Quantum Properties of Light: Difference between revisions

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Planck Relation
<b>Giovanny Espitia, </b>
<b>Spring 2022</b>
[[File:Palma.png|border|right]]


Short Description of Topic
==Why do we need a quantum interpretation? (History)==
The Planck Relation helps us to be able to figure out the energy of a photon based on its frequency of radiation.
 
In the latter part of the 19th century, the classical description of light that had prevailed since the 17th century, began to fail in its explanatory power for the ever more precise measurements and phenomena being performed and observed in laboratories. The prime example of such failure is the so - called <b>Ultraviolet Catastrophe</b>. This term was first used by Paul Ehrenfest to refer to Rayleigh - Jeans law ability to predict experimental results below energies of <math>10^{5}</math> and its sudden unexplained divergence at energies close to the ultraviolet range in the electromagnetic spectrum. Such discrepancies called for a more fundamental description of light. Fortunately, in the year 1900, Max Planck through his introduction of an ad - hoc assumption, was able to correctly explained the Black - body radiation problem. Planck later referred to such ad - hoc assumption as an "act of desperation". Moreover, in 1905, Einstein further validated the assumption made by Planck in his solution for the Black - body problem. The assumption was to treat light as if it came in discrete - packets later referred to as "Quanta". With such assumption, Einstein made further progress in explaining past experiments such as the Photoelectric effect first observed by Hertz in the latter part of the 19th century.


==The Main Idea==
==The Main Idea==


State, in your own words, the main idea for this topic
Einstein, Planck, and Compton showed the explanatory power of giving light a discrete or quantum interpretation. In his theory of the photoelectric effect, Einstein showed that the energy <math>E</math> of a photon is simply the product <math>h\nu</math>, where <math>h</math> is Planck’s constant and <math>\nu</math> is the frequency of the photon.
The energy of a photon is related to the frequency of its radiation by Planck's constant, h. This has a value of 6.626*10^-34 Joules*seconds. Planck's relation allows us to find the energy of a photon, or its frequency (the inverse of wavelength) of its radiation.
As mentioned before, such treatment was allowed for the understanding of problems such as the Black - body, the Photoelectrons, and the scattering of electrons upon the contact of high energy electromagnetic radiation and light.
 
===Mathematical Model===
 
====The energy of a photon====
 
<math>E = h\nu</math>
Where:<ol><li><math>h = 6.626*10^{-34}</math></li><li><math>\nu = \frac{c}{\lambda}</math></li></ol>
Here, <math>c</math> is the speed of light and <math> \lambda </math> is the wavelength of the photon.
 
Frequency - Wavelength Relationship:
 
<math>c = \lambda\nu</math>
 
====Linear momentum of a photon====
In the classical perspective, a photon should not carry any momentum since it is a massless boson. However, Einstein showed us through the following relationship that the former statement is not true.
 
<math>E = cp</math>
 
Where <math>c</math> is the speed of light and <math>p</math> is the momentum of the photon.
 
Therefore and according to the energy of a photon expression introduced in the previous subsection
 
<math>E = h\nu = cp</math>
 
Solving for <math>p</math>,
 
<math>p = \frac{h\nu}{c}</math>
 
Interestingly, if we rearrange the above expression in terms of wavelength, we arrive at the same result as De Broglie for the wavelength of a matter wave. This is done as follows:
 
<math>p = \frac{h\nu}{c}</math>
 
Using the frequency - wavelength relationship introduced in a previous section, we make the appropriate substitution. Namely,
 
<math>p = \frac{h\nu}{c} = \frac{h}{\lambda}</math>
 
The last step, is simply to solve for <math>\lambda</math>. This step is left as an exercise to the reader.


===A Mathematical Model===  
====Pair Production====
When a photon has energy in the gamma - ray region of the electromagnetic spectrum and is close to an atomic nucleus, the product of such interaction often results in an electron - positron pair. A positron is the electron’s analog in antimatter. In other words, both have equal mass but a differing charge. This is often expressed as follows:


What are the mathematical equations that allow us to model this topic.  For example <math>{\frac{d\vec{p}}{dt}}_{system} = \vec{F}_{net}</math> where '''p''' is the momentum of the system and '''F''' is the net force from the surroundings.
<math>\gamma \rightarrow e^{-} + e^{+}</math>


===A Computational Model===
Where <math>\lambda</math> is the symbol for the photon and <math>e^{-}, e^{+}</math> are the symbols for the electron and positron, respectively. In order for pair - production to occur, the photon’s energy, <math>h\nu</math> must be larger than the rest mass energy, <math>2m_{e}c^{2}</math>, of the two particles.


Hyper physics has a program that allows users to input wavelength, frequency, or energy and find out the other two values. http://hyperphysics.phy-astr.gsu.edu/hbase/mod2.html#c3
==Computational Model==
For a model concerned with the quantum nature of light in terms of the double slit experiment, please access this website: https://ophysics.com/l4.html


==Examples==
==Examples==


Be sure to show all steps in your solution and include diagrams whenever possible
====Simple====
An FM radio transmitter has a power output of 100 kW and operates at a frequency of 94 MHz. Compute the number of photons per second emitted by the transmitter.
 
<b>Solution</b>
 
We begin by computing the energy of the photon using the formula <math>E = h\nu</math>. In this case, the frequency is 94 MHz. Therefore,
 
<math>E = h\nu = (94\;MHz)\cdot 6.626e^{-34} = 6.23e^{-26}\;J</math>
 
The radio transmitter emits energy at a rate of 100 KJ/s. Thus,


===Simple===
<math>\frac{number\;of\;photons}{unit\;time} = \frac{energy/unit\;time}{energy/photon} = 1.61e^{30}\;s^{-1}</math>


What is the energy in a single photon of yellow light?
====Not trivial====
Orange light has a frequency of 435.75 THz.


E=hv
A light source of wavelength <math>\lambda</math> illuminates a metal and ejects photoelectrons with a maximum kinetic energy
of 1.00 eV. A second light source with half the wavelength of the first ejects photoelectrons with a maximum
kinetic energy of 4.00 eV. Based on this information, determine the work function of the metal.


E=(6.626*10^-34)(435.75*10^12)
====Solution====
=2.887*10^-18 Joules
The following formula relates the maximum kinetic energy <math>K_{max}</math> of a photoelectron with the wavelength <math>\lambda</math> of the light producing the photoelectron and the work function <math>\phi</math> of the metal.


===Middling===
<math>K_{max} = \frac{hc}{\lambda} - \phi</math>
===Difficult===


==Connectedness==
We then let <math>\lambda_{1}</math> and <math>\lambda_{2}</math> be the wavelengths of the light emitted by the first and second sources, respectively, and we let <math>K_{1}</math> and <math>K_{2}</math> be the maximum kinetic energies of the corresponding photoelectrons. Therefore,
 
<math>K_{1} = \frac{hc}{\lambda_{1}} - \phi</math>
 
<math>K_{2} = \frac{hc}{\lambda_{2}} - \phi</math>
 
where <math>\lambda_{2} = 0.5\;\lambda_{1}</math>
 
Therefore,
 
<math>K_{2}-2k_{1} = \phi</math>
 
Thus, <math>\phi = 2</math> eV when <math>K_{1} = 1</math> eV and <math>K_{2} = 4</math> eV.
 
====Challenging====
 
A photon with momentum <math>p = \frac{h}{\lambda}</math> collides with a stationary electron. The photon scatters at an angle
θ from the incident direction of the photon with momentum <math>p^{'} = \frac{hc}{\lambda^{'}}</math>.  The electron scatters at an angle <math>\phi</math> from the incident direction of the photon with momentum <math>p_{e}</math> and energy <math>E_{e} = \sqrt{p_{e}^{2}c^{2} + m^{2}c^{4}}</math>. From this information, derive the compton formula (<math>\lambda^{'} - \lambda = \lambda_{e}(1-cos\theta)</math>).
 
====Solution====
We begin by noting that during the collision, the energy is conserved. Hence,
 
<math>pc + m_{e}c^{2} = p^{'}c + E_{e}</math>
 
and so is momentum in the direction of the incident photon:
 
<math>p = p^{'}cos\theta + p_{e}cos\phi</math>
 
and perpendicular to the direction of the incident photon:
 
<math>p^{'}sin\theta = p_{e}sin\phi</math>
 
Simpliflying the above equations,
 
<math>\frac{1}{\lambda} + \frac{1}{\lambda_{c}} = \frac{1}{\lambda^{'}} + \sqrt{\frac{1}{\lambda^{2}_{e}} + \frac{1}{\lambda^{2}_{c}}}</math>
 
<math>\frac{1}{\lambda} = \frac{cos\theta}{\lambda^{'}} + \frac{cos\phi}{\lambda_{e}}</math>
 
<math>\frac{sin\theta}{\lambda^{'}} = \frac{sin\phi}{\lambda_{e}}</math>
 
where we have written <math>p_{e} = \frac{h}{\lambda_{e}}</math>
 
Next, we eliminate <math>\phi</math> and <math>\lambda_{e}</math> from these equations. Eliminating <math>\phi</math> from the last two equations yields


This relation allows us to understand the photoelectric effect (why some metals emit electrons when light is shined on them) and Planck's Law of Black Body Radiation.
<math>\frac{1}{\lambda_{e}^{2}} = \frac{1}{\lambda^{2}} + \frac{1}{\lambda^{'2}} - \frac{2cos\theta}{\lambda\lambda^{'}}</math>


Every day in the biomedical device industry, new forms of treatment for cancer are being used. Proton emission therapy is a current method. If photons were ever used to combat disease, Planck's Relation could help engineers to calculate their energy or radiation frequency and wavelength in order to adjust these values to get the ones desired.
Lastly, we must make the appropiate subsitution using the first simpliflied equation above. This proof is left as an exercise to the reader.


==History==
==Connectedness==


Max Planck, a German Scientist discovered Planck's Relation. He published his paper in 1900. He was doing research and realized that matter could only emit or absorb radiation at certain discrete energy levels. He found a constant that described the distance between the energy levels.  
The understanding of various phenomena due to the quantum interpretation of light plays a significant role in our daily lives. From the development of the laser and thus its various derivatives, to the development of photovoltaic cells for the gathering of solar power, the leap forward taken by the pioneers of the quantum theory of light cannot be understated.


Put this idea in historical context. Give the reader the Who, What, When, Where, and Why.
[[File: L.jpeg|border]]


== See also ==
== See also ==


Are there related topics or categories in this wiki resource for the curious reader to explore?  How does this topic fit into that context?
The quantum interpretation of light gave a thorough explanation to various phenomena that had remained unexplained for the better part of the 19th century. For this reason, this page is intimately related to various others in this resource. To learn more about these subjects, click on them in the following list:
 
<ul>
<li>[[The Photoelectric Effect]]</li>
<li>[[Spontaneous Photon Emission]]</li>
<li>[[Electronic Energy Levels and Photons]]</li>
 
</ul>


===Further reading===
===Further reading===
 
HyperPhysics page on Photoelectric Effect: http://hyperphysics.phy-astr.gsu.edu/hbase/mod2.html#c
Books, Articles or other print media on this topic


===External links===
===External links===
A thorough example of a problem calculating the energy in a mole of photons using Planck's Relation: [https://www.youtube.com/watch?v=M7UAPGD8ETU]
<li>A thorough example of a problem calculating the energy in a mole of photons using Planck's Relation: [https://www.youtube.com/watch?v=M7UAPGD8ETU]</li>
<li>Quantum Theory of Light: https://www.grandinetti.org/quantum-theory-light</li>
<li>Evidence for the quantum nature of light: https://www.nature.com/articles/280451a0 </li>


==References==
==References==
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http://hyperphysics.phy-astr.gsu.edu/hbase/mod2.html#c3
http://hyperphysics.phy-astr.gsu.edu/hbase/mod2.html#c3
https://www.youtube.com/watch?v=dSUvyERhtO8
https://www.youtube.com/watch?v=dSUvyERhtO8
This section contains the the references you used while writing this page


[[Category:Waves]]
[[Category:Waves]]

Latest revision as of 23:28, 26 April 2022

Giovanny Espitia, Spring 2022

Why do we need a quantum interpretation? (History)

In the latter part of the 19th century, the classical description of light that had prevailed since the 17th century, began to fail in its explanatory power for the ever more precise measurements and phenomena being performed and observed in laboratories. The prime example of such failure is the so - called Ultraviolet Catastrophe. This term was first used by Paul Ehrenfest to refer to Rayleigh - Jeans law ability to predict experimental results below energies of [math]\displaystyle{ 10^{5} }[/math] and its sudden unexplained divergence at energies close to the ultraviolet range in the electromagnetic spectrum. Such discrepancies called for a more fundamental description of light. Fortunately, in the year 1900, Max Planck through his introduction of an ad - hoc assumption, was able to correctly explained the Black - body radiation problem. Planck later referred to such ad - hoc assumption as an "act of desperation". Moreover, in 1905, Einstein further validated the assumption made by Planck in his solution for the Black - body problem. The assumption was to treat light as if it came in discrete - packets later referred to as "Quanta". With such assumption, Einstein made further progress in explaining past experiments such as the Photoelectric effect first observed by Hertz in the latter part of the 19th century.

The Main Idea

Einstein, Planck, and Compton showed the explanatory power of giving light a discrete or quantum interpretation. In his theory of the photoelectric effect, Einstein showed that the energy [math]\displaystyle{ E }[/math] of a photon is simply the product [math]\displaystyle{ h\nu }[/math], where [math]\displaystyle{ h }[/math] is Planck’s constant and [math]\displaystyle{ \nu }[/math] is the frequency of the photon. As mentioned before, such treatment was allowed for the understanding of problems such as the Black - body, the Photoelectrons, and the scattering of electrons upon the contact of high energy electromagnetic radiation and light.

Mathematical Model

The energy of a photon

[math]\displaystyle{ E = h\nu }[/math]

Where:

  1. [math]\displaystyle{ h = 6.626*10^{-34} }[/math]
  2. [math]\displaystyle{ \nu = \frac{c}{\lambda} }[/math]

Here, [math]\displaystyle{ c }[/math] is the speed of light and [math]\displaystyle{ \lambda }[/math] is the wavelength of the photon.

Frequency - Wavelength Relationship:

[math]\displaystyle{ c = \lambda\nu }[/math]

Linear momentum of a photon

In the classical perspective, a photon should not carry any momentum since it is a massless boson. However, Einstein showed us through the following relationship that the former statement is not true.

[math]\displaystyle{ E = cp }[/math]

Where [math]\displaystyle{ c }[/math] is the speed of light and [math]\displaystyle{ p }[/math] is the momentum of the photon.

Therefore and according to the energy of a photon expression introduced in the previous subsection

[math]\displaystyle{ E = h\nu = cp }[/math]

Solving for [math]\displaystyle{ p }[/math],

[math]\displaystyle{ p = \frac{h\nu}{c} }[/math]

Interestingly, if we rearrange the above expression in terms of wavelength, we arrive at the same result as De Broglie for the wavelength of a matter wave. This is done as follows:

[math]\displaystyle{ p = \frac{h\nu}{c} }[/math]

Using the frequency - wavelength relationship introduced in a previous section, we make the appropriate substitution. Namely,

[math]\displaystyle{ p = \frac{h\nu}{c} = \frac{h}{\lambda} }[/math]

The last step, is simply to solve for [math]\displaystyle{ \lambda }[/math]. This step is left as an exercise to the reader.

Pair Production

When a photon has energy in the gamma - ray region of the electromagnetic spectrum and is close to an atomic nucleus, the product of such interaction often results in an electron - positron pair. A positron is the electron’s analog in antimatter. In other words, both have equal mass but a differing charge. This is often expressed as follows:

[math]\displaystyle{ \gamma \rightarrow e^{-} + e^{+} }[/math]

Where [math]\displaystyle{ \lambda }[/math] is the symbol for the photon and [math]\displaystyle{ e^{-}, e^{+} }[/math] are the symbols for the electron and positron, respectively. In order for pair - production to occur, the photon’s energy, [math]\displaystyle{ h\nu }[/math] must be larger than the rest mass energy, [math]\displaystyle{ 2m_{e}c^{2} }[/math], of the two particles.

Computational Model

For a model concerned with the quantum nature of light in terms of the double slit experiment, please access this website: https://ophysics.com/l4.html

Examples

Simple

An FM radio transmitter has a power output of 100 kW and operates at a frequency of 94 MHz. Compute the number of photons per second emitted by the transmitter.

Solution

We begin by computing the energy of the photon using the formula [math]\displaystyle{ E = h\nu }[/math]. In this case, the frequency is 94 MHz. Therefore,

[math]\displaystyle{ E = h\nu = (94\;MHz)\cdot 6.626e^{-34} = 6.23e^{-26}\;J }[/math]

The radio transmitter emits energy at a rate of 100 KJ/s. Thus,

[math]\displaystyle{ \frac{number\;of\;photons}{unit\;time} = \frac{energy/unit\;time}{energy/photon} = 1.61e^{30}\;s^{-1} }[/math]

Not trivial

A light source of wavelength [math]\displaystyle{ \lambda }[/math] illuminates a metal and ejects photoelectrons with a maximum kinetic energy of 1.00 eV. A second light source with half the wavelength of the first ejects photoelectrons with a maximum kinetic energy of 4.00 eV. Based on this information, determine the work function of the metal.

Solution

The following formula relates the maximum kinetic energy [math]\displaystyle{ K_{max} }[/math] of a photoelectron with the wavelength [math]\displaystyle{ \lambda }[/math] of the light producing the photoelectron and the work function [math]\displaystyle{ \phi }[/math] of the metal.

[math]\displaystyle{ K_{max} = \frac{hc}{\lambda} - \phi }[/math]

We then let [math]\displaystyle{ \lambda_{1} }[/math] and [math]\displaystyle{ \lambda_{2} }[/math] be the wavelengths of the light emitted by the first and second sources, respectively, and we let [math]\displaystyle{ K_{1} }[/math] and [math]\displaystyle{ K_{2} }[/math] be the maximum kinetic energies of the corresponding photoelectrons. Therefore,

[math]\displaystyle{ K_{1} = \frac{hc}{\lambda_{1}} - \phi }[/math]

[math]\displaystyle{ K_{2} = \frac{hc}{\lambda_{2}} - \phi }[/math]

where [math]\displaystyle{ \lambda_{2} = 0.5\;\lambda_{1} }[/math]

Therefore,

[math]\displaystyle{ K_{2}-2k_{1} = \phi }[/math]

Thus, [math]\displaystyle{ \phi = 2 }[/math] eV when [math]\displaystyle{ K_{1} = 1 }[/math] eV and [math]\displaystyle{ K_{2} = 4 }[/math] eV.

Challenging

A photon with momentum [math]\displaystyle{ p = \frac{h}{\lambda} }[/math] collides with a stationary electron. The photon scatters at an angle θ from the incident direction of the photon with momentum [math]\displaystyle{ p^{'} = \frac{hc}{\lambda^{'}} }[/math]. The electron scatters at an angle [math]\displaystyle{ \phi }[/math] from the incident direction of the photon with momentum [math]\displaystyle{ p_{e} }[/math] and energy [math]\displaystyle{ E_{e} = \sqrt{p_{e}^{2}c^{2} + m^{2}c^{4}} }[/math]. From this information, derive the compton formula ([math]\displaystyle{ \lambda^{'} - \lambda = \lambda_{e}(1-cos\theta) }[/math]).

Solution

We begin by noting that during the collision, the energy is conserved. Hence,

[math]\displaystyle{ pc + m_{e}c^{2} = p^{'}c + E_{e} }[/math]

and so is momentum in the direction of the incident photon:

[math]\displaystyle{ p = p^{'}cos\theta + p_{e}cos\phi }[/math]

and perpendicular to the direction of the incident photon:

[math]\displaystyle{ p^{'}sin\theta = p_{e}sin\phi }[/math]

Simpliflying the above equations,

[math]\displaystyle{ \frac{1}{\lambda} + \frac{1}{\lambda_{c}} = \frac{1}{\lambda^{'}} + \sqrt{\frac{1}{\lambda^{2}_{e}} + \frac{1}{\lambda^{2}_{c}}} }[/math]

[math]\displaystyle{ \frac{1}{\lambda} = \frac{cos\theta}{\lambda^{'}} + \frac{cos\phi}{\lambda_{e}} }[/math]

[math]\displaystyle{ \frac{sin\theta}{\lambda^{'}} = \frac{sin\phi}{\lambda_{e}} }[/math]

where we have written [math]\displaystyle{ p_{e} = \frac{h}{\lambda_{e}} }[/math]

Next, we eliminate [math]\displaystyle{ \phi }[/math] and [math]\displaystyle{ \lambda_{e} }[/math] from these equations. Eliminating [math]\displaystyle{ \phi }[/math] from the last two equations yields

[math]\displaystyle{ \frac{1}{\lambda_{e}^{2}} = \frac{1}{\lambda^{2}} + \frac{1}{\lambda^{'2}} - \frac{2cos\theta}{\lambda\lambda^{'}} }[/math]

Lastly, we must make the appropiate subsitution using the first simpliflied equation above. This proof is left as an exercise to the reader.

Connectedness

The understanding of various phenomena due to the quantum interpretation of light plays a significant role in our daily lives. From the development of the laser and thus its various derivatives, to the development of photovoltaic cells for the gathering of solar power, the leap forward taken by the pioneers of the quantum theory of light cannot be understated.

See also

The quantum interpretation of light gave a thorough explanation to various phenomena that had remained unexplained for the better part of the 19th century. For this reason, this page is intimately related to various others in this resource. To learn more about these subjects, click on them in the following list:

Further reading

HyperPhysics page on Photoelectric Effect: http://hyperphysics.phy-astr.gsu.edu/hbase/mod2.html#c

External links

  • A thorough example of a problem calculating the energy in a mole of photons using Planck's Relation: [1]
  • Quantum Theory of Light: https://www.grandinetti.org/quantum-theory-light
  • Evidence for the quantum nature of light: https://www.nature.com/articles/280451a0
  • References

    http://hyperphysics.phy-astr.gsu.edu/hbase/mod2.html#c3 https://www.youtube.com/watch?v=dSUvyERhtO8