User:Boris Tsirelson/Sandbox1: Difference between revisions
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was calculated by [[Archimedes]], but only for ''x''=1/4, since only this value was needed, and of course not written in this form, since algebraic notation appeared only in the 16th century. New wonderful formulas with [[Series (mathematics)|infinite sums]] were discovered (and repeatedly rediscovered) in the 14–17 centuries: for [[arctangent]], | was calculated by [[Archimedes]], but only for ''x''=1/4, since only this value was needed, and of course not written in this form, since algebraic notation appeared only in the 16th century. New wonderful formulas with [[Series (mathematics)|infinite sums]] were discovered (and repeatedly rediscovered) in the 14–17 centuries: for [[arctangent]], | ||
:<math> \arctan x = x - \frac{x^3}3 + \frac{x^5}5 - \dots </math> | :<math> \arctan x = x - \frac{x^3}3 + \frac{x^5}5 - \dots </math> | ||
([[Madhava of Sangamagramma]], around 1400; James Gregory, 1671); for [[logarithm]], | ([[Madhava of Sangamagramma]], around 1400; [[James Gregory]], 1671); for [[logarithm]], | ||
:<math> \log (1+x) = x - \frac{x^2}2 + \frac{x^3}3 - \dots </math> | :<math> \log (1+x) = x - \frac{x^2}2 + \frac{x^3}3 - \dots </math> | ||
([[Nicholas Mercator]], 1668); and many others. | ([[Nicholas Mercator]], 1668); and many others. |
Revision as of 07:27, 4 November 2010
Birth and infancy of the idea
Some tables compiled by ancient Babylonians may be treated now as tables of some functions. Also, some arguments of ancient Greeks may be treated now as integration of some functions. Thus, in ancient times some functions were used (implicitly). However, they were not recognized as special cases of a general notion.
Further progress was made in the 14th century. Two "schools of natural philosophy", at Oxford (William Heytesbury, Richard Swineshead) and Paris (Nicole Oresme), trying to investigate natural phenomena mathematically, came to the idea that laws of nature should be formulated as functional relations between physical quantities. The concept of function was born, including a curve as a graph of a function of one variable, and a surface — for two variables. However, the new concept was not yet widely exploited either in mathematics or in its applications. Linear functions were investigated; nonlinear functions were intractable, except for few isolated cases.
Power series
The sum of the geometric series
was calculated by Archimedes, but only for x=1/4, since only this value was needed, and of course not written in this form, since algebraic notation appeared only in the 16th century. New wonderful formulas with infinite sums were discovered (and repeatedly rediscovered) in the 14–17 centuries: for arctangent,
(Madhava of Sangamagramma, around 1400; James Gregory, 1671); for logarithm,
(Nicholas Mercator, 1668); and many others.
Further progress appears in the 17th century from the study of motion (Johannes Kepler, Galileo Galilei) and geometry (P. Fermat, R. Descartes). A formulation by Descartes (La Geometrie, 1637) appeals to graphic representation of a functional dependence and does not involve formulas (algebraic expressions):
If then we should take successively an infinite number of different
values for the line y, we should obtain an infinite number of values for the line x, and therefore an infinity of different points, such as C, by means of which the required curve could be
drawn.
The term function is adopted by Leibniz and Jean Bernoulli between 1694 and 1698, and disseminated by Bernoulli in 1718:
One calls here a function of a variable a quantity composed in any manner whatever of this variable and of constants.
This time a formula is required, which restricts the class of functions. However, what is a formula? Surely, y = 2x2 - 3 is allowed; what about y = sin x? Is it "composed of x"? "In any manner whatever" is now interpreted much more widely than it was possible in 17th century.
... little by little, and often by very subtle detours, various
transcendental operations, the logarithm, the exponential, the trigonometric functions, quadratures, the solution of differential equations, passing to the limit, the summing of series, acquired the
right of being quoted. (Bourbaki, p. 193)
Surely, sin x is not a polynomial of x. However, it is the sum of a power series:
which was found already by James Gregory in 1667. Many other functions were developed into power series by him, Isaac Barrow, Isaac Newton and others. Moreover, all these formulas appeared to be special cases of a much more general formula found by Brook Taylor in 1715.
...
But on the first stage the notion of an algebraic expression is quite restrictive. More general, possibly ill-behaving functions have to wait for the 19th century.