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No he is known for General relativity, Special relativity, Photoelectric effect, Brownian motion, Mass-energy equivalence , Einstein field equations,Unified Field Theory, Bose-Einstein statistics
Brownian motion see http://en.wikipedia.org/wiki/Brownian_motion
1. When Maxwell's Equations predict an electro-magnetic wave travelling at a certain speed, what frame is that speed measured from? 2. How to explain the photo-electric effect. 3. How to explain Brownian Motion. 4. Can gravity be added to special relativity? If he had solved any one of the above issues, Einstein would have been regarded as one of the great minds of the 1900s. He solved all of them! However, he was unable to solve either of these: 1) Can the electric field be added to general relativity? 2) Is there a general paradigm for our Universe in which quantum mechanics is only a useful subset of reality? They both remain unsolved today.
The probability of an event is usually expressed as a fraction between 0 and 1 or the corresponding percentage. There are many processes in science that have some random element: from the Brownian motion of molecules in a fluid to genetics. The outcomes cannot be determined in advance: only the probabilities of the possible outcomes.
Any ordered set of numbers (and other things) is a sequence. There need not be any discernible pattern to the sequence (Brownian motion, for example), or a pattern which is understood only by the person who defined the sequence. With the last category in mind, every ordered set of numbers is a correct sequence.
Ioannis Karatzas has written: 'Brownian motion and stochastic calculus' -- subject(s): Brownian motion processes, Stochastic analysis 'Lectures on the mathematics of finance' -- subject(s): Business mathematics 'Applied Stochastic Analysis' 'Construction of stationary Markov equilibria in a strategic market game'
The mathematical theory of stochastic integrals, i.e. integrals where the integrator function is over the path of a stochastic, or random, process. Brownian motion is the classical example of a stochastic process. It is widely used to model the prices of financial assets and is at the basis of Black and Scholes' theory of option pricing.
Kazuaki Taira has written: 'Diffusion processes and partial differential equations' -- subject(s): Boundary value problems, Elliptic operators, Markov processes 'Brownian motion and index formulas for the de Rham complex' -- subject(s): Brownian motion processes, Hodge theory, Riemannian manifolds 'Brownian Motion and Index Formulas for the De Rham Complex (Mathematical Research (Vch Pub))'
Brownian motion is the random moving and mixing of particles.
Brownian Motion
Brownian Motion Ultimate was created in 1975.
The haphazard motion of particles of matter is called brownian motion.
brownian motion
NO,the don't.only colloids show brownian motion.
Brownian motion is evidence of random motion of molecules.
No he is known for General relativity, Special relativity, Photoelectric effect, Brownian motion, Mass-energy equivalence , Einstein field equations,Unified Field Theory, Bose-Einstein statistics
S. aureus has the Brownian movement, it does not have true motility. Brownian movement is when movement is caused by shaking and being bumped into by other bacteria not by s. aureus itself with a purposeful direction.