Newton 481, Leibniz's evaluation of Newton
2017-10-05 11:24, netizen "Shi Lu Yusi" published an article titled "Flow Method and Calculus Who is orthodox, two big bulls, an island and a continent academic dispute".
... Differentiation, differentiation: see Newton 321~336...
... Products, points, points: see Newton 337~405...
... Calculus: See Newton 407...
... Learning, Technique, Scholarship: See Newton 193...
Article content:
... Contents, contents, contents: see Euclid 66...
(...Euclid: Novel title... )
Calculus is the branch of mathematics in higher mathematics that studies the differentiation of functions, integration, and related concepts and applications.
... Calculus (English): n. (noun) calculus...
... Mathematics, Learning, Mathematics: See Euclid 49...
... Advanced Mathematics: See Newton 202-210...
... Research, research, research: see Euclid 42...
... Functions, numbers, functions: see Euclid 52...
... differential: n. difference; difference; difference; difference; wage scale difference (especially for different types of work in the same industry).
adj. (adjective) differentiated; differentiated; differentiated...
... Integrals:n. Integral...
... Concepts, Concepts: See Euclid 22, 23...
... Should, use, apply: see Euclid 181...
It is a fundamental subject of mathematics.
... Basis, Foundation, Foundation: See Euclid 37...
The content mainly includes limits, differentiation, integrals and their applications.
... Pole, limit, limit: see Newton 202~321...
In the mathematical world, especially in the calculus world, no one knows the Newton-Leibniz (cí) formula, and they all know this paragraph of public cases, which have been very noisy in history, and I also want to help sort it out, to see if it can be clearly sorted out, and the road must be understood.
... Gong: See Euclid 1...
... Formula, formula: see Euclid 132...
... Newton–Leibniz Formula: See Newton 358-362...
... History, History: See Euclid 111...
Sir Newton
Sir Isaac Newton (4 January 1643 – 31 March 1727), President of the Royal Society, a famous British physicist, and an encyclopedic "all-rounder", author of The Mathematical Principles of Natural Philosophy and Optics.
... Physics, Physics, Physics, Physics: See Euclid 139...
... Home: A person who has mastered a certain specialized knowledge or engaged in a certain specialized activity: specialized~ Draw ~. Politics~. Science~. Art~. Social Activities ~... See Euclid 92...
... Spontaneous, Natural: See Euclid 128...
... Philosophy, Learning, Philosophy: See Euclid 110...
... Principle, Principle: See Euclid 41...
...The Mathematical Principles of Natural Philosophy: see Newton 1-77...
His mathematical achievements include the proof of the generalized binomial theorem, the invention of calculus, and so on.
... Proof, Proof: See Euclid 6...
... Theorems, theorems, theorems: see Euclid 2...
... Fa, Ming, Invention: See Newton 84...
Physics has gravity and the three laws of motion, conservation of momentum and angular momentum, the invention of reflecting telescopes, the development of color theory, the systematic expression of the law of cooling, etc.
... Gravity: See Newton 20-74 "The Law of Universal Gravitation"...
... Movement, Movement: See Galileo 9...
(...Galileo: Novel title... )
... Determination, Law, Law: See Euclid 79...
... Three laws of motion: the law of inertia; the law of acceleration; the law of force and reaction... See Newton 452...
... Momentum, Quantity, Momentum: See Galileo 41...
... Development, Development: See Galileo 21...
... Face, color, color: see Newton 80...
... Theory, Theory: See Euclid 5...
... System, System: See Euclid 37...
We will not talk about the achievements in physics, the achievements of mathematics, his old rival Leibniz (cí) to the effect that : "Half of Newton's and previous mathematical achievements are Newton's." ”
Newton's interest in calculus began in the autumn of 1664, when he began to study Descartes' Differentiation, the same cartesian who founded analytic geometry.
... Analytic Geometry (Coordinate Geometry): See Euclid 36...
Descartes proposed the "circular method" in his Geometry to find the slope of the geometric curve.
... Slope, rate, slope: see Newton 289...
Newton thought That Descartes' approach was good, but at the same time, he was not satisfied with this method, and he wondered if there was a better way to achieve it.
... Fang, Method, Method: See Euclid 2, 3...
So he used the letter o, which represented the infinitesimal increment of x and tended to 0, to replace the Cartesian method.
... o: The English name Omicron (uppercase Ο, lowercase ο) is the fifteenth Greek letter.
Lowercase ο for: higher-order infinitesimal functions...
(... Order, no, no, no, no, no )
"Guan Zhong Peep Leopard (Chinese idiom): Guan Zhong Peep Leopard is an idiom, which first came from the "Shi Shu Xinyu Fangzheng".
Peeping leopard in the tube means to see the leopard from the small hole in the bamboo pipe, the tube hole is small and the leopard runs extremely fast, mocking some people with a narrow and one-sided perspective and knowledge and not being able to see the facts; the metaphor only sees a small part of things, referring to what is not comprehensive or slightly gained.
See the next episode, "Newton 482, The Concept of Flow Numbers is Actually a Physics Concept; Peeping Leopard in the Tube""
If you don't know history, you can't see the future
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