Rutherford scattering experiments

(Redirected from Geiger–Marsden experiment)

The Rutherford scattering experiments were a landmark series of experiments by which scientists learned that every atom has a nucleus where all of its positive charge and most of its mass is concentrated. They deduced this after measuring how an alpha particle beam is scattered when it strikes a thin metal foil. The experiments were performed between 1906 and 1913 by Hans Geiger and Ernest Marsden under the direction of Ernest Rutherford at the Physical Laboratories of the University of Manchester.

A replica of an apparatus used by Geiger and Marsden to measure alpha particle scattering in a 1913 experiment

The physical phenomenon was explained by Rutherford in a classic 1911 paper that eventually lead to the widespread use of scattering in particle physics to study subatomic matter. Rutherford scattering or Coulomb scattering is the elastic scattering of charged particles by the Coulomb interaction. The paper also initiated the development of the planetary Rutherford model of the atom and eventually the Bohr model.

Rutherford scattering is now exploited by the materials science community in an analytical technique called Rutherford backscattering.

Summary

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Thomson's model of the atom

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The "plum pudding model" of an atom with seven electrons, as imagined by J. J. Thomson in 1905

The prevailing model of atomic structure before Rutherford's experiments was devised by J. J. Thomson.[1]: 123  Thomson had discovered the electron through his work on cathode rays[2] and proposed that they existed within atoms, and an electric current is electrons hopping from one atom to an adjacent one in a series. There logically had to be a commensurate amount of positive charge to balance the negative charge of the electrons and hold those electrons together. Having no idea what the source of this positive charge was, he tentatively proposed that the positive charge was everywhere in the atom, adopting a spherical shape for simplicity.[1]: 123 [3] Thomson imagined that the balance of electrostatic forces would distribute the electrons throughout this sphere in a more or less even manner. Thomson also believed the electrons could move around in this sphere, and in that regard he likened the substance of the sphere to a liquid.[4] In fact the positive sphere was more of an abstraction than anything material.

Thomson was never able to develop a complete and stable model that could predict any of the other known properties of the atom, such as emission spectra and valencies.[5] The Japanese scientist Hantaro Nagaoka rejected Thomson's model on the grounds that opposing charges cannot penetrate each other.[6] He proposed instead that electrons orbit the positive charge like the rings around Saturn.[7] However this model was also known to be unstable.[8]: 303 

Alpha particles and the Thomson atom

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An alpha particle is a positively charged particle of matter that is spontaneously emitted from certain radioactive elements. Alpha particles are so tiny as to be invisible, but they can be detected with the use of phosphorescent screens, photographic plates, or electrodes. Rutherford discovered them in 1899.[9] In 1906, by studying how alpha particle beams are deflected by magnetic and electric fields, he deduced that they were essentially helium atoms stripped of two electrons.[10] Thomson and Rutherford knew nothing about the internal structure of alpha particles. Prior to 1911 they were thought to have a diameter similar to helium atoms and contain ten or so electrons.[8]: 280

Thomson's model was consistent with the experimental evidence available at the time. Thomson studied beta particle scattering which showed small angle deflections modelled as interactions of the particle with many atoms in succession. Each interaction of the particle with the electrons of the atom and the positive background sphere would lead to a tiny deflection, but many such collisions could add up.[8]: 274  The scattering of alpha particles was expected to be similar.[8]: 281 Rutherford's team would show that the multiple scattering model was not needed: single scattering from a compact charge at the centre of the atom would account for all of the scattering data.[8]: 289 

Rutherford, Geiger, and Marsden

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Ernest Rutherford was Langworthy Professor of Physics at the Victoria University of Manchester[11]: 188  (now the University of Manchester). He had already received numerous honours for his studies of radiation. He had discovered the existence of alpha rays, beta rays, and gamma rays, and had proved that these were the consequence of the disintegration of atoms. In 1906, he received a visit from the German physicist Hans Geiger, and was so impressed that he asked Geiger to stay and help him with his research. Ernest Marsden was a physics undergraduate student studying under Geiger.[12]

In 1908, Rutherford sought to independently determine the charge and mass of alpha particles. To do this, he wanted to count the number of alpha particles and measure their total charge; the ratio would give the charge of a single alpha particle. Alpha particles are too tiny to see, but Rutherford knew about Townsend discharge, a cascade effect from ionisation leading to a pulse of electric current. On this principle, Rutherford and Geiger designed a simple counting device which consisted of two electrodes in a glass tube. (See #1908 experiment.) Every alpha particle that passed through the tube would create a pulse of electricity that could be counted. It was an early version of the Geiger counter.[8]: 261 

The counter that Geiger and Rutherford built proved unreliable because the alpha particles were being too strongly deflected by their collisions with the molecules of air within the detection chamber. The highly variable trajectories of the alpha particles meant that they did not all generate the same number of ions as they passed through the gas, thus producing erratic readings. This puzzled Rutherford because he had thought that alpha particles were too heavy to be deflected so strongly. Rutherford asked Geiger to investigate how far matter could scatter alpha rays.[13]

The experiments they designed involved bombarding a metal foil with a beam of alpha particles to observe how the foil scattered them in relation to its thickness and material. They used a phosphorescent screen to measure the trajectories of the particles. Each impact of an alpha particle on the screen produced a tiny flash of light. Geiger worked in a darkened lab for hours on end, counting these tiny scintillations using a microscope.[14] For the metal foil, they tested a variety of metals, but favoured gold because they could make the foil very thin, as gold is the most malleable metal.[15]: 127  As a source of alpha particles, Rutherford's substance of choice was radium, which is thousands of times more radioactive than uranium.[16]

Scattering theory and the new atomic model

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Left: Had Thomson's model been correct, all the alpha particles should have passed through the foil with minimal scattering.
Right: What Geiger and Marsden observed was that a small fraction of the alpha particles experienced strong deflection.

In a 1909 experiment, Geiger and Marsden discovered that the metal foils could scatter some alpha particles in all directions, sometimes more than 90°.[17]: 4  This should have been impossible according to Thomson's model.[17]: 4  According to Thomson's model, all the alpha particles should have gone straight through.

In Thomson's model of the atom, the sphere of positive charge that fills the atom and encapsulates the electrons is permeable; the electrons could move around in it, after all. Therefore, an alpha particle should be able to pass through this sphere if the electrostatic forces within permit it. Thomson himself did not study how an alpha particle might be scattered in such a collision with an atom, but he did study beta particle scattering.[8]: 277  He calculated that a beta particle would only experience very small deflection when passing through an atom,[18] and even after passing through many atoms in a row, the total deflection should still be less than 1°.[19] Alpha particles typically have much more momentum than beta particles and therefore should likewise experience only the slightest deflection.[20]

The extreme scattering observed forced Rutherford to revise the model of the atom.[21]: 25  The issue in Thomson's model was that the charges were too diffuse to produce a sufficiently strong electrostatic force to cause such repulsion. Therefore they had to be more concentrated. In Rutherford's new model, the positive charge does not fill the entire volume of the atom but instead constitutes a tiny nucleus at least 10,000 times smaller than the atom as a whole. All that positive charge concentrated in a much smaller volume produces a much stronger electric field near its surface. The nucleus also carried most of the atom's mass. This meant that it could deflect alpha particles by up to 180° depending on how close they pass. The electrons surround this nucleus, spread throughout the atom's volume. Because their negative charge is diffuse and their combined mass is low, they have a negligible effect on the alpha particle.[22]

To verify his model, Rutherford developed a scientific model to predict the intensity of alpha particles at the different angles they scattered coming out of the gold foil, assuming all of the positive charge was concentrated at the centre of the atom. This model was validated in an experiment performed in 1913. His model explained both the beta scattering results of Thomson and the alpha scattering results of Geiger and Marsden.[8]: 285 

Legacy

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There was little reaction to Rutherford's now-famous 1911 paper in the first years.[11]: 192  The paper was primarily about alpha particle scattering in an era before particle scattering was a primary tool for physics. The probability techniques he used and confusing collection of observations involved were not immediately compelling.[8]: 304 

Nuclear physics

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In a cloud chamber, a 5.3 MeV alpha particle track from a 210Pb source (1) undergoes Rutherford scattering (2), deflecting by an angle of about 30°. It scatters once again (3), and finally comes to rest in the gas. The target nucleus recoils, leaving a short track (2). (cm scale)

The first impacts were to encourage new focus on scattering experiments. For example the first results from a cloud chamber, by C.T.R. Wilson shows alpha particle scattering and also appeared in 1911.[23][8]: 302  Over time, particle scattering became a major aspect of theoretical and experimental physics;[24]: 443  Rutherford's concept of a "cross-section" now dominates the descriptions of experimental particle physics.[1]: 247 The historian Silvan S. Schweber suggests that Rutherford's approach marked the shift to viewing all interactions and measurements in physics as scattering processes.[25]: xiv  After the nucleus - a term Rutherford introduced in 1912[11]: 192  - became the accepted model for the core of atoms, Rutherford's analysis of the scattering of alpha particles created a new branch of physics, nuclear physics.[11]: 223 

Atomic model

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Rutherford's new atom model caused no stir.[21]: 28  Rutherford explicitly ignores the electrons, only mentioning Hantaro Nagaoka's Saturnian model of electrons orbiting a tiny "sun", a model that had been previously rejected as mechanically unstable. By ignoring the electrons Rutherford also ignores any potential implications for atomic spectroscopy for chemistry.[11]: 302  Rutherford himself did not press the case for his atomic model: his own 1913 book on "Radioactive substances and their radiations" only mentions the atom twice; other books by other authors around this time focus on Thomson's model.[26]: 446 

The impact of Rutherford's nuclear model came after Niels Bohr arrived as a post-doctoral student in Manchester at Rutherford's invitation. Bohr dropped his work on the Thomson model in favour of Rutherford's nuclear model, developing the Rutherford–Bohr model over the next several years. Eventually Bohr incorporated early ideas of quantum mechanics into the model of the atom, allowing prediction of electronic spectra and concepts of chemistry.[8]: 304 

Hantaro Nagaoka, who had proposed a Saturnian model of the atom, wrote to Rutherford from Tokyo in 1911: "I have been struck with the simpleness of the apparatus you employ and the brilliant results you obtain."[27] The astronomer Arthur Eddington called Rutherford's discovery the most important scientific achievement since Democritus proposed the atom ages earlier.[28] Rutherford has since been hailed as "the father of nuclear physics".[29][30]

In a lecture delivered on 15 October 1936 at Cambridge University,[31][32] Rutherford described his shock at the results of the 1909 experiment:

Then I remember two or three days later Geiger coming to me in great excitement and saying, "We have been able to get some of the α-particles coming backwards...". It was quite the most incredible event that has ever happened to me in my life. It was almost as incredible as if you fired a 15-inch shell at a piece of tissue paper and it came back and hit you. On consideration, I realised that this scattering backward must be the result of a single collision, and when I made calculations I saw that it was impossible to get anything of that order of magnitude unless you took a system in which the greater part of the mass of the atom was concentrated in a minute nucleus. It was then that I had the idea of an atom with a minute massive centre, carrying a charge.[33]

Rutherford's claim of surprise makes a good story but by the time of the Geiger-Marsden experiment the result confirmed suspicions Rutherford developed from his many previous experiments.[8]: 265 

Experiments

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Alpha particle scattering: 1906 and 1908 experiments

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Rutherford's first steps towards his discovery of the nature of the atom came from his work to understand alpha particles.[21]: 17 [34]: 435  In 1906, Rutherford noticed that alpha particles passing through sheets of mica were deflected by the sheets by as much as 2 degrees. Rutherford placed a radioactive source in a sealed tube ending with a narrow slits followed by a photographic plate. Half of the slit was covered by a thin layer of mica. A magnetic field around the tube was altered every 10 minutes to reject the effect of beta rays, known to be sensitive to magnetic fields.[22] The tube was evacuated to different amounts and a series of images recorded. At the lowest pressure the image of the open slit was clear, while images of the mica covered slit or the open slit at higher pressures were fuzzy. Rutherford explained these results as alpha-particle scattering[8]: 260  in a paper published in 1906.[35] He already understood the implications of the observation for models of atoms: "such a result brings out clearly the fact that the atoms of matter must be the seat of very intense electrical forces".[35]: 145 [21]

 
This apparatus was described in a 1908 paper by Hans Geiger. It could only measure deflections of a few degrees.

A 1908 paper by Geiger, On the Scattering of α-Particles by Matter, describes the following experiment. He constructed a long glass tube, nearly two metres long. At one end of the tube was a quantity of "radium emanation" (R) as a source of alpha particles.[21]: 20  The opposite end of the tube was covered with a phosphorescent screen (Z). In the middle of the tube was a 0.9 mm-wide slit. The alpha particles from R passed through the slit and created a glowing patch of light on the screen. A microscope (M) was used to count the scintillations on the screen and measure their spread. Geiger pumped all the air out of the tube so that the alpha particles would be unobstructed, and they left a neat and tight image on the screen that corresponded to the shape of the slit. Geiger then allowed some air into the tube, and the glowing patch became more diffuse. Geiger then pumped out the air and placed one or two gold foils over the slit at AA. This too caused the patch of light on the screen to become more spread out, with the larger spread for two layers.[21]: 20  This experiment demonstrated that both air and solid matter could markedly scatter alpha particles.[36][21]: 20 

Alpha particle reflection: the 1909 experiment

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The results of the initial alpha particle scattering experiments were confusing. The angular spread of the particle on the screen varied greatly with the shape of the apparatus and its internal pressure. Rutherford suggested that Ernest Marsden, a physics undergraduate student studying under Geiger, should look for diffusely reflected or back-scattered alpha particles, even though these were not expected. Marsden's first crude reflector got results, so Geiger helped him create a more sophisticated apparatus. They were able to demonstrate that 1 in 8000 alpha particle collisions were diffuse reflections.[21]: 23  Although this fraction was small, it was much larger than the Thomson model of the atom could explain.[8]: 264 

In these experiments, alpha particles emitted by a radioactive source (A) were observed bouncing off a metal reflector (R) and onto a fluorescent screen (S) on the other side of a lead plate (P).

These results where published in a 1909 paper, On a Diffuse Reflection of the α-Particles,[37] where Geiger and Marsden described the experiment by which they proved that alpha particles can indeed be scattered by more than 90°. In their experiment, they prepared a small conical glass tube (AB) containing "radium emanation" (radon), "radium A" (actual radium), and "radium C" (bismuth-214); its open end was sealed with mica. This was their alpha particle emitter. They then set up a lead plate (P), behind which they placed a fluorescent screen (S). The tube was held on the opposite side of plate, such that the alpha particles it emitted could not directly strike the screen. They noticed a few scintillations on the screen because some alpha particles got around the plate by bouncing off air molecules. They then placed a metal foil (R) to the side of the lead plate. They tested with lead, gold, tin, aluminium, copper, silver, iron, and platinum. They pointed the tube at the foil to see if the alpha particles would bounce off it and strike the screen on the other side of the plate, and observed an increase in the number of scintillations on the screen. Counting the scintillations, they observed that metals with higher atomic mass, such as gold, reflected more alpha particles than lighter ones such as aluminium.[37][21]: 20 

Geiger and Marsden then wanted to estimate the total number of alpha particles that were reflected. The previous setup was unsuitable for doing this because the tube contained several radioactive substances (radium plus its decay products) and thus the alpha particles emitted had varying ranges, and because it was difficult for them to ascertain at what rate the tube was emitting alpha particles. This time, they placed a small quantity of radium C (bismuth-214) on the lead plate, which bounced off a platinum reflector (R) and onto the screen. They concluded that approximately 1 in 8,000 of the alpha particles that struck the reflector bounced onto the screen.[37] By measuring the reflection from thin foils they showed that the effect due to a volume and not a surface effect.[22] When contrasted with the vast number of alpha particles that pass unhindered through a metal foil, this small number of large angle reflections was a strange result[1]: 240  that meant very large forces were involved.[22]

Dependence on foil material and thickness: the 1910 experiment

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This apparatus was described in 1910 paper by Geiger. It was designed to precisely measure how the scattering varied according to the substance and thickness of the foil.

A 1910 paper[38] by Geiger, The Scattering of the α-Particles by Matter, describes an experiment to measure how the most probable angle through which an alpha particle is deflected varies with the material it passes through, the thickness of the material, and the velocity of the alpha particles. He constructed an airtight glass tube from which the air was pumped out. At one end was a bulb (B) containing "radium emanation" (radon-222). By means of mercury, the radon in B was pumped up the narrow glass pipe whose end at A was plugged with mica. At the other end of the tube was a fluorescent zinc sulfide screen (S). The microscope which he used to count the scintillations on the screen was affixed to a vertical millimetre scale with a vernier, which allowed Geiger to precisely measure where the flashes of light appeared on the screen and thus calculate the particles' angles of deflection. The alpha particles emitted from A was narrowed to a beam by a small circular hole at D. Geiger placed a metal foil in the path of the rays at D and E to observe how the zone of flashes changed. He tested gold, tin, silver, copper, and aluminium. He could also vary the velocity of the alpha particles by placing extra sheets of mica or aluminium at A.[38]

From the measurements he took, Geiger came to the following conclusions:[17]: 5 

  • the most probable angle of deflection increases with the thickness of the material
  • the most probable angle of deflection is proportional to the atomic mass of the substance
  • the most probable angle of deflection decreases with the velocity of the alpha particles

Rutherford's Structure of the Atom paper (1911)

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Considering the results of these experiments, Rutherford published a landmark paper in 1911 titled "The Scattering of α and β Particles by Matter and the Structure of the Atom" wherein he showed that single scattering from a very small and intense electric charge predicts primarily small-angle scattering with small but measurable amounts of backscattering.[1]: 252 [39] For the purpose of his mathematical calculations he assumed this central charge was positive, but he admitted he could not prove this and that he had to wait for other experiments to develop his theory.[39]: 688 

Rutherford developed a mathematical equation that modelled how the foil should scatter the alpha particles if all the positive charge and most of the atomic mass was concentrated in a point at the centre of an atom. From the scattering data, Rutherford estimated the central charge qn to be about +100 units.[40]

Rutherford's paper does not discuss any electron arrangement beyond discussions on the scattering from Thomson's plum pudding model and Nagaoka's Saturnian model.[8]: 303  He shows that the scattering results predicted by Thomson's model are also explained by single scattering, but that Thomson's model does not explain large angle scattering. He says that Nagaoka's model, having a compact charge, would agree with the scattering data. The Saturnian model had previously been rejected on other grounds. The so-called Rutherford model of the atom with orbiting electrons was not proposed by Rutherford in the 1911 paper.[8]: 304 

Confirming the scattering theory: the 1913 experiment

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In a 1913 paper, The Laws of Deflexion of α Particles through Large Angles,[41] Geiger and Marsden describe a series of experiments by which they sought to experimentally verify Rutherford's equation. Rutherford's equation predicted that the number of scintillations per minute s that will be observed at a given angle Φ should be proportional to:[17]: 11 

  1. cosec4Φ/2
  2. thickness of foil t
  3. magnitude of the square of central charge Qn
  4. 1/(mv2)2

Their 1913 paper describes four experiments by which they proved each of these four relationships.[24]: 438 

This apparatus was designed to accurately measure the scattering pattern of the alpha particles produced by the metal foil (F). The microscope (M) and screen (S) were affixed to a rotating cylinder and could be moved in a full circle around the foil.[41]

To test how the scattering varied with the angle of deflection (i.e. if s ∝ csc4Φ/2). Geiger and Marsden built an apparatus that consisted of a hollow metal cylinder mounted on a turntable. Inside the cylinder was a metal foil (F) and a radiation source containing radon (R), mounted on a detached column (T) which allowed the cylinder to rotate independently. The column was also a tube by which air was pumped out of the cylinder. A microscope (M) with its objective lens covered by a fluorescent zinc sulfide screen (S) penetrated the wall of the cylinder and pointed at the metal foil. They tested with silver and gold foils. By turning the table, the microscope could be moved a full circle around the foil, allowing Geiger to observe and count alpha particles deflected by up to 150°. Correcting for experimental error, Geiger and Marsden found that the number of alpha particles that are deflected by a given angle Φ is indeed proportional to csc4Φ/2.[41]

This apparatus was used to measure how the scattering pattern varied in relation to the thickness of the foil, the atomic weight of the material, and the velocity of the alpha particles. The rotating disc in the centre had six holes which could be covered with foil.[41]

Geiger and Marsden then tested how the scattering varied with the thickness of the foil (i.e. if st). They constructed a disc (S) with six holes drilled in it. The holes were covered with metal foil (F) of varying thickness, or none for control. This disc was then sealed in a brass ring (A) between two glass plates (B and C). The disc could be rotated by means of a rod (P) to bring each window in front of the alpha particle source (R). On the rear glass pane was a zinc sulfide screen (Z). Geiger and Marsden found that the number of scintillations that appeared on the screen was indeed proportional to the thickness, as long as the thickness was small.[41]

Geiger and Marsden reused the apparatus to measure how the scattering pattern varied with the square of the nuclear charge (i.e. if sQn2). Geiger and Marsden did not know what the positive charge of the nucleus of their metals were (they had only just discovered the nucleus existed at all), but they assumed it was proportional to the atomic weight, so they tested whether the scattering was proportional to the atomic weight squared. Geiger and Marsden covered the holes of the disc with foils of gold, tin, silver, copper, and aluminium. They measured each foil's stopping power by equating it to an equivalent thickness of air. They counted the number of scintillations per minute that each foil produced on the screen. They divided the number of scintillations per minute by the respective foil's air equivalent, then divided again by the square root of the atomic weight (Geiger and Marsden knew that for foils of equal stopping power, the number of atoms per unit area is proportional to the square root of the atomic weight). Thus, for each metal, Geiger and Marsden obtained the number of scintillations that a fixed number of atoms produce. For each metal, they then divided this number by the square of the atomic weight, and found that the ratios were about the same. Thus they proved that sQn2.[41]

Finally, Geiger and Marsden tested how the scattering varied with the velocity of the alpha particles (i.e. if s1/v4). Using the same apparatus, they slowed the alpha particles by placing extra sheets of mica in front of the alpha particle source. They found that, within the range of experimental error, the number of scintillations was indeed proportional to 1/v4.[41]

Positive charge on nucleus: 1913

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In his 1911 paper (see above), Rutherford assumed that the central charge of the atom was positive, but a negative charge would have fitted his scattering model just as well.[42] In a 1913 paper, Rutherford declared that the "nucleus" (as he now called it) was indeed positively charged, based on the result of experiments exploring the scattering of alpha particles in various gases.[43]

In 1917, Rutherford and his assistant William Kay began exploring the passage of alpha particles through gases such as hydrogen and nitrogen. In this experiment, they shot a beam of alpha particles through hydrogen, and they carefully placed their detector—a zinc sulfide screen—just beyond the range of the alpha particles, which were absorbed by the gas. They nonetheless picked up charged particles of some sort causing scintillations on the screen. Rutherford interpreted this as alpha particles knocking the hydrogen nuclei forwards in the direction of the beam, not backwards.[42]

Rutherford's scattering model

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Rutherford begins his 1911 paper[39] with a discussion of Thomson's results on scattering of beta particles, a form of radioactivity that results in high velocity electrons. Thomson's model had electrons circulating inside of a sphere of positive charge. Rutherford highlights the need for compound or multiple scattering events: the deflections predicted for each collision are much less than one degree. He then proposes a model which will produce large deflections on a single encounter: place all of the positive charge at the centre of the sphere and ignore the electron scattering as insignificant. The concentrated charge will explain why most alpha particles do not scatter to any measurable degree – they fly past too far from the charge – and yet particles that do pass very close to the centre scatter through large angles.[8]: 285 

Maximum nuclear size estimate

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Rutherford begins his analysis by considering a head-on collision between the alpha particle and atom. This will establish the minimum distance between them, a value which will be used throughout his calculations.[39]: 670 

Assuming there are no external forces and that initially the alpha particles are far from the nucleus, the inverse-square law between the charges on the alpha particle and nucleus gives the potential energy gained by the particle as it approaches the nucleus. For head-on collisions between alpha particles and the nucleus, all the kinetic energy of the alpha particle is turned into potential energy and the particle stops and turns back.[17]: 5 

 
Schematic view of a head-on collision between an alpha particle and an atom. The radius of the atom is on the order of 10-10 m and the minimum stopping distance is on the order of 10-14 m.

Where the particle stops at a distance   from the centre, the potential energy matches the original kinetic energy:[44]: 620 [45]: 320 

 

where

 

Rearranging:[39]: 671  

For an alpha particle:

  • m (mass) = 6.64424×10−27 kg = 3.7273×109 eV/c2
  • qa (for the alpha particle) = 2 × 1.6×10−19 C = 3.2×10−19 C
  • qg (for gold) = 79 × 1.6×10−19 C = 1.27×10−17 C
  • v (initial velocity) = 2×107 m/s (for this example)

The distance from the alpha particle to the centre of the nucleus (rmin) at this point is an upper limit for the nuclear radius. Substituting these in gives the value of about 2.7×10−14 m, or 27 fm. (The true radius is about 7.3 fm.) The true radius of the nucleus is not recovered in these experiments because the alphas do not have enough energy to penetrate to more than 27 fm of the nuclear centre, as noted, when the actual radius of gold is 7.3 fm.

 
Figure 1. Potential energy diagram for Rutherford's atom model illustrating concentration in the nucleus.

Rutherford's 1911 paper[39] started with a slightly different formula suitable for head-on collision with a sphere of positive charge:

 

In Rutherford's notation, e is the elementary charge, N is the charge number of the nucleus (now also known as the atomic number), and E is the charge of an alpha particle. The convention in Rutherford's time was to measure charge in electrostatic units, distance in centimeters, force in dynes, and energy in ergs. The modern convention is to measure charge in coulombs, distance in meters, force in newtons, and energy in joules. Using coulombs requires using the Coulomb constant (k) in the equation. Rutherford used b as the turning point distance (called rmin above) and R is the radius of the atom. The first term is the Coulomb repulsion used above. This form assumes the alpha particle could penetrate the positive charge. At the time of Rutherford's paper, Thomson's plum pudding model proposed a positive charge with the radius of an atom, thousands of times larger than the rmin found above. Figure 1 shows how concentrated this potential is compared to the size of the atom. Many of Rutherford's results are expressed in terms of this turning point distance rmin, simplifying the results and limiting the need for units to this calculation of turning point.

Single scattering by a heavy nucleus

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From his results for a head on collision, Rutherford knows that alpha particle scattering occurs close to the centre of an atom, at a radius 10,000 times smaller than the atom. The electrons have negligible effect. He begins by assuming no energy loss in the collision, that is he ignores the recoil of the target atom. He will revisit each of these issues later in his paper.[39]: 672  Under these conditions, the alpha particle and atom interact through a central force, a physical problem studied first by Isaac Newton.[46] A central force only acts along a line between the particles and when the force varies with the inverse square, like Coulomb force in this case, a detailed theory was developed under the name of the Kepler problem.[47]: 76  The well-known solutions to the Kepler problem are called orbits and unbound orbits are hyperbolas. Thus Rutherford proposed that the alpha particle will take a hyperbolic trajectory in the repulsive force near the centre of the atom as shown in Figure 2.

 
Figure 2. The geometry of Rutherford's scattering formula, based on a diagram in his 1911 paper. The alpha particle is the green dot and moves along the green path, which is a hyperbola with O as its centre and S as its external focus. The atomic nucleus is located at S. A is the apsis, the point of closest approach. b is the impact parameter, the lateral distance between the alpha particle's initial trajectory and the nucleus.

To apply the hyperbolic trajectory solutions to the alpha particle problem, Rutherford expresses the parameters of the hyperbola in terms of the scattering geometry and energies. He starts with conservation of angular momentum. When the particle of mass   and initial velocity   is far from the atom, its angular momentum around the centre of the atom will be   where   is the impact parameter, which is the lateral distance between the alpha particle's path and the atom. At the point of closest approach, labeled A in Figure 2, the angular momentum will be  . Therefore[8]: 270 

 

 

Rutherford also applies the law of conservation of energy between the same two points:

 

The left hand side and the first term on the right hand side are the kinetic energies of the particle at the two points; the last term is the potential energy due to the Coulomb force between the alpha particle and atom at the point of closest approach (A). qa is the charge of the alpha particle, qg is the charge of the nucleus, and k is the Coulomb constant.[48]

The energy equation can then be rearranged thus:

 

For convenience, the non-geometric physical variables in this equation[39]: 674  can be contained in a variable  , which is the point of closest approach in a head-on collision scenario[39]: 671 which was explored in a previous section of this article:

 

This allows Rutherford simplify the energy equation to:

 

This leaves two simultaneous equations for  , the first derived from the conservation of momentum equation and the second from the conservation of energy equation. Eliminating   and   gives at a new formula for  :

 

 

The next step is to find a formula for  . From Figure 2,   is the sum of two distances related to the hyperbola, SO and OA. Using the following logic, these distances can be expressed in terms of angle   and impact parameter  .

 
Figure 3 The basic components of the geometry of hyperbolas.

The eccentricity of a hyperbola is a value that describes the hyperbola's shape. It can be calculated by dividing the focal distance by the length of the semi-major axis, which per Figure 2 is SO/OA. As can be seen in Figure 3, the eccentricity is also equal to  , where   is the angle between the major axis and the asymptote.[49]: 219  Therefore:

 

As can be deduced from Figure 2, the focal distance SO is

 

and therefore

 

With these formulas for SO and OA, the distance   can be written in terms of   and simplified using a trigonometric identity known as a half-angle formula:[40]: 673 

 


 


 

Applying a trigonometric identity known as the cotangent double angle formula and the previous equation for   gives a simpler relationship between the physical and geometric variables:

 


 


 


 

The scattering angle of the particle is   and therefore  . With the help of a trigonometric identity known as a reflection formula, the relationship between θ and b can be resolved to:[39]: 673 

 

 

 

which can be rearranged to give

 

 
Hyperbolic trajectories of alpha particles scattering from a Gold nucleus (modern radius shown as gray circle) as described in Rutherford's 1911 paper

Rutherford gives some illustrative values as shown in this table:[39]: 673 

Rutherford's angle of deviation table
  10 5 2 1 0.5 0.25 0.125
  5.7° 11.4° 28° 53° 90° 127° 152°

Rutherford's approach to this scattering problem remains a standard treatment in textbooks[50]: 151 [51]: 240 [52]: 400 on classical mechanics.

Intensity vs angle

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Geometry of differential scattering cross-section

To compare to experiments the relationship between impact parameter and scattering angle needs to be converted to probability versus angle. The scattering cross section gives the relative intensity by angles:[47]: 81   

In classical mechanics, the scattering angle   is uniquely determined the initial kinetic energy of the incoming particles and the impact parameter b.[47]: 82  Therefore, the number of particles scattered into an angle between   and   must be the same as the number of particles with associated impact parameters between b and b + db. For an incident intensity I, this implies:   Thus the cross section depends on scattering angle as:   Using the impact parameter as a function of angle, b(θ), from the single scattering result above produces the Rutherford scattering cross section:[47]: 84 

 

 

  • s = the number of alpha particles falling on unit area at an angle of deflection Φ
  • r = distance from point of incidence of α rays on scattering material
  • X = total number of particles falling on the scattering material
  • n = number of atoms in a unit volume of the material
  • t = thickness of the foil
  • qn = positive charge of the atomic nucleus
  • qa = positive charge of the alpha particles
  • m = mass of an alpha particle
  • v = velocity of the alpha particle
 
Rutherford scattering cross-section is strongly peaked around zero degrees, and yet has nonzero values out to 180 degrees.

This formula predicted the results that Geiger measured in the coming year. The scattering probability into small angles greatly exceeds the probability in to larger angles, reflecting the tiny nucleus surrounded by empty space. However, for rare close encounters, large angle scattering occurs with just a single target.[53]: 19 

At the end of his development of the cross section formula, Rutherford emphasises that the results apply to single scattering and thus require measurements with thin foils. For thin foils the degree of scattering is proportional to the foil thickness in agreement with Geiger's measurements.[39]

Comparison to JJ Thomson's results

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At the time of Rutherford's paper, JJ Thomson was the "undisputed world master in the design of atoms".[8]: 296  Rutherford needed to compare his new approach to Thomson's. Thomson's model, presented in 1910,[18] modelled the electron collisions with hyperbolic orbits from his 1906 paper[54] combined with a factor for the positive sphere. Multiple resulting small deflections compounded using a random walk.[8]: 277 

In his paper Rutherford emphasised that single scattering alone could account for Thomson's results if the positive charge were concentrated in the centre. Rutherford computes the probability of single scattering from a compact charge and demonstrates that it is 3 times larger than Thomson's multiple scattering probability. Rutherford completes his analysis including the effects of density and foil thickness, then concludes that thin foils are governed by single scattering, not multiple scattering.[8]: 298 

Later analysis showed Thomson's scattering model could not account for large scattering. The maximum angular deflection from electron scattering or from the positive sphere each come to less than 0.02°; even many such scattering events compounded would result in less than a one degree average deflection and a probability of scattering through 90° of less than one in 103500.[55]: 106 

Target recoil

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Rutherford's analysis assumed that alpha particle trajectories turned at the centre of the atom but the exit velocity was not reduced.[1]: 253  This is equivalent to assuming that the concentrated charge at the centre had infinite mass or was anchored in place. Rutherford discusses the limitations of this assumption by comparing scattering from lighter atoms like aluminium with heavier atoms like gold. If the concentrated charge is lighter it will recoil from the interaction, gaining momentum while the alpha particle loses momentum and consequently slows down.[40]: 676

Modern treatments analyze this type of Coulomb scattering in the centre of mass reference frame. The six coordinates of the two particles (also called "bodies") are converted into three relative coordinates between the two particles and three centre-of-mass coordinates moving in space (called the lab frame). The interaction only occurs in the relative coordinates, giving an equivalent one-body problem[47]: 58  just as Rutherford solved, but with different interpretations for the mass and scattering angle.


Rather than the mass of the alpha particle, the more accurate formula including recoil uses reduced mass:[47]: 80    For Rutherford's alpha particle scattering from gold, with mass of 197, the reduced mass is very close to the mass of the alpha particle:   For lighter aluminium, with mass 27, the effect is greater:   a 13% difference in mass. Rutherford notes this difference and suggests experiments be performed with lighter atoms.[39]: 677 

The second effect is a change in scattering angle. The angle in the relative coordinate system or centre of mass frame needs to be converted to an angle in the lab frame.[47]: 85  In the lab frame, denoted by a subscript L, the scattering angle for a general central potential is   For a heavy particle like gold used by Rutherford, the factor   can be neglected at almost all angles. Then the lab and relative angles are the same,  .

The change in scattering angle alters the formula for differential cross-section needed for comparison to experiment. For any central potential, the differential cross-section in the lab frame is related to that in the centre-of-mass frame by[47]: 88    where  

Limitations to Rutherford's scattering formula

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Very light nuclei and higher energies

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In 1919 Rutherford analyzed alpha particle scattering from hydrogen atoms,[56] showing the limits of the 1911 formula even with corrections for reduced mass.[57]: 191  Similar issues with smaller deviations for He, Mg and Al[58] lead to the conclusion that the alpha particle was penetrating the nucleus in these cases. This allowed the first estimates of the size of atomic nuclei.[1]: 255  Later experiments based on cyclotron acceleration of alpha particles striking heavier nuclei provided data for analysis of interaction between the alpha particle and the nuclear surface. However at energies that push the alpha particles deeper they are strongly absorbed by the nuclei, a more complex interaction.[57]: 228 [24]: 441 

Quantum mechanics

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Rutherford's treatment of alpha particle scattering seems to rely on classical mechanics and yet the particles are of sub-atomic dimensions. However the critical aspects of the theory ultimately rely on conservation of momentum and energy. These concepts apply equally in classical and quantum regimes: the scattering ideas developed by Rutherford apply to subatomic elastic scattering problems like neutron-proton scattering.[47]: 89 

An alternative method to find the scattering angle

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This section presents an alternative method to find the relation between the impact parameter and deflection angle in a single-atom encounter, using a force-centric approach as opposed to the energy-centric one that Rutherford used.

The scattering geometry is shown in this diagram[59][55]: 106 

 

The impact parameter b is the distance between the alpha particle's initial trajectory and a parallel line that goes through the nucleus. Smaller values of b bring the particle closer to the atom so it feels more deflection force resulting in a larger deflection angle θ.[47]: 82  The goal is to find the relationship between b and the deflection angle.

The alpha particle's path is a hyperbola and the net change in momentum   runs along the axis of symmetry. From the geometry in the diagram and the magnitude of the initial and final momentum vectors,  , the magnitude of   can be related to the deflection angle:[55]: 111 

 

A second formula for   involving b will give the relationship to the deflection angle. The net change in momentum can also be found by adding small increments to momentum all along the trajectory using the integral

 

where   is the distance between the alpha particle and the centre of the nucleus and   is its angle from the axis of symmetry. These two are the polar coordinates of the alpha particle at time  . Here the Coulomb force exerted along the line between the alpha particle and the atom is  and the factor   gives that part of the force causing deflection.

The polar coordinates r and φ depend on t in the integral, but they must be related to each other as they both vary as the particle moves. Changing the variable and limits of integration from t to φ makes this connection explicit:[55]: 112 

 

The factor   is the reciprocal of the angular velocity the particle. Since the force is only along the line between the particle and the atom, the angular momentum, which is proportional to the angular velocity, is constant:   This law of conservation of angular momentum gives a formula for  :

 

Replacing   in the integral for ΔP simultaneously eliminates the dependence on r:


 


 


Applying the trigonometric identities   and   to simplify this result gives the second formula for  :

  Solving for θ as a function of b gives the final result

 

Using the following values:

  • qg = positive charge of the gold atom = 79 qe = 1.26×10−17 C
  • qa = charge of the alpha particle = qe = 3.20×10−19 C
  • v = speed of the alpha particle = 1.53×107 m/s
  • m = mass of the alpha particle = 6.64×10−27 kg
  • k = Coulomb constant = 8.987×109 N·m2/C2

and an impact parameter b equal to the radius of a gold nucleus, 7×10−15 m, the estimated deflection angle θ will be 2.56 radians (147°). If b equals the radius of a gold atom (1.44×10−10 m), the estimated angle is a tiny 0.0003 radians (0.02°).[55]: 109 [60]

Why the plum pudding model was wrong

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J. J. Thomson himself didn't study alpha particle scattering, but he did study beta particle scattering. In his 1910 paper "On the Scattering of rapidly moving Electrified Particles", Thomson presented equations that modelled how beta particles scatter in a collision with an atom.[61][8]: 277  Rutherford adapted those equations to alpha particle scattering in his 1911 paper "The Scattering of α and β Particles by Matter and the Structure of the Atom".

Deflection by the positive sphere

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In Thomson's 1910 paper "On the Scattering of rapidly moving Electrified Particles", Thomson presented the following equation (in this article's notation) that isolates the effect of the positive sphere in the plum pudding model on an incoming beta particle.[61][8]: 278 

 

Thomson did not explain how he arrived at this equation, but this section provides an educated guess and at the same time adapts the equation to alpha particle scattering.[62]

Consider an alpha particle passing by a positive sphere of pure positive charge (no electrons) with a radius R and mass equal to those of a gold atom. The alpha particle passes just close enough to graze the edge of the sphere, which is where the electric field of the sphere is strongest.

 
Figure 4

An earlier section of this article presented an equation which models how an incoming charged particle is deflected by another charged particle at a fixed position.

 

This equation can be used to calculate the deflection angle in the special case in Figure 4 by setting the impact parameter b to the same value as the radius of the sphere R. So long as the alpha particle does not penetrate the sphere, there is no practical difference between a sphere of charge and a point charge.

  • qg = positive charge of the gold atom = 79 qe = 1.26×10−17 C
  • qa = charge of the alpha particle = qe = 3.20×10−19 C
  • R = radius of the gold atom = 1.44×10−10 m
  • v = speed of the alpha particle = 1.53×107 m/s
  • m = mass of the alpha particle = 6.64×10−27 kg
  • k = Coulomb constant = 8.987×109 N·m2/C2

 

This shows that the largest possible deflection will be very small, to the point that the path of the alpha particle passing through the positive sphere of a gold atom is almost a straight line. In computing the average deflection, which will be smaller still, the length of the particle's path through the sphere is treated as a chord of length L.

 
Figure 5

Inside a sphere of uniformly distributed positive charge, the force exerted on the alpha particle at any point along its path through the sphere is[63][64]: 106 

 

The lateral component of this force is

 

The lateral change in momentum py is therefore

 

The deflection angle   is given by

 

where px is the average horizontal momentum, which is first reduced then restored as horizontal force changes direction as the alpha particle goes across the sphere. Since the deflection is very small,   is treated as equal to  . The chord length  , per Pythagorean theorem.

The average deflection angle   sums the angle for values of b and L across the entire sphere and divides by the cross-section of the sphere:

 

 

This matches Thomson's formula in his 1910 paper.

Deflection by the electrons

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Consider an alpha particle passing through an atom of radius R along a path of length L. The effect of the positive sphere is ignored so as to isolate the effect of the atomic electrons. As with the positive sphere, deflection by the electrons is expected to be very small, to the point that the path is practically a straight line.

 
Figure 6

For the electrons within an arbitrary distance s of the alpha particle's path, their mean distance will be 1/2s. Therefore, the average deflection per electron will be

 

where qe is the elementary charge. The average net deflection by all the electrons within this arbitrary cylinder of effect around the alpha particle's path is

 

where N0 is the number of electrons per unit volume and   is the volume of this cylinder.

 
Figure 7

Treating L as a straight line,   where b is the distance of this line from the centre. The mean of   is therefore

 

To obtain the mean deflection, replace   in the equation for   :

 

 

where N is the number of electrons in the atom, equal to  .

Cumulative effect

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Applying Thomson's equations described above to an alpha particle colliding with a gold atom, using the following values:

  • qg = positive charge of the gold atom = 79 qe = 1.26×10−17 C
  • qa = charge of the alpha particle = qe = 3.20×10−19 C
  • qe = elementary charge = 1.602×10−19 C
  • R = radius of the gold atom = 1.44×10−10 m
  • v = speed of the alpha particle = 1.53×107 m/s
  • m = mass of the alpha particle = 6.64×10−27 kg
  • k = Coulomb constant = 8.987×109 N·m2/C2
  • N = number of electrons in the gold atom = 79

gives the average angle by which the alpha particle should be deflected by the atomic electrons as:

 

The average angle by which an alpha particle should be deflected by the positive sphere is:

 

The net deflection for a single atomic collision is:

 

On average the positive sphere and the electrons alike provide very little deflection in a single collision. Thomson's model combined many single-scattering events from the atom's electrons and a positive sphere. Each collision may increase or decrease the total scattering angle. Only very rarely would a series of collisions all line up in the same direction. The result is similar to the standard statistical problem called a random walk. If the average deflection angle of the alpha particle in a single collision with an atom is  , then the average deflection after n collisions is

 

The probability that an alpha particle will be deflected by a total of more than 90° after n deflections is given by:

 

where e is Euler's number (≈2.71828...). The gold foils that Geiger and Marsden experimented with were around 10,000 atoms thick. If the average deflection per atom is 0.008°, the average deflection after 10,000 collisions would be 0.8°. The probability of an alpha particle being deflected by more than 90° will be[64]: 109 

 

While in Thomson's plum pudding model it is mathematically possible that an alpha particle could be deflected by more than 90° after 10,000 collisions, the probability of such an event is so low as to be undetectable. This extremely small number shows that Thomson's model cannot explain the results of the Geiger-Mardsen experiment of 1909.

Notes on historical measurements

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Rutherford assumed that the radius of atoms in general to be on the order of 10−10 m and the positive charge of a gold atom to be about 100 times that of hydrogen (100 qe).[40] The atomic weight of gold was known to be around 197 since early in the 19th century.[65] From an experiment in 1906, Rutherford measured alpha particles to have a charge of qe and an atomic weight of 4, and alpha particles emitted by radon to have velocity of 1.70×107 m/s.[66] Rutherford deduced that alpha particles are essentially helium atoms stripped of two electrons, but at the time scientists only had a rough idea of how many electrons atoms have and so the alpha particle was thought to have up to 10 electrons left.[8]: 285  In 1906, J. J. Thomson measured the elementary charge to be about 3.4×10−10 esu (1.3×10−19 C).[67] In 1909 Robert A. Millikan provided a more accurate measurement of 1.5924×10−19 C, only 0.6% off the current accepted measurement. Jean Perrin in 1909 measured the mass of hydrogen to be 1.43×10−27 kg,[68] and if alpha particles are four times as heavy as that, they would have an absolute mass of 5.72×10−27 kg.

The convention in Rutherford's time was to measure charge in electrostatic units, distance in centimeters, force in dynes, and energy in ergs. The modern convention is to measure charge in coulombs, distance in meters, force in newtons, and energy in joules. Using coulombs requires using the Coulomb constant (k) in equations. In this article, Rutherford and Thomson's equations have been rewritten to fit modern notation conventions.

See also

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References

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  1. ^ a b c d e f g Giliberti, Marco; Lovisetti, Luisa (2024). "Rutherford's Hypothesis on the Atomic Structure". Old Quantum Theory and Early Quantum Mechanics. Challenges in Physics Education. Cham: Springer Nature Switzerland. pp. 229–268. doi:10.1007/978-3-031-57934-9_6. ISBN 978-3-031-57933-2.
  2. ^ J. J. Thomson (1897). "Cathode rays". Philosophical Magazine. 44 (269): 293-316.
  3. ^ J. J. Thomson (1907). The Corpuscular Theory of Matter, p. 103: "In default of exact knowledge of the nature of the way in which positive electricity occurs in the atom, we shall consider a case in which the positive electricity is distributed in the way most amenable to mathematical calculation, i.e., when it occurs as a sphere of uniform density, throughout which the corpuscles are distributed."
  4. ^ J. J. Thomson, in a letter to Oliver Lodge dated 11 April 1904, quoted in Davis & Falconer (1997):
    "With regard to positive electrification I have been in the habit of using the crude analogy of a liquid with a certain amount of cohesion, enough to keep it from flying to bits under its own repulsion. I have however always tried to keep the physical conception of the positive electricity in the background because I have always had hopes (not yet realised) of being able to do without positive electrification as a separate entity and to replace it by some property of the corpuscles.
    When one considers that, all the positive electricity does, on the corpuscular theory, is to provide an attractive force to keep the corpuscles together, while all the observable properties of the atom are determined by the corpuscles one feels, I think, that the positive electrification will ultimately prove superfluous and it will be possible to get the effects we now attribute to it from some property of the corpuscle.
    At present I am not able to do this and I use the analogy of the liquid as a way of picturing the missing forces which is easily conceived and lends itself readily to analysis."
  5. ^ Thomson (1907). The Corpuscular Theory of Matter, p. 106: "The general problem of finding how n corpuscles will distribute themselves inside the sphere is very complicated, and I have not succeeded in solving it"
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  19. ^ Beiser (1968). Perspectives of Modern Physics, p. 109
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  28. ^ Reeves (2008)
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  36. ^ Geiger (1908)
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  38. ^ a b Geiger (1910)
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  42. ^ a b AIP
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  48. ^ These equations are in SI units Rutherford[40]: 673  uses cgs units
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  62. ^ Heilbron (1968). p. 278
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Bibliography

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