blackbody radiation the photoelectric effect …...phys 2435: chap. 38, pg 4 planck radiation law...
TRANSCRIPT
![Page 1: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/1.jpg)
Phys 2435: Chap. 38, Pg 1
Blackbody radiationBlackbody radiation The photoelectric effectThe photoelectric effect Compton effectCompton effect Line spectraLine spectra Nuclear physics/Bohr modelNuclear physics/Bohr model LasersLasers Quantum mechanicsQuantum mechanics
![Page 2: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/2.jpg)
Phys 2435: Chap. 38, Pg 2
Blackbody radiationBlackbody radiation
New Topic
![Page 3: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/3.jpg)
Phys 2435: Chap. 38, Pg 3
Planck radiation law for blackbody radiationPlanck radiation law for blackbody radiation
Wien displacement law:
!mT = 2.90 "10
#3m $K
Stefan-Boltzmann law:
I = !T4
Actual:Predicted:
Rayleigh-Jeans (correct at long wavelength):
I(!) =2"ckT
!4
BoltzmannConst.
“ultraviolet catastrophe”
![Page 4: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/4.jpg)
Phys 2435: Chap. 38, Pg 4
Planck radiation lawPlanck radiation law
Planck, in order to explain these laws had to resortto an “act of desperation”. He assumed the energy of the atoms in the wall were “quantized”:
E = nhf, n = 1,2,3,...
“Planck’s constant”: h = 6.626 x 10-34 J.s
Intensity as a function of wavelength, I(λ):
Contains Stefan-Boltzmann, Wien, and Rayleigh-Jeans lawsas special cases.
![Page 5: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/5.jpg)
Phys 2435: Chap. 38, Pg 5
Photoelectric effectPhotoelectric effect
New Topic
![Page 6: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/6.jpg)
Phys 2435: Chap. 38, Pg 6
Photoelectric effectPhotoelectric effect
Problem: Electron not discovered untilProblem: Electron not discovered until1897!1897!
Photoelectric effect observed in 1887Photoelectric effect observed in 1887Proportional to number of electrons. Notice: V0 independent of intensity.
Measures maximum kinetic energy of electrons; V0 a linear function of f.
Light
![Page 7: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/7.jpg)
Phys 2435: Chap. 38, Pg 7
Planck and Einstein to the rescue!Planck and Einstein to the rescue!
A purely “classical” relation
Planck relation; reinterpretedby Einstein
φ is the “work function”, the minimum energy needed to remove an electron
1eV = 1.60 x 10-10 J
Kmax
=1
2m
evmax
2= (!e)(!V
0)
Max Planck, Nobel Prize, 1918)
![Page 8: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/8.jpg)
Phys 2435: Chap. 38, Pg 8
Compton effectCompton effect
New Topic
![Page 9: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/9.jpg)
Phys 2435: Chap. 38, Pg 9
Compton effectCompton effect A.H. Compton, Nobel Prize, 1927.
Production Compton’s experiment
![Page 10: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/10.jpg)
Phys 2435: Chap. 38, Pg 10
Compton effectCompton effect
Putting
E = pc and
E = hf together yields
p =hf
c=h
!Photons
=>The wavelength shift calculated holds for the scattering offree electrons, But of course the electrons in an atom arebound to the nucleus. However, X-ray energies are muchlarger than the atomic binding energy, this treatment is stillvery accurate.
![Page 11: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/11.jpg)
Phys 2435: Chap. 38, Pg 11
ConcepTestConcepTest 38. 38.33(Post) Compton scatteringCompton scattering
(1) has the same wavelength asthe incident photon
(2) has a longer wavelength thanthe incident photon
(3) has a shorter wavelengththan the incident photon
As a result of ComptonAs a result of Comptonscattering, the scatteredscattering, the scatteredphotonphoton
![Page 12: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/12.jpg)
Phys 2435: Chap. 38, Pg 12
Line spectraLine spectra
New Topic
![Page 13: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/13.jpg)
Phys 2435: Chap. 38, Pg 13
Line SpectraLine Spectra
Lamp (all frequencies) Specific gas (line) spectrum
![Page 14: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/14.jpg)
Phys 2435: Chap. 38, Pg 14
Hydrogen spectrumHydrogen spectrum
Purely “numerology”.4 Balmer lines visible;Lyman in the ultraviolet,Pashen, etc. in the infrared.
![Page 15: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/15.jpg)
Phys 2435: Chap. 38, Pg 15
Hydrogen energy levelsPossible model
![Page 16: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/16.jpg)
Phys 2435: Chap. 38, Pg 16
Nuclear physics/Bohr modelNuclear physics/Bohr model
New Topic
![Page 17: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/17.jpg)
Phys 2435: Chap. 38, Pg 17
The The ffirst irst nnuclear experimentuclear experiment
Rutherford (Nobel Prize, Chemistry,1908)
“fruitcake” model experiment!
![Page 18: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/18.jpg)
Phys 2435: Chap. 38, Pg 18
“It was almost as incredible as if you had firedA 15-inch shell at a,piece of tissue paper andIt came back and hit you.”
![Page 19: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/19.jpg)
Phys 2435: Chap. 38, Pg 19
The The nnucleusucleus
Z: “Atomic number”Number of protons
A: “Mass number”Number of protonsand neutrons
Notation: AZ
Isotopes consist of different nuclei withSame Z, different N.
A = Z + N
![Page 20: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/20.jpg)
Phys 2435: Chap. 38, Pg 20
Bohr modelBohr model
Combine Newton’s inverse square law
With Bohr’s “ad hoc” assumption
F =1
4!"0
e2
rn
2
Ln
= mvnrn
= nh
2!; n = 1,2,3,...
We obtain
En
= !me
4
8"0
2h2
1
n2
! R =me
4
8"0
2h3c
“Reduced mass” does even better!
![Page 21: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/21.jpg)
Phys 2435: Chap. 38, Pg 21
Energy levels are complex! (Sodium)Energy levels are complex! (Sodium)
![Page 22: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/22.jpg)
Phys 2435: Chap. 38, Pg 22
Bohr model is wrong!Bohr model is wrong!
Although the Bohr model was correct inpredicting the energy levels of hydrogen, it is apatchwork classical/quantum beast. If oneattempts to apply it to other atoms, there arepersistent discrepancies. It also makes a wrongprediction about hydrogen: that it has a magneticmoment in the ground state, L1=h/2π. The angularmomenta ARE quantized, but the ground statehas L1 = 0. The picture of orbiting electrons,essentially like planets around the sun, is simplywrong!!
N. Bohr, Nobel Prize 1922.
![Page 23: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/23.jpg)
Phys 2435: Chap. 38, Pg 23
LasersLasers
New Topic
![Page 24: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/24.jpg)
Phys 2435: Chap. 38, Pg 24
LasersLasers
Relevant concepts: population inversion, metastable state, stimulated emission, optical cavity
For types of lasers, click here
![Page 25: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/25.jpg)
Phys 2435: Chap. 38, Pg 25
Quantum mechanicsQuantum mechanics
New Topic
![Page 26: Blackbody radiation The photoelectric effect …...Phys 2435: Chap. 38, Pg 4 Planck radiation law Planck, in order to explain these laws had to resort to an “act of desperation”](https://reader030.vdocuments.site/reader030/viewer/2022040400/5e6ffce5c712105d8f1be276/html5/thumbnails/26.jpg)
Phys 2435: Chap. 38, Pg 26
On the road to Quantum Mechanics
p =hf
c=h
!
The relation (photons asparticles)
also applies to electrons (particlesas waves) and all other particles. Due to L. DeBroglie (1925).
an
•
i! !"!t
= - !
2
2m !2"!x
2+!2"!y
2+!2"!z
2
#
$ %
&
' (
Ψ(x,y,z,t) is the particle“wavefunction”. Schrodingerequation:
..
=> Wave-particle duality
=> Principle of complimentarity