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Brown's observations on Brownian motion

In 1828, Robert Brown published the manuscript entitled “A brief account of microscopical observations made in the months of June, July and August 1827, on the particles contained in the pollen of plants; and on the general existence of active molecules in organic and inorganic bodies” in the Edinburgh new Philosophical Journal [download it in pdf format here]. He suspended some of the pollen grains of the species Clarkia pulchella in water and examined them closely, only to see them “filled with particles” of around 5 µm diameter that were “very evidently in motion”. He was soon satisfied that the movement “arose neither from currents in the fluid nor form its gradual evaporation, but belonged to the particle itself”. Brown’s work was the first comprehensive observation of a phenomena called Brownian motion which remained unexplained until the beginning of the 20th century by Bachelier and most notably by Einstein in his famous paper in 1905. Brownian motion is the most basic description of the dynamics of a particle, price, etc. under the influence of external noise.

Microscope used by BrownMicroscope used by Brown

A typical mistake found in books, encyclopedias and articles (even in the Nature journal and even by the great Giorgio Parisi) is that Brown observed the motion of the pollen grains themselves. This might be the most clear example of a propagated mistake in the scientific literature, since it is obvious from the very title that the particles he observed were “in the pollen grains”. In fact, using the explanation of the motion by Einstein is easy to convince ourselves that the pollen grains were too big to wander around enough to be observable: Einstein in 1905 published a paper (original in german) in which he derived the famous Einstein relation in kinetic theory

$$D = \frac{k_B T}{6 \pi \eta r}$$

which relates the diffusion constant of the Brownian motion of a particle \(D\) with the radius of the particle \(r\) and the viscosity of the medium in which the particle is moving \(\eta\). The diffusion constant \(D\) is also proportional to the temperature \(T\) and \(k_B\) is the Boltzmann constant. In order to observe the motion by eye, the particle should move considerably in a matter of seconds. We can evaluate the size of the movement by looking at the root-mean-square fluctuations in the position which are given by

$$\langle x^2(t)\rangle = D t$$

For a pollen grain the radius is around \(\simeq 100 \mu m\) and in water at \(T =\) 25ºC we get that \(\langle x^2(t)\rangle = 19 \mu m\) in … one day!! This slow pace motion is hard to observe with today optical microscopes by eye, not to say with the microscope used by Brown (see the above picture).

To observe the Brownian motion by eye, the particles should be smaller. If we assume that the radius should be small enough so that the RMS fluctuations in one second are greater or of the order of the particle size, we get that

$$r \leq 1 \mu m$$

that is, of the same length of the particles observed by Brown inside the pollen grain. In the following video you can see this molecular motion in an experiment made a research group in the Universidad Complutense de Madrid (Luis Dinis, Julio Serna, Rodrigo Soto and Ricardo Brito) using polystyrene spheres of \(0.75-0.89\mu m\) diameter in water. The observations are made with an optical microscope using a 60x objective. The Brownian motion is evident.

More information about Brown’s observations and related work:

Update: Julio Serna (thanks) sent me this interesting reference:

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Professor at Northeastern University. Working on Complex Systems, Social Networks and Urban Science.