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Blaise Pascal's works: text, concordances and frequency lists "Blaise Pascal" . Catholic Encyclopedia. 1913. Etext of Pascal's Pensées (English, in various formats) Etext of Pascal's Lettres Provinciales (English) Etext of a number of Pascal's minor works (English translation) including, De l'Esprit géométrique and De l'Art de persuader.
Pascal's wager is a philosophical argument advanced by Blaise Pascal (1623–1662), seventeenth-century French mathematician, philosopher, physicist, and theologian. [1] This argument posits that individuals essentially engage in a life-defining gamble regarding the belief in the existence of God .
Second edition of Blaise Pascal's Pensées, 1670 The Pensées ( Thoughts ) is a collection of fragments written by the French 17th-century philosopher and mathematician Blaise Pascal . Pascal's religious conversion led him into a life of asceticism , and the Pensées was in many ways his life's work. [ 1 ]
The problem of points, also called the problem of division of the stakes, is a classical problem in probability theory.One of the famous problems that motivated the beginnings of modern probability theory in the 17th century, it led Blaise Pascal to the first explicit reasoning about what today is known as an expected value.
Pascal's main source on Jesuit casuistry was Antonio Escobar's Summula casuum conscientiae (1627), several propositions of which would be later condemned by Pope Innocent XI. Paradoxically, the Provincial Letters were both a success and a defeat: a defeat, on the political and theological level, and a success on the moral level. [ 2 ]
According to Axe, the research he provides with his book disproves Darwin's theory of evolution, revealing "a gaping hole has been at its center from the beginning." Click through 10 books that ...
Philosopher Nick Bostrom argues that Pascal's mugging, like Pascal's wager, suggests that giving a superintelligent artificial intelligence a flawed decision theory could be disastrous. [10] Pascal's mugging may also be relevant when considering low-probability, high-stakes events such as existential risk or charitable interventions with a low ...
Pascal's theorem is the polar reciprocal and projective dual of Brianchon's theorem. It was formulated by Blaise Pascal in a note written in 1639 when he was 16 years old and published the following year as a broadside titled "Essay pour les coniques. Par B. P." [1] Pascal's theorem is a special case of the Cayley–Bacharach theorem.