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Wat (wie) is pain de poisson - definitie
FRENCH MATHEMATICIAN, MECHANICIAN AND PHYSICIST (1781–1840)
Siméon Poisson; Siméon-Denis Poisson; Simeon D. Poisson; Simeon Denis Poisson; Simeon Poisson; Simeon-Denis Poisson; Siméon denis poisson; Simeon denis poisson; S. D. Poisson
![an undergraduate textbook]].](https://commons.wikimedia.org/wiki/Special:FilePath/Front cover of Griffiths' Electrodynamics.jpg?width=200 "an undergraduate textbook]].")
Poisson point process
![An illustration of a marked point process, where the unmarked point process is defined on the positive real line, which often represents time. The random marks take on values in the state space <math>S</math> known as the ''mark space''. Any such marked point process can be interpreted as an unmarked point process on the space <math>[0,\infty]\times S </math>. The marking theorem says that if the original unmarked point process is a Poisson point process and the marks are stochastically independent, then the marked point process is also a Poisson point process on <math>[0,\infty]\times S </math>. If the Poisson point process is homogeneous, then the gaps <math>\tau_i</math> in the diagram are drawn from an exponential distribution.](https://commons.wikimedia.org/wiki/Special:FilePath/Marked point process.png?width=200 "An illustration of a marked point process, where the unmarked point process is defined on the positive real line, which often represents time. The random marks take on values in the state space <math>S</math> known as the ''mark space''. Any such marked point process can be interpreted as an unmarked point process on the space <math>[0,\infty]\times S </math>. The marking theorem says that if the original unmarked point process is a Poisson point process and the marks are stochastically independent, then the marked point process is also a Poisson point process on <math>[0,\infty]\times S </math>. If the Poisson point process is homogeneous, then the gaps <math>\tau_i</math> in the diagram are drawn from an exponential distribution.")
RANDOM MATHEMATICAL OBJECT THAT CONSISTS OF POINTS RANDOMLY LOCATED ON A MATHEMATICAL SPACE
Poisson process; Inhomogeneous Poisson process; Non-homogenous Poisson process; Poisson random process; Poisson Random process; Poisson Random Process; Poisson random Process; Poisson Process; Poisson processes; A Poisson process; Non-homogeneous Poisson process; Nonhomogeneous Poisson process; Spatial Poisson process; Wikipedia talk:Articles for creation/Spatial Poisson Process; Spatial Poisson Process; Poisson point field; Poisson random point field; Homogeneous Poisson process; Homogeneous Poisson point process
In probability, statistics and related fields, a Poisson point process is a type of random mathematical object that consists of points randomly located on a mathematical space. The Poisson point process is often called simply the Poisson process, but it is also called a Poisson random measure, Poisson random point field or Poisson point field.
analgesia
![Young children can indicate their level of pain by pointing to the appropriate face on a children's [[pain scale]].](https://commons.wikimedia.org/wiki/Special:FilePath/Wong-Baker scale with emoji.png?width=200 "Young children can indicate their level of pain by pointing to the appropriate face on a children's [[pain scale]].")
BRANCH OF MEDICINE EMPLOYING AN INTERDISCIPLINARY APPROACH FOR EASING THE SUFFERING AND IMPROVING THE QUALITY OF LIFE OF THOSE LIVING WITH CHRONIC PAIN
Analgesia; Pain control; Pain Management; Algology (medicine); Pain therapy; Pain medicine; Pain relief; Pain releif; Pain Medicine; Pain modulation; Algiatry
[?an(?)l'd?i:z??]
¦ noun Medicine relief of pain through administration of drugs or other methods.
Origin
C18: from Gk analgesia 'painlessness', from an- 'not' + algein 'feel pain'.
Analgesia
BRANCH OF MEDICINE EMPLOYING AN INTERDISCIPLINARY APPROACH FOR EASING THE SUFFERING AND IMPROVING THE QUALITY OF LIFE OF THOSE LIVING WITH CHRONIC PAIN
Analgesia; Pain control; Pain Management; Algology (medicine); Pain therapy; Pain medicine; Pain relief; Pain releif; Pain Medicine; Pain modulation; Algiatry
·noun Absence of sensibility to pain.
Wikipedia
Siméon Denis Poisson
Baron Siméon Denis Poisson FRS FRSE (French: [si.me.ɔ̃ də.ni pwa.sɔ̃]; 21 June 1781 – 25 April 1840) was a French mathematician and physicist who worked on statistics, complex analysis, partial differential equations, the calculus of variations, analytical mechanics, electricity and magnetism, thermodynamics, elasticity, and fluid mechanics. Moreover, he predicted the Poisson spot in his attempt to disprove the wave theory of Augustin-Jean Fresnel, which was later confirmed.
