Wave Model of Electromagnetic Energy
An electromagnetic wave is composed of electric and magnetic vectors that are orthogonal to one another and travel from the source at the speed of light (3 x 108 m s-1).
Jensen, 2000
Spectral Bandwidths of Landsat and SPOT Sensor Systems
Jensen, 2000
Blackbody Radiation Curves
Blackbody radiation curves for several objects including the Sun and the Earth which approximate 6,000 ˚K and 300 ˚K blackbodies, respectively. Notice that as the temperature of the object increases, its dominant wavelength shifts toward the short wavelength portion of the spectrum.
Jensen, 2000
Radiant Intensity of the Sun
The Sun approximates a 6,000 K blackbody with a dominant wavelength of 0.5 m (green light). Earth approximates a 300 K blackbody with a dominant wavelength of 9.7 m . The 6,000 K Sun produces 41% of its energy in the visible region from 0.4 - 0.7 m (blue, green, and red light). The other 59% of the energy is in wavelengths shorter than blue light (<0.4 m) and longer than red light (>0.7 m). Eyes are only sensitive to light from the 0.4 to 0.7 m. Remote sensor detectors can be made sensitive to energy in the non-visible regions of the spectrum.
Jensen, 2000
Electromagnetic Spectrum
The Sun produces a continuous spectrum of energy from gamma rays to radio waves. The visible portion of the spectrum may be measured using wavelength (measured in nanometers or micrometers, i.e. nm or m) or electron volts (eV) terminology. All units are interchangeable.
0
0.5
1.0
1.5
2.0
2.5
3.0
3.5
4.0
violet limit
blue
green limit yellow orange red
Photon energy of visible light in
electron volts (eV) Photon wavelength in nanometers (nm)
400
450
550 580 600 650
10 -14
10 -8
10 -6
10 -2
10
Sun Earth
Gamma and x-ray
Ultraviolet
Infrared
Microwave and radio waves
Wavelength in meters (m)
Electromagnetic Spectrum and the Photon Energy of Visible Light
Visible
10 -12
3.10
2.75
2.252.142.061.91
10001.24
1.77 700 red limit
30k0.041
2.48 green 500
near-infrared
far infrared
ultraviolet
Jensen, 2000
Niels Bohr (1885-1962) and Max Planck recognized the discrete nature of exchanges of radiant energy and proposed the quantum theory of electromagnetic radiation. This theory states that energy is transferred in discrete packets called quanta or photons as discussed. The relationship between the frequency of radiation expressed by wave theory and the quantum is:
Q = h
where Q is the energy of a quantum measured in Joules (J), h is the Planck constant (6.626 x 10-34 J s-1), and is the frequency of the radiation.
Particle Model of Electromagnetic Energy
Referring to the previous formulas, we can multiply the equation by h/h, or 1, without changing its value:
= h c h
By substituting Q for h , we can express the wavelength associated with a quantum of energy as:
= h c / Q, or Q = h c /
Thus, the energy of a quantum is inversely proportional to its wavelength, i.e. the longer the wavelength involved, the lower its energy content.
Particle Model of Electromagnetic Energy
The Energy of Quanta (Photons)
The energy of quanta (photons) ranging from gamma rays to radio waves in the electromagnetic spectrum.
The Creation of Light(a-c) A photon of electromagnetic energy is emitted when an electron in an atom or molecule drops from a higher energy state to a lower energy state. The type of light emitted (i.e. its wavelength) is a function of the changes in the energy levels of the outer, valence electron. (d) Matter can also be subjected to such high temperatures that electrons that normally move in captured, nonradiating orbits are broken free. When this happens, the atom remains with a positive charge equal to the negatively charged electron which escaped. The electron becomes a free electron and the atom is called an ion. If another free electron fills the vacant energy level created by the free electron, then radiation from all wavelengths is produced, i.e. a continuous spectrum of energy. The intense heat at the surface of the Sun produces a continuous spectrum in this manner.
Photon of light
is absorbed
The emission of an electron carrying the
same amount of energy
Creation of Light from Atomic Particles and the Photoelectric Effect
Photon of light is emitted when an
electron drops from a higher energy state to a lower energy state
1 2 3 4 5
1 2 3 4 5
4 5
Ground state a.
Excitation - photon is absorbed
b.
De-excitation - quantum leap
c.
1 2
Electron
Proton
Photoelectric effect d.
1 2
3
3
1 2 3
Creation of Light
After being energized by several thousand volts of electricity, the outermost electron in each energized atom of sodium vapor climbs to a high rung on the energy latter and then returns down the ladder in a predictable fashion. The last two rungs in the descent are 2.1 eV apart. This produces a photon of yellow light which has 2.1 eV of energy.
The Creation of Light from Atomic Particles The SodiumVapor Lamp
Energy change in electron volts (eV)
Atom's energy loss is 2.1 eV when an
excited electron falls back to an orbit
closer to the nucleus
0 1 2 3 4
Emits a photon of yellow
light (2.1 eV)
Nucleus
Sodium Atom
Electron Orbit
Electron
AtmosphericScattering
The type of scattering is a function of:
• the wavelength of the incident radiant energy, and
• the size of the gas molecule, dust particle, or water vapor droplet encountered.
Atmospheric Scattering
Diameter
Rayleigh Scattering
Mie Scattering
Non-Selective Scattering
Gas molecule
Smoke, dust
Water vapor
Photon of electromagnetic energy modeled as a wave
a.
c.
b.
RayleighScattering
The intensity of Rayleigh scattering varies inversely with the fourth power of the wavelength (-4).
0.4 0.5 0.6 0.7
100
20
40
60
80
0
Inte
nsity
of S
catt
ered
Lig
ht
3 2.75 2.5 2.25 2 1.75
Wavelength in Micrometers
Intensity of Rayleigh Scattering Varies Inversely with -4
V B G Y O R
Energy in electron volts (eV)
AtmosphericRefraction
Refraction in three non-turbulent atmospheric layers. The incident radiant energy is bent from its normal trajectory as it travels from one atmospheric layer to another. Snell's law can be used to predict how much bending will take place based on a knowledge of the angle of incidence and the optical density of each atmospheric level.
1
2
3
Optically less dense atmosphere
Optically more dense atmosphere
Optically less dense atmosphere
Path of energy in
homogeneous atmosphere
3 n
n 1 = index of refraction for this layer of the atmosphere
n 2
Incident radiant energy
Normal to the surface
Path of radiant energy affected by atmospheric refraction
Atmospheric Refraction
Absorption
• Absorption is the process by which radiant energy is absorbed and converted into other forms of energy. An absorption band is a range of wavelengths (or frequencies) in the electromagnetic spectrum within which radiant energy is absorbed by substances such as water (H2O), carbon dioxide (CO2), oxygen (O2), ozone (O3), and nitrous oxide (N2O).
• The cumulative effect of the absorption by the various constituents can cause the atmosphere to close down in certain regions of the spectrum. This is bad for remote sensing because no energy is available to be sensed.
Absorption
• In certain parts of the spectrum such as the visible region (0.4 - 0.7 m), the atmosphere does not absorb all of the incident energy but transmits it effectively. Parts of the spectrum that transmit energy effectively are called “atmospheric windows”.
• Absorption occurs when energy of the same frequency as the resonant frequency of an atom or molecule is absorbed, producing an excited state. If, instead of re-radiating a photon of the same wavelength, the energy is transformed into heat motion and is reradiated at a longer wavelength, absorption occurs. When dealing with a medium like air, absorption and scattering are frequently combined into an extinction coefficient.
• Transmission is inversely related to the extinction coefficient times the thickness of the layer. Certain wavelengths of radiation are affected far more by absorption than by scattering. This is particularly true of infrared and wavelengths shorter than visible light.
Absorption of the Sun's Incident Electromagnetic Energy in the Region from 0.1 to 30 m by Various Atmospheric Gases
Jensen, 2000
Reflectance
Reflectance is the process whereby radiation “bounces off” an object like a cloud or the terrain. Actually, the process is more complicated, involving reradiation of photons in unison by atoms or molecules in a layer one-half wavelength deep.
• Reflection exhibits fundamental characteristics that are important in remote sensing. First, the incident radiation, the reflected radiation, and a vertical to the surface from which the angles of incidence and reflection are measured all lie in the same plane. Second, the angle of incidence and the angle of reflection are equal.
Reflectance
There are various types of reflecting surfaces:
• When specular reflection occurs, the surface from which the radiation is reflected is essentially smooth (i.e. the average surface profile is several times smaller than the wavelength of radiation striking the surface).
• If the surface is rough, the reflected rays go in many directions, depending on the orientation of the smaller reflecting surfaces. This diffuse reflection does not yield a mirror image, but instead produces diffused radiation. White paper, white powders and other materials reflect visible light in this diffuse manner.
• If the surface is so rough that there are no individual reflecting surfaces, then scattering may occur. Lambert defined a perfectly diffuse surface; hence the commonly designated Lambertian surface is one for which the radiant flux leaving the surface is constant for any angle of reflectance to the surface normal.
Reflectance
Perfect Specular Reflector Near-Perfect Specular Reflector
Perfect Diffuse Reflector A Lambertian Surface
Specular Versus Diffuse Reflectance
d.
Angle of Incidence
Angle of Exitance
Angle of Incidence
Angle of Exitance
a. c. smooth water
Near-Perfect Diffuse Reflector
b.
Spectral Reflectance Curves of Selected Materials
Jensen, 2000
The concept of radiant flux density for an area on the surface of the earth. Irradiance is a measure of the amount of incoming energy in Watts m-2. Exitance is a measure of the amount of energy leaving in Watts m-2.
Irradiance
Area, A
Radiant flux, Concept of Radiant Flux Density
E =
Area, A
Exitance
Radiant flux,
M =
The concept of radiance leaving a specific projected source area on the ground, in a specific direction, and within a specific solid angle.This is the most precise radiometric measurement used in remote sensing.Side view
of Source Area, A
Projected Source Area =
Normal to Surface Radiant flux,
Solid Angle,
L
Concept of Radiance
A Cos
A Cos
Nominal Spatial and Temporal Resolution of
Remote Sensor Data Required to Extract
Urban/Suburban Infrastructure Information
2 y3 y4 y
Quickbird (2000) 0.82 x 0.82 3.28 x 3.28
0.2 1.0 2 3 5 10 2 3 5 102 103 104 2 3 5 2 3 5
10
102
103
104
2 3
5 8
2 3
5
2 3
5
2 3 5
2 3
5
9 d
1 d
1 hr
1 m 10 30 100 m 1 km
1000 m 5 km 10 km
12 hr
8105
8
8
8
.80.5
3 d2 d
4 d
532
23
58
106
1 y
23
58
107
5 y
10 y
15 20
4 8
26 d
44 d 55 d
METEOSAT VISIR 2.5 x 2.5 km
TIR 5 x 5 km
AVHRR LAC 1.1 x 1.1 km
GAC 4 x 4 km
JERS-1 MSS 18 x 24
L-band 18 x 18
Aerial Photography < 0.25 x 0.25 m (0.82 x 0.82 ft.)
1 x 1 m (3.28 x 3.28 ft.)
RADARSAT C-band 11-9, 9 25 x 28
48-30 x 28 32-25 x 28
50 x 50 22-19 x 28 63-28 x 28 100 x 100
EOSAT/Space Imaging IKONOS (1999)
Pan 1 x 1 MSS 4 x 4
IRS-P5 (1999) Pan 2.5 x 2.5
ORBIMAGE
OrbView 3 (1999) Pan 1 x 1 MSS 4 x 4
OrbView 4 (2000) Pan 1 x 1 MSS 4 x 4
Hyperspectral 8 x 8 m
22 d 16 d
IRS-1 AB LISS-1 72.5 x 72.5
LISS-2 36.25 x 36.25 IRS-1CD
Pan 5.8 x 5.8 LISS-3 23.5 x 23.5; MIR 70 x 70
WiFS 188 x 188
10,000 min
100 min
5 d
30 d
180 d
T3
C1
15 y
DE1, E2
T4
0.3
LANDSAT 4,5 MSS 79 x 79 TM 30 x 30
LANDSAT 7 ETM+ (1999) Pan 15 x 15; MSS 30 x 30
TIR 60 x 60
E1
L4
M5
T1, U1
LI
SPOT HRV 1,2,3,4 Pan 10 x10
MSS 20 x 20 SPOT 5 HRG (2001; not shown)
Pan 2.5 x 2.5; 5 x 5 MSS 10 x 10; SWIR 20 x 20
1 m0.3 5 100 m10 20
Nominal Spatial Resolution in meters
30
SPIN-2 KVR-1000 2 x 2 TK-350 10 x 10
C2
DE2
DE3 DE4 DE5
L3
0.5
S2
L2S1
D1 D2
S3
1,000 min
min
Tem
pora
l R
esol
utio
n in
min
utes
SPOT 4 Vegetation
1 x 1 km
T2U2U3
B1
M1M2
ERS-1,2 C-band 30 x 30
GOES VIS 1 X 1 km TIR 8 x 8 km
NWS WSR-88D Doppler Radar
1 x 1 km 4 x 4 km
ORBIMAGE OrbView 2 SeaWiFS
1.13 x 1.13 km
ASTER (1999) EOS AM-1
VNIR 15 x 15 m SWIR 30 x 30 m TIR 90 x 90 m
MODIS (1999) EOS AM-1
Land 0.25 x 0.25 km Land 0.50 x 0.50 km
Ocean 1 x 1 km Atmo 1 x 1 km TIR 1 x 1 km
M3M4
Jensen, 2000