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Transcript
Chapter 27
Quantum Physics
Quantum Physics I
Sections 1–3
General
Physics
Need for Quantum Physics
 Other problems remained in classical physics
which relativity did not explain
 Blackbody Radiation
– The electromagnetic radiation emitted by a heated object
 Photoelectric Effect
– Emission of electrons by an illuminated metal
 Compton Effect
– A beam of x-rays directed toward a block of graphite
scattered at a slightly longer wavelength
 Spectral Lines
– Emission of sharp spectral lines by gas atoms in an
electric discharge tube
General
Physics
Development of Quantum
Physics
 Beginning in 1900
– Development of ideas of quantum physics
• Also called wave mechanics
• Highly successful in explaining the behavior of atoms,
molecules, and nuclei
 Involved a large number of physicists
General
Physics
Particles vs. Waves
PARTICLE properties







individual motion
position(time) – localized
velocity v = x / t
mass
energy, momentum
dynamics: F=ma
interaction – collisions
 quantum states
 spin
WAVE properties











collective motion
wavelength (freq) – periodic
velocity v =  f
dispersion
energy, momentum
dynamics: wave equation
interference – superposition
reflection, refraction, trans.
diffraction – Huygens
standing waves – modes
polarization
General
Physics
Blackbody Radiation
 An object at any temperature emits
electromagnetic radiation
– Sometimes called thermal radiation
– Stefan’s Law describes the total power
radiated
4
Power  T
– The spectrum of the radiation depends on
the temperature and properties of the
object
General
Physics
General
Physics
General
Physics
 IR heat lamp
 Red hot
 Night vision
 Silver heat shield
 Space blanket
General
Physics
General
Physics
General
Physics
Blackbody Radiation Graph
 Experimental data for distribution of
energy in blackbody radiation
 As the temperature increases, the
total amount of energy increases
– Shown by the area under the curve
 As the temperature increases, the
peak of the distribution shifts to
shorter wavelengths
 The wavelength of the peak of the
blackbody distribution was found to
follow Wein’s Displacement Law
– λmax T = 0.2898 x 10-2 m • K
• λmax is the wavelength at which the
curve’s peak
• T is the absolute temperature of the
object emitting the radiation
Active Figure: Blackbody Radiation
General
Physics
The Ultraviolet Catastrophe
 Classical theory did not match
the experimental data
 At long wavelengths, the match
is good
 At short wavelengths, classical
theory predicted infinite energy
 At short wavelengths,
experiment showed no energy
 This contradiction is called the
ultraviolet catastrophe
General
Physics
Max Planck
 1858 – 1947
 Introduced a “quantum
of action” now known
as Planck’s constant
 Awarded Nobel Prize
in 1918 for discovering
the quantized nature of
energy
General
Physics
Planck’s Resolution
 Planck hypothesized that the blackbody radiation
was produced by resonators
– Resonators were submicroscopic charged oscillators
 The resonators could only have discrete energies
– En = n h ƒ
• n is called the quantum number
• ƒ is the frequency of vibration
• h is Planck’s constant, h = 6.626 x 10-34 J s
 Key Point: quantized energy states
 Few high energy resonators populated
Active Figure: Planck's Quantized Energy States
General
Physics
Photoelectric Effect
 When light is incident on certain metallic
surfaces, electrons are emitted from the surface
– This is called the photoelectric effect
– The emitted electrons are called photoelectrons
 The effect was first discovered by Hertz
 The successful explanation of the effect was
given by Einstein in 1905
– Received Nobel Prize in 1921 for paper on
electromagnetic radiation, of which the
photoelectric effect was a part
General
Physics
Photoelectric Effect Schematic
 When light strikes E, photoelectrons
are emitted
 Electrons collected at C and passing
through the ammeter are a current in
the circuit
 C is maintained at a positive
potential by the power supply
 The current increases with intensity,
until reaching a saturation level
 No current flows for voltages less
than or equal to –ΔVs, the stopping
potential
 The maximum kinetic energy of the
photoelectrons is related to the
stopping potential: KEmax = eVs
Active Figure: The Photoelectric Effect
General
Physics
Features Not Explained by Classical
Physics/Wave Theory
 The stopping potential Vs (maximum kinetic energy
KEmax) is independent of the radiation intensity
 Instead, the maximum kinetic energy KEmax of the
photoelectrons depends on the light frequency
 No electrons are emitted if the incident light frequency
is below some cutoff frequency that is characteristic of
the material being illuminated
 Electrons are emitted from the surface almost
instantaneously, even at very low intensities
General
Physics
Einstein’s Explanation
 A tiny wave packet of light energy, called a photon,
would be emitted when a quantized oscillator jumped
from one energy level to the next lower one
– Extended Planck’s idea of quantization to E.M. radiation
 The photon’s energy would be E = hƒ
 Each photon can give all its energy to an electron in the
metal
 The maximum kinetic energy of the liberated
photoelectron is KEmax = hƒ – f
 f is called the work function of the metal – it is the energy
needed by the electron to escape the metal
General
Physics
Explains Classical “Problems”
 KEmax = hƒ – f
– The effect is not observed below a certain cutoff
frequency since the photon energy must be greater
than or equal to the work function – without enough
energy, electrons are not emitted, regardless of the
intensity of the light
– The maximum KE depends only on the frequency
and the work function, not on the intensity
– The maximum KE increases with increasing
frequency
– The effect is instantaneous since there is a one-toone interaction between the photon and the electron
General
Physics
Verification of Einstein’s
Theory
 Experimental
observations of a
linear relationship
between KEmax and
frequency ƒ confirm
Einstein’s theory
 The x-intercept is the
cutoff frequency
– KEmax
= 0 → fc 
KEmax = hƒ – f
f
h
General
Physics
Cutoff Wavelength
 The cutoff wavelength is related to the
work function
hc
c 
f
 Wavelengths greater than C incident on a
material with a work function f don’t
result in the emission of photoelectrons
General
Physics
Photocells
 Photocells are an application of the
photoelectric effect
 When light of sufficiently high frequency
falls on the cell, a current is produced
 Examples
– Streetlights, garage door openers, elevators
General
Physics
X-Rays
 Electromagnetic radiation with short
wavelengths
– Wavelengths less than for ultraviolet
– Wavelengths are typically about 0.1 nm
– X-rays have the ability to penetrate most materials
with relative ease
– High energy photons which can break chemical
bonds – danger to tissue
 Discovered and named by Roentgen in 1895
General
Physics
Production by an X-Ray Tube
 X-rays are produced when
high-speed electrons are
suddenly slowed down
– Can be caused by the electron
striking a metal target
 A current in the filament
causes electrons to be
emitted
 These freed electrons are
accelerated toward a dense
metal target
 The target is held at a higher
potential than the filament
General
Physics
X-ray Tube Spectrum
 The x-ray spectrum has two
distinct components
 Continuous broad spectrum
– Depends on voltage applied to
the tube
– Cutoff wavelength
– Called bremsstrahlung
(“braking”) radiation
 The sharp, intense lines
depend on the nature of the
target material
General
Physics
Production of X-rays, 2
 An electron passes near a
target nucleus
 The electron is deflected
from its path by its
attraction to the nucleus
– This produces an
acceleration
 It will emit
electromagnetic radiation
when it is accelerated
General
Physics
Wavelengths Produced
 If the electron loses all of its energy in the
collision, the initial energy of the electron is
completely transformed into a photon
 The wavelength can be found from
eV  hƒmax 
hc
min
 Not all radiation produced is at this wavelength
– Many electrons undergo more than one collision
before being stopped
– This results in the continuous spectrum produced
General
Physics
X-ray Applications, Three-Dimensional
Conformal Radiation Therapy (3D-CRT)




Tumors usually have an irregular shape
Three-dimensional conformal radiation
therapy (3D-CRT) uses sophisticated
computers and CT scans and/or MRI scans
to create detailed 3-D representations of the
tumor and surrounding organs
Radiation beams are then shaped exactly to
the size and shape of the tumor
Because the radiation beams are very
precisely directed, nearby normal tissue
receives less radiation exposure
General
Physics