Mechanical Engineering Exam  >  Mechanical Engineering Notes  >  Heat Transfer  >  PPT: Radiative Heat Transfer

PPT: Radiative Heat Transfer | Heat Transfer - Mechanical Engineering PDF Download

Download, print and study this document offline
Please wait while the PDF view is loading
 Page 1


Radiation Heat Transfer
Page 2


Radiation Heat Transfer
Contrast in Radiative Mode of Heat Transfer
 Any body (> absolute zero) emits radiation at various
wavelengths.
 Transparent bodies radiate energy in spherical space.
 Non-transparent bodies radiate energy in hemi-spherical
space.
 The radiation energy emitted by a body is distributed in
space at various wavelengths.
 This complex phenomenon requires simplified laws for
engineering use of radiation.
Page 3


Radiation Heat Transfer
Contrast in Radiative Mode of Heat Transfer
 Any body (> absolute zero) emits radiation at various
wavelengths.
 Transparent bodies radiate energy in spherical space.
 Non-transparent bodies radiate energy in hemi-spherical
space.
 The radiation energy emitted by a body is distributed in
space at various wavelengths.
 This complex phenomenon requires simplified laws for
engineering use of radiation.
Planck Radiation Law
 The primary law governing blackbody radiation is the Planck
Radiation Law.
 This law governs the intensity of radiation emitted by unit surface area
into a fixed direction (solid angle) from the blackbody as a function of
wavelength for a fixed temperature.
 The Planck Law can be expressed through the following equation.
()
1
1 2
,
5
2
-
=
kT
hc
e
hc
T E
l
l
l
h = 6.625 X 10
-27
erg-sec (Planck Constant)
K = 1.38 X 10
-16
erg/K (Boltzmann Constant)
C = Speed of light in vacuum
Page 4


Radiation Heat Transfer
Contrast in Radiative Mode of Heat Transfer
 Any body (> absolute zero) emits radiation at various
wavelengths.
 Transparent bodies radiate energy in spherical space.
 Non-transparent bodies radiate energy in hemi-spherical
space.
 The radiation energy emitted by a body is distributed in
space at various wavelengths.
 This complex phenomenon requires simplified laws for
engineering use of radiation.
Planck Radiation Law
 The primary law governing blackbody radiation is the Planck
Radiation Law.
 This law governs the intensity of radiation emitted by unit surface area
into a fixed direction (solid angle) from the blackbody as a function of
wavelength for a fixed temperature.
 The Planck Law can be expressed through the following equation.
()
1
1 2
,
5
2
-
=
kT
hc
e
hc
T E
l
l
l
h = 6.625 X 10
-27
erg-sec (Planck Constant)
K = 1.38 X 10
-16
erg/K (Boltzmann Constant)
C = Speed of light in vacuum
Monochromatic emissive power E
l
 All surfaces emit radiation in many wavelengths and some,
including black bodies, over all wavelengths.
 The monochromatic emissive power is defined by:
 dE = emissive power in the wave band in the infinitesimal
wave band between l and l+dl.
( ) l l d T E dE , =
The monochromatic emissive power of a blackbody is given by:
()
1
1 2
,
5
2
-
=
kT
hc
e
hc
T E
l
l
l
Page 5


Radiation Heat Transfer
Contrast in Radiative Mode of Heat Transfer
 Any body (> absolute zero) emits radiation at various
wavelengths.
 Transparent bodies radiate energy in spherical space.
 Non-transparent bodies radiate energy in hemi-spherical
space.
 The radiation energy emitted by a body is distributed in
space at various wavelengths.
 This complex phenomenon requires simplified laws for
engineering use of radiation.
Planck Radiation Law
 The primary law governing blackbody radiation is the Planck
Radiation Law.
 This law governs the intensity of radiation emitted by unit surface area
into a fixed direction (solid angle) from the blackbody as a function of
wavelength for a fixed temperature.
 The Planck Law can be expressed through the following equation.
()
1
1 2
,
5
2
-
=
kT
hc
e
hc
T E
l
l
l
h = 6.625 X 10
-27
erg-sec (Planck Constant)
K = 1.38 X 10
-16
erg/K (Boltzmann Constant)
C = Speed of light in vacuum
Monochromatic emissive power E
l
 All surfaces emit radiation in many wavelengths and some,
including black bodies, over all wavelengths.
 The monochromatic emissive power is defined by:
 dE = emissive power in the wave band in the infinitesimal
wave band between l and l+dl.
( ) l l d T E dE , =
The monochromatic emissive power of a blackbody is given by:
()
1
1 2
,
5
2
-
=
kT
hc
e
hc
T E
l
l
l
Wein’s Displacement Law:
 At any given wavelength, the black body monochromatic
emissive power increases with temperature.
 The wavelength l
max
at which is a maximum decreases as
the temperature increases.
 The wavelength at which the monochromatic emissive
power is a maximum is found by setting the derivative of
previous Equation  with respect to l.
()
0
1
1 2
,
max
max
5
2
=
ï
þ
ï
ý
ü
ï
î
ï
í
ì
-
=
l
l
l
l
l
l
l
d
e
hc
d
d
T dE
kT
hc
mK T m l 8 . 2897
max
=
Read More
57 videos|77 docs|86 tests

Top Courses for Mechanical Engineering

57 videos|77 docs|86 tests
Download as PDF
Explore Courses for Mechanical Engineering exam

Top Courses for Mechanical Engineering

Signup for Free!
Signup to see your scores go up within 7 days! Learn & Practice with 1000+ FREE Notes, Videos & Tests.
10M+ students study on EduRev
Related Searches

Semester Notes

,

shortcuts and tricks

,

Exam

,

Viva Questions

,

practice quizzes

,

past year papers

,

PPT: Radiative Heat Transfer | Heat Transfer - Mechanical Engineering

,

PPT: Radiative Heat Transfer | Heat Transfer - Mechanical Engineering

,

Important questions

,

Objective type Questions

,

pdf

,

Free

,

mock tests for examination

,

MCQs

,

Previous Year Questions with Solutions

,

ppt

,

Extra Questions

,

study material

,

video lectures

,

Summary

,

PPT: Radiative Heat Transfer | Heat Transfer - Mechanical Engineering

,

Sample Paper

;