podobné slovo | definícia |
mathematical (encz) | mathematical,matematický adj: Zdeněk Brož |
mathematical expectation (encz) | mathematical expectation, |
mathematical function (encz) | mathematical function, n: |
mathematical group (encz) | mathematical group, n: |
mathematical logic (encz) | mathematical logic, n: |
mathematical notation (encz) | mathematical notation, n: |
mathematical operation (encz) | mathematical operation, n: |
mathematical process (encz) | mathematical process, n: |
mathematical product (encz) | mathematical product, n: |
mathematical proof (encz) | mathematical proof, n: |
mathematical relation (encz) | mathematical relation, n: |
mathematical space (encz) | mathematical space, n: |
mathematical statement (encz) | mathematical statement, n: |
mathematical statistician (encz) | mathematical statistician, n: |
mathematical symbol (encz) | mathematical symbol, n: |
mathematically (encz) | mathematically,matematicky adv: Zdeněk Brož |
metamathematical (encz) | metamathematical,meta-matematický adj: Zdeněk Brož |
nonmathematical (encz) | nonmathematical,nematematický |
Iatromathematical (gcide) | Iatromathematical \I*a`tro*math`e*mat"ic*al\, a.
Of or pertaining to iatromathematicians or their doctrine.
[1913 Webster] |
Mathematical (gcide) | Mathematical \Math`e*mat"ic*al\, a. [See Mathematic.]
Of or pertaining to mathematics; according to mathematics;
hence, theoretically precise; accurate; as, mathematical
geography; mathematical instruments; mathematical exactness.
-- Math`e*mat"ic*al*ly, adv.
[1913 Webster] |
Mathematically (gcide) | Mathematical \Math`e*mat"ic*al\, a. [See Mathematic.]
Of or pertaining to mathematics; according to mathematics;
hence, theoretically precise; accurate; as, mathematical
geography; mathematical instruments; mathematical exactness.
-- Math`e*mat"ic*al*ly, adv.
[1913 Webster] |
or Mathematical (gcide) | geography \ge*og"ra*phy\, n.; pl. Geographies. [F.
g['e]ographie, l. geographia, fr. Gr. ?; ge`a, gh^, the earth
+ ? description, fr. ? to write, describe. See Graphic.]
1. The science which treats of the world and its inhabitants;
a description of the earth, or a portion of the earth,
including its structure, features, products, political
divisions, and the people by whom it is inhabited. It also
includes the responses and adaptations of people to
topography, climate, soil and vegetation
[1913 Webster + WordNet 1.5]
2. A treatise on this science.
[1913 Webster]
Astronomical, or Mathematical, geography treats of the
earth as a planet, of its shape, its size, its lines of
latitude and longitude, its zones, and the phenomena due
to to the earth's diurnal and annual motions.
Physical geography treats of the conformation of the
earth's surface, of the distribution of land and water, of
minerals, plants, animals, etc., and applies the
principles of physics to the explanation of the
diversities of climate, productions, etc.
Political geography treats of the different countries into
which earth is divided with regard to political and social
and institutions and conditions.
[1913 Webster] |
mathematical (wn) | mathematical
adj 1: of or pertaining to or of the nature of mathematics; "a
mathematical textbook"; "slide rules and other
mathematical instruments"; "a mathematical solution to a
problem"; "mathematical proof"
2: relating to or having ability to think in or work with
numbers; "tests for rating numerical aptitude"; "a
mathematical whiz" [syn: numerical, mathematical] [ant:
verbal]
3: beyond question; "a mathematical certainty"
4: statistically possible though highly improbable; "have a
mathematical chance of making the playoffs"
5: characterized by the exactness or precision of mathematics;
"mathematical precision" |
mathematical function (wn) | mathematical function
n 1: (mathematics) a mathematical relation such that each
element of a given set (the domain of the function) is
associated with an element of another set (the range of the
function) [syn: function, mathematical function,
single-valued function, map, mapping] |
mathematical group (wn) | mathematical group
n 1: a set that is closed, associative, has an identity element
and every element has an inverse [syn: group,
mathematical group] |
mathematical logic (wn) | mathematical logic
n 1: any logical system that abstracts the form of statements
away from their content in order to establish abstract
criteria of consistency and validity [syn: {symbolic
logic}, mathematical logic, formal logic] |
mathematical notation (wn) | mathematical notation
n 1: a notation used by mathematicians |
mathematical operation (wn) | mathematical operation
n 1: (mathematics) calculation by mathematical methods; "the
problems at the end of the chapter demonstrated the
mathematical processes involved in the derivation"; "they
were learning the basic operations of arithmetic" [syn:
mathematical process, mathematical operation,
operation] |
mathematical process (wn) | mathematical process
n 1: (mathematics) calculation by mathematical methods; "the
problems at the end of the chapter demonstrated the
mathematical processes involved in the derivation"; "they
were learning the basic operations of arithmetic" [syn:
mathematical process, mathematical operation,
operation] |
mathematical product (wn) | mathematical product
n 1: a quantity obtained by multiplication; "the product of 2
and 3 is 6" [syn: product, mathematical product] |
mathematical proof (wn) | mathematical proof
n 1: proof of a mathematical theorem |
mathematical relation (wn) | mathematical relation
n 1: a relation between mathematical expressions (such as
equality or inequality) |
mathematical space (wn) | mathematical space
n 1: (mathematics) any set of points that satisfy a set of
postulates of some kind; "assume that the topological space
is finite dimensional" [syn: mathematical space,
topological space] |
mathematical statement (wn) | mathematical statement
n 1: a statement of a mathematical relation |
mathematical statistician (wn) | mathematical statistician
n 1: a mathematician who specializes in statistics [syn:
statistician, mathematical statistician] |
mathematical symbol (wn) | mathematical symbol
n 1: a character that is used to indicates a mathematical
relation or operation |
mathematically (wn) | mathematically
adv 1: with respect to mathematics; "mathematically impossible" |
automatic mathematical translation (foldoc) | Automatic Mathematical TRANslation
AMTRAN
(AMTRAN) A system developed by NASA in
Huntsville in 1966 for the IBM 1620, based on the
Culler-Fried System. It required a special terminal.
["AMTRAN: An Interactive Computing System", J. Reinfelds, Proc
FJCC 37:537- 542, AFIPS (Fall 1970)].
(1995-11-14)
|
guide to available mathematical software (foldoc) | Guide to Available Mathematical Software
GAMS
(http://gams.nist.gov/).
(1995-04-28)
|
mathematical analysis without programming (foldoc) | Mathematical Analysis without Programming
(MAP) An On-line system for mathematics under CTSS.
[Sammet 1969, p. 240].
(1995-02-10)
|
mathematical analyzer, numerical integrator and computer (foldoc) | Mathematical Analyzer, Numerical Integrator and Computer
MANIAC
(MANIAC, Or "Mathematical Analyzer, Numerator,
Integrator, and Computer") An early computer, built for the {Los
Alamos Scientific Laboratory}. MANIAC began operation in March
1952. Typical of early computers, it ran its own propriatery
language. It was succeeded by MANIAC II in 1957. A {MANIAC
III} was built at the University of Chicago in 1964.
Contrary to legend, MANIAC did not run MAD ({Michigan Algorithm
Decoder}), which was not invented until 1959.
(2013-05-05)
|
symbolic mathematical laboratory (foldoc) | Symbolic Mathematical Laboratory
An on-line system under CTSS for
symbolic mathematics. It used a display screen and a
light pen.
[Sammet 1969, p.514].
(1995-04-16)
|
MATHEMATICAL EVIDENC (bouvier) | MATHEMATICAL EVIDENCE. That evidence which is established by a
demonstration. It is used in contradistinction to moral evidence. (q.v.)
|