infinitesimal+calculus
71Surreal number — In mathematics, the surreal number system is an arithmetic continuum containing the real numbers as well as infinite and infinitesimal numbers, respectively larger or smaller in absolute value than any positive real number. The surreals share… …
72Pierre de Fermat — Born August 17, 1601( …
73Dual number — For dual grammatical number found in some languages, see Dual (grammatical number). In linear algebra, the dual numbers extend the real numbers by adjoining one new element ε with the property ε2 = 0 (ε is nilpotent). The collection of dual… …
74geometry — /jee om i tree/, n. 1. the branch of mathematics that deals with the deduction of the properties, measurement, and relationships of points, lines, angles, and figures in space from their defining conditions by means of certain assumed properties… …
75Giuseppe Peano — Infobox Scientist name = Giuseppe Peano image width = 220px birth date = birth date|1858|8|27 birth place = Spinetta, Piedmont, Italy death date = death date and age|1932|4|20|1858|8|27 residence = Italy citizenship = Italian field = Mathematics… …
76Bhāskara II — Bhaskara (1114 ndash; 1185), also known as Bhaskara II and Bhaskara Achārya ( Bhaskara the teacher ), was an Indian mathematician and astronomer. He was born near Bijjada Bida (in present day Bijapur district, Karnataka state, South India) into… …
77Исчисление — У этого термина существуют и другие значения, см. Исчисление (значения) …
78Hyperinteger — In non standard analysis, a hyperinteger N is a hyperreal number equal to its own integer part. A hyperinteger may be either finite or infinite. A finite hyperinteger is an ordinary integer. An example of an infinite hyperinteger is given by the… …
79Monad (non-standard analysis) — In non standard analysis, a monad (also called halo[1]) is the set of points infinitely close to a given point. Given a hyperreal number x in R*, the monad of x is the set See also Infinitesimal Notes ^ …
80Philosophiæ Naturalis Principia Mathematica —   Title page of Principia , first edition (1687) Original title …
