Conduction Heat Transfer Schneider

Conduction Heat Transfer Schneider Steel
Conduction Heat Transfer Definition
Conduction Heat Transfer Schneider Model
Conduction Heat Transfer Formula
Conduction Heat Transfer Equation
Conduction Heat Transfer Schneider

1.8.2.1 Conduction heat transfer. Conduction heat transfer is the transfer of heat through matter (i.e., solids, liquids, or gases) without bulk motion of the matter. In another ward, conduction is the transfer of energy from the more energetic to less energetic particles of a substance due to interaction between the particles. Conduction Heat Transfer Schneider Pdf Downloads Fourier’s law relates the heat ﬂux in any direction to the temperature gradient in that direction. For example: q˙ = −k ∂T ∂x (1-1) 1 2 One-Dimensional, Steady-State Conduction Aluminum Water (a) (b) Figure 1-1: Conductivity functions in EES for (a) compressible substances and (b. Heat conduction is one of the heat transfer mechanisms which smooth temperature or thermal gradient (QPedia, n.d, Spring, 2008). The material heat transfer coefficients are vital parameters as far as heat transfer through conduction is concerned, since the characteristically define the conduction properties of a given material. The den- sity, r, the heat capacity, cp, and the thermal conductivity of the material will ⌬r r r Figure 17.5 Annular element in a long, circular cylinder with internal heat generation. Jaeger, Conduction of Heat in Solids, 2nd Edition, Oxford Univ. Press, New York, 1959. Jakob, Heat Transfer, Vol.

Conduction Heat Transfer Schneider Steel

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B. K. Bharti, Dr. S. Singh, K. S. Deshwal, 2012, Computational Study Of Steady State Conduction Heat Transfer With Different Cross-Section Using Altair^® Hyperworks^®, INTERNATIONAL JOURNAL OF ENGINEERING RESEARCH & TECHNOLOGY (IJERT) Volume 01, Issue 08 (October 2012),

Open Access
Total Downloads : 856
Authors : B. K. Bharti, Dr. S. Singh, K. S. Deshwal
Paper ID : IJERTV1IS8605
Volume & Issue : Volume 01, Issue 08 (October 2012)
Published (First Online): 29-10-2012
ISSN (Online) : 2278-0181
Publisher Name : IJERT
License: This work is licensed under a Creative Commons Attribution 4.0 International License

Text Only Version

Computational Study Of Steady State Conduction Heat Transfer With Different Cross-Section Using Altair^® Hyperworks^®

Computational Study Of Steady State Conduction Heat Transfer With Different Cross- Section Using

AltairÂ® HyperworksÂ®

B. K. Bharti1 , Dr. S. Singp, K. S. Deshwal3

1M. Tech Scholar, 2Associate Professor, 3M. Tech Scholar

Department of Mechanical Engineering,

Bipin Tripathi Kumaon Institute of Technology, Dwarahat, Almora, Uttarakhand (India), 263653

In this study, the effect of temperature distribution with constant heat flux is considered. The study is considered on the Rectangular & Triangular profile block cross-section. This study is performed using Fourier Law of steady state heat conduction which depict the first law of thermodynamics. In the governing equation Fourier law is applied with the case of no internal heat generation to solve a one-dimensional heat conduction problem. The Problem is solved computationally using Altair Hyperworks Software. Analytical results were obtained for Rectangular & Triangular cross-section and these can be used to build up the Heat flow variation. The heat flux is maintained at constant value and temperature distribution within the section is obtained. Due to temperature difference heat will flow from higher temperature to lower temperature. The material of solid block cross-section provides conductive resistance. Hence, this is a conduction mode of heat transfer. The heat transfer takes place in one dimension only and properties are considered to be isotropic with two different Material Brass & Steel.

Keywords: Rectangular & Triangular Block cross-section temperature distribution.CAE

Software Altair Hyper work.

As we explore the propagation of energy, we must take into account the science of thermodynamics, which allows us to predict the trajectories of the processes, and the science of heat transfer for knowing the modes by which energy is
propagated from one system to other systems. We know that heat is not temperature because heat is energy in transit. Heat can exist in rotational, vibration and translational motions of the particles of a system, whereas temperature is the measurement of the average of the kinetic energy of the particles of a substance. The average of the molecular
kinetic energy depends on the translational motion of the particles of a system. The energy absorbed or stored by a substance causes an increase in the kinetic energy of the particles that form that substance. This kinetic energy or motion causes the particles to emit heat, which is transferred to other regions of that substance or towards other systems with a lower energy density.
To understand heat transfer we have to keep in mind that heat is not a substance, but energy that flows from one system toward other systems with lower density of energy. Heat is temperature difference and the surroundings. In most of the processes heat is either given up or absorbed, so there is transfer of heat. There are three fundamental types of heat transfer: conduction, convection and radiation. All three types may occur at the same time, and it is advisable to consider the heat transfer by each type in any particular case
Heat transfer generally takes place by three modes such as conduction, convection and radiation. Heat transmission, in majority of real situations, occurs as a result of combinations of these modes of heat transfer. Conduction is the transfer of thermal energy between neighbouring molecules in a substance due to a
temperature gradient. It always takes place from a region of higher temperature to a region of lower temperature, and acts to equalize temperature differences. Conduction needs matter and does not require any bulk motion of matter.
Conduction takes place in all forms of matter such as solids, liquids, gases and plasmas. In
Solids, it is due to the combination of vibrations of the molecules in a lattice and the energy
Transport by free electrons. In gases and liquids, conduction is due to the collisions and diffusion of the molecules during their random motion.
Convection occurs when a system becomes unstable and begins to mix by the movement of mass. A common observation of convection is of thermal convection in a pot of boiling water, in which the hot and less-dense water on the bottom layer moves upwards in plumes, and the cool and denser water near the top of the pot likewise sinks. Convection more likely occurs with a greater variation in density between the two fluids, a larger acceleration due to gravity that drives the convection through the convecting medium.
Radiation describes any process in which energy emitted by one body travels through a medium or through space
absorbed by another body. Radiation occurs in nuclear weapons, nuclear reactors, radioactive radio waves, infrared light, visible light, ultraviolet light, and X- rays substances.
Heat conduction is increasingly important in various areas, namely in the earth sciences, and in many other evolving areas of thermal analysis. A common example of heat conduction is heating an object in an oven or furnace. The material remains stationary throughout, neglecting thermal expansion, as the heat diffuses inward to increase its temperature. The importance of such conditions leads to analyze the temperature field by employing sophisticated mathematical and advanced numerical tools, Schneider (1957).
The section considers the various solution methodologies used to obtain the temperature field. The objective of conduction analysis is to determine the temperature field in a body and how the temperature within the portion of the body. The temperature field usually depends on boundary conditions, initial condition, material properties and geometry of the body, Teixeira and Rincon (2009).
Why one need to know temperature field. To compute the heat flux at any location, compute thermal stress, expansion,
deflection, design insulation thickness, heat treatment method, these all analysis leads to know the temperature field, Fried,(1957).
The solution of conduction problems involves the functional dependence of temperature on space and time coordinate. Obtaining a solution means determining a temperature distribution which is consistent with the conditions on the boundaries and also consistent with any specified constraints internal to the region. Keshavarz and Taheri (2007) have obtained this type of solution.
There are several methods for measuring thermal conductivity and diffusivity in the laboratory. The methods can basically be divided into steady-state and transient methods. A good summary of the most often used techniques is given by Beck (1988). Several techniques have been applied in measurements of thermal parameters in situ, such as 'passive' methods based on either temperature gradients in a borehole as indicators of lithologic (conductivity) variation Conaway and Beck(1977) annual temperature wave in the uppermost 15-30 m of bedrock for diffusivity determination Parasnis(1974); Tan and Ritchie(1997) or direct measurement of geothermal heat flow density and simultaneous temperature gradient in a drill hole which can be used
for in situ 18 conductivity estimation Oelsner and Rosler(1981); Jolivet and Vasseur(1982). Various active methods using either cylindrical, line or spherical sources for generating either a continuos heating signal or a heat pulse in the investigated medium have been developed for measurements in boreholes or soft sediments for terrestrial, marine and lunar studies (e.g. Beck et al(1971); Sass et al(1981); Mussman and Kessels, (1980); Langseth et al., (1972); Davis(1988).
The basic theory of heat conduction in a cylindrically symmetric geometry is developed by Carslaw and Jaeger (1959), Jaeger (1955, 1958,1959) and Blackwell
(1953, 1954, 1956). They discussed analytical solutions for an infinitely long conductive cylinder which produces heat dissipating to the surrounding medium. The molecules in a segment of a system at high temperature vibrate faster than the molecules in other regions of the same or anothers systems which are at lower temperatures. The molecules with higher motions strike the less energized molecules and transfer some of their energy to the molecules at the colder regions of the system. For example, heat is transferred by conduction from the cars bodywork to the materials inside the car which are in touch with the cars
The element having
Heat conduction rate into the element = Q(X)
Heat conduction rate out the element = Q(x+dX)
Net rate of heat conduction into the element Qnet = Q(X) Q(x+dX)
If the heat is generated within the element due to resistance heating, chemical or nuclear reaction etc. And the rate of volumetric heat generation is g (W/m3).
Then rate of energy generation, Qgen = g (A dX)
Due to unequal heat transfer to and from the element, its internal energy will change.
The rate of change of internal energy,
bodywork.
= =
(1)
Q(X+dX) = Q(X) + () dX + 2 () +
2
Where, T = F(X, t), temperature of element as function of time and direction,
0C,
g = G(X, t), the function of time and direction, W/m3,
k =K(X), the function of direction, W/m.K,
C =specific heat of the material (solid having only one specific heat), J/kg.K),
M = mass of the element = ( A dX), kg,
2 + 3() + 3 +…………………
3
2! 3!
If the control volume is considered small enough, then the higher powers of dX such as dX2, dX3, etc. are very small, therefore, neglected from above equation and it reduces to
Q(X+dX) = Q(X) + () dX (3)
Substituting this equation in eq(2)., we get
A = area of element normal to the heat
– () dX + gAdX = C AdX
(4)
transfer, m2,
= density of the material, kg/m3, t = time, s,
Substituting
Q(X) = -kA
dX = directional thickness of element, m.
Then, – {-kA }+ g = C
Making the energy balance on the element.
Net rate of heat gain by conduction + rate of energy generation = the net rate of change of internal energy.
If the conducting material is isotropic, its thermal conductivity is independent of direction; it is treated as constant quantity, then
1 {A }+ = C
(5)
Qnet + Qgen =
Or [Q(X) Q(X+dX)] + g A dX = C
Where = k/ C is known as thermal
AdX
According to Taylors series
(2)
diffusivity
The above eq.(5) is in general coordinate system. It is one dimensional time dependent differential equation for heat conduction with constant thermal
conductivity. It is known as unidirectional governing equation for heat conduction.
Substituting the value of constant in equation (7), we get
This above eq.(5) in particular coordinate system by introducing proper area A and directional thickness dX as described below.
If there is no internal heat generation within the material, the above equation reduces to:
T(x) = [ 2 1 ] x + T
1
q = – k
q = -k 2 1
Q = q * A
(8)
1 {
1
The heat conduction rate Q is given by
A } =
Q = -kA
2 1 (9)
It is known as unidirectional Fourier equation.
Therefore if the heat is not generated within the solid then it reduces to unidirectional Laplace equation.
In Cartesian coordinate
{ } = 0 (6)
Integrating the above , we get
= c
T(x) =Cx + C1 (7)
T (0) = T1 = C1
T (L) =T2 = C (L) + T1 C = (T2-T1)/L
Equation (1-9) is the solution for the rate of heat transfer through a one dimensional equation. The equation suggests that, under some limiting conditions, conduction of heat through a solid can be thought of as a flow that is driven by a temperature difference and resisted by a thermal resistance, in the same way that electrical current is driven by a voltage difference and resisted by an electrical resistance. Inspection of equation (1-7) suggests that the thermal resistance to conduction through a solid is given by:
Thermal resistance RTH =

Figure: Rectangular Block Section

Figure: Triangular Block section

Conduction Heat Transfer Definition

ASSUMPTIONS:

Material is isotropic.
Heat flow is in one dimension only.
There is no heat generation.
Steady state condition
1. Figure: Brass Material
  Figure: steel Material:
  Figure: Brass Material
  Figure: steel Material

Figure: Temperature grid in Brass Material