After resolution of Equation (9), we obtain the following expression:
φ ( x , h 1 , h 2 , ω , t ) = − λ β A cosh ( β x ) + B sinh ( β x ) e i ω t . (10)
To determine spectroscopic expression of heat exchange coefficient h1 at front face, we first study evolution of heat density flow as function of heat exchange coefficient at rear face h2 (
Heat density flow increases with h2 and reaches maximum for h2 > 50 W∙m−2∙K−1; derivative function of heat density flow (11) allows to obtain the expression of h1 (13).
∂ φ ( x , h 1 , h 2 , ω , t ) ∂ h 2 = 0 (11)
∂ φ ( x , h 1 , h 2 , ω , t ) ∂ h 2 = − λ β [ ∂ A cosh ( β x ) ∂ h 2 + ∂ B sinh ( β x ) ∂ h 2 ] e i ω t = 0 (12)
Resolution of Equation (12) allows us to obtain following expression:
h 1 ( L , ω , t ) = − ( λ β ) 2 sinh ( β L ) ( T 02 − T 0 e − i ω t ) ( λ β ) cosh ( β L ) ( T 02 − T 0 e − i ω t ) + ( T 0 e − i ω t − T 01 ) . (13)
Cutoff frequencies ωc are intersections of tangent lines of two consecutive parts of the concavity of curve.
| thickness (m) | 0.25 | 0.248 | 0.245 | 0.239 | 0.233 | 0.229 | 0.223 |
|---|---|---|---|---|---|---|---|
| h1max (W∙m−2∙K−1) | 29.5 | 22.58 | 18.38 | 13.52 | 10.79 | 9.07 | 7.86 |
| ωc (rad/s) | 10−4.207 | 10−4.201 | 10−4.188 | 10−4.184 | 10−4.167 | 10−4.166 | 10−4.144 |
| 10−4.133 | 10−4.124 | 10−4.121 | 10−4.095 | 10−4.066 | 10−4.052 | 10−4.032 | |
| ωr (rad/s) | 10−4.171 | 10−4.164 | 10−4.156 | 10−4.139 | 10−4.123 | 10−4.107 | 10−4.09 |
thickness of the material and reaches a maximum value. This maximum of h1 corresponds to a minimum thickness that allows good insulation.
In fact, higher heat transfer coefficient on front panel, thicker insulating panel. This thickness is called optimal thermal insulation thickness: Xop (
Maximum of heat transfer coefficient is more important when pulsation is low, this corresponds to an increase of heat flow in material due to excitation. Indeed, period being inversely proportional to excitation frequency, latter lasts longer optimal insulation thickness decreases due to relaxation phenomena.
When material thickness exceeds optimal thickness, heat transfer coefficient on front face of panel decreases, which means that heat transfer coefficient no longer, has any influence on material’s behavior.
The resulting curve can be assimilated linear function characterize by equation:
log ( h 1 max ) = a log ( X o p ) + b (14)
h 1 max = e b [ X o p ] a (15)
Coefficients a and b are determined from curve by using Equation (15).
h 1 max = 1.48 × 10 8 [ X o p ] 11.32 (16)
| h1max (W∙m−2∙K−1) ωr (rad∙s−1) Xop (m) | 23.39 10−4.171 0.25 | 21.051 10−4.164 0.249 | 16.734 10−4.156 0.246 | 12.057 10−4.139 0.241 | 9.693 10−4.123 0.236 | 8.144 10−4.107 0.23 | 7.125 10−4.09 0.225 |
|---|
These graphs make it possible to highlight equivalent electrical phenomena of typha panel such as capacitive, inductive or resistive aspects [
For values of 10−4.4 ≤ ω ≤ 10−4.2, heat transfer coefficient phase changes slightly in an almost linear way. For ω ≥ 10−4.2, phase decreases considerably and this decrease is even more important when thickness is significant.
The phase is negative or zero which corresponds to an equivalent electrical circuit in R, L, C where the capacitive phenomena prevail over the inductive phenomena [
In this article, method of characterizing heat transfer to face of material is studied from heat exchange coefficient. It was then evaluated order of magnitude of this coefficient in relation to optimal insulation thickness of typha panel. Indeed, it has been shown that convection coefficient influences insulation thickness, heat transfer coefficient is an important factor to consider when choosing the insulation thickness.
The authors declare no conflicts of interest regarding the publication of this paper.
Thiam, S.K.B., Ba, A., Ndiaye, M.B., Diagne, I., Traore, Y., Faye, S., Thiam, C., Traore, P.T., Fame, A. and Sissoko, G. (2020) One-Dimensional Study of Thermal Behavior of Typha Panel: Spectroscopy Characterization of Heat Exchange Coefficient on Front Face. Journal of Sustainable Bioenergy Systems, 10, 52-61. https://doi.org/10.4236/jsbs.2020.102005