| slovo | definícia |
theorem
(mass) | theorem
- teoréma |
theorem
(encz) | theorem,věta n: [mat.] |
Theorem
(gcide) | Theorem \The"o*rem\, v. t.
To formulate into a theorem.
[1913 Webster] Theorematic |
Theorem
(gcide) | Theorem \The"o*rem\, n. [L. theorema, Gr. ? a sight,
speculation, theory, theorem, fr. ? to look at, ? a
spectator: cf. F. th['e]or[`e]me. See Theory.]
1. That which is considered and established as a principle;
hence, sometimes, a rule.
[1913 Webster]
Not theories, but theorems (?), the intelligible
products of contemplation, intellectual objects in
the mind, and of and for the mind exclusively.
--Coleridge.
[1913 Webster]
By the theorems,
Which your polite and terser gallants practice,
I re-refine the court, and civilize
Their barbarous natures. --Massinger.
[1913 Webster]
2. (Math.) A statement of a principle to be demonstrated.
[1913 Webster]
Note: A theorem is something to be proved, and is thus
distinguished from a problem, which is something to be
solved. In analysis, the term is sometimes applied to a
rule, especially a rule or statement of relations
expressed in a formula or by symbols; as, the binomial
theorem; Taylor's theorem. See the Note under
Proposition, n., 5.
[1913 Webster]
Binomial theorem. (Math.) See under Binomial.
Negative theorem, a theorem which expresses the
impossibility of any assertion.
Particular theorem (Math.), a theorem which extends only to
a particular quantity.
Theorem of Pappus. (Math.) See Centrobaric method, under
Centrobaric.
Universal theorem (Math.), a theorem which extends to any
quantity without restriction.
[1913 Webster] |
theorem
(wn) | theorem
n 1: a proposition deducible from basic postulates
2: an idea accepted as a demonstrable truth |
| | podobné slovo | definícia |
coase theorem
(encz) | Coase Theorem,Coaseův teorém [eko.] RNDr. Pavel Piskač |
coase theorem corollary
(encz) | Coase Theorem Corollary,důsledek Coaseova teorému [eko.] RNDr. Pavel
Piskač |
pythagorean theorem
(encz) | Pythagorean theorem, |
theorems
(encz) | theorems,teorémy n: pl. Zdeněk Brož |
Binomial theorem
(gcide) | Theorem \The"o*rem\, n. [L. theorema, Gr. ? a sight,
speculation, theory, theorem, fr. ? to look at, ? a
spectator: cf. F. th['e]or[`e]me. See Theory.]
1. That which is considered and established as a principle;
hence, sometimes, a rule.
[1913 Webster]
Not theories, but theorems (?), the intelligible
products of contemplation, intellectual objects in
the mind, and of and for the mind exclusively.
--Coleridge.
[1913 Webster]
By the theorems,
Which your polite and terser gallants practice,
I re-refine the court, and civilize
Their barbarous natures. --Massinger.
[1913 Webster]
2. (Math.) A statement of a principle to be demonstrated.
[1913 Webster]
Note: A theorem is something to be proved, and is thus
distinguished from a problem, which is something to be
solved. In analysis, the term is sometimes applied to a
rule, especially a rule or statement of relations
expressed in a formula or by symbols; as, the binomial
theorem; Taylor's theorem. See the Note under
Proposition, n., 5.
[1913 Webster]
Binomial theorem. (Math.) See under Binomial.
Negative theorem, a theorem which expresses the
impossibility of any assertion.
Particular theorem (Math.), a theorem which extends only to
a particular quantity.
Theorem of Pappus. (Math.) See Centrobaric method, under
Centrobaric.
Universal theorem (Math.), a theorem which extends to any
quantity without restriction.
[1913 Webster]Binomial \Bi*no"mi*al\, a.
1. Consisting of two terms; pertaining to binomials; as, a
binomial root.
[1913 Webster]
2. (Nat. Hist.) Having two names; -- used of the system by
which every animal and plant receives two names, the one
indicating the genus, the other the species, to which it
belongs.
[1913 Webster]
Binomial theorem (Alg.), the theorem which expresses the
law of formation of any power of a binomial.
[1913 Webster] |
Negative theorem
(gcide) | Theorem \The"o*rem\, n. [L. theorema, Gr. ? a sight,
speculation, theory, theorem, fr. ? to look at, ? a
spectator: cf. F. th['e]or[`e]me. See Theory.]
1. That which is considered and established as a principle;
hence, sometimes, a rule.
[1913 Webster]
Not theories, but theorems (?), the intelligible
products of contemplation, intellectual objects in
the mind, and of and for the mind exclusively.
--Coleridge.
[1913 Webster]
By the theorems,
Which your polite and terser gallants practice,
I re-refine the court, and civilize
Their barbarous natures. --Massinger.
[1913 Webster]
2. (Math.) A statement of a principle to be demonstrated.
[1913 Webster]
Note: A theorem is something to be proved, and is thus
distinguished from a problem, which is something to be
solved. In analysis, the term is sometimes applied to a
rule, especially a rule or statement of relations
expressed in a formula or by symbols; as, the binomial
theorem; Taylor's theorem. See the Note under
Proposition, n., 5.
[1913 Webster]
Binomial theorem. (Math.) See under Binomial.
Negative theorem, a theorem which expresses the
impossibility of any assertion.
Particular theorem (Math.), a theorem which extends only to
a particular quantity.
Theorem of Pappus. (Math.) See Centrobaric method, under
Centrobaric.
Universal theorem (Math.), a theorem which extends to any
quantity without restriction.
[1913 Webster] |
Particular theorem
(gcide) | Theorem \The"o*rem\, n. [L. theorema, Gr. ? a sight,
speculation, theory, theorem, fr. ? to look at, ? a
spectator: cf. F. th['e]or[`e]me. See Theory.]
1. That which is considered and established as a principle;
hence, sometimes, a rule.
[1913 Webster]
Not theories, but theorems (?), the intelligible
products of contemplation, intellectual objects in
the mind, and of and for the mind exclusively.
--Coleridge.
[1913 Webster]
By the theorems,
Which your polite and terser gallants practice,
I re-refine the court, and civilize
Their barbarous natures. --Massinger.
[1913 Webster]
2. (Math.) A statement of a principle to be demonstrated.
[1913 Webster]
Note: A theorem is something to be proved, and is thus
distinguished from a problem, which is something to be
solved. In analysis, the term is sometimes applied to a
rule, especially a rule or statement of relations
expressed in a formula or by symbols; as, the binomial
theorem; Taylor's theorem. See the Note under
Proposition, n., 5.
[1913 Webster]
Binomial theorem. (Math.) See under Binomial.
Negative theorem, a theorem which expresses the
impossibility of any assertion.
Particular theorem (Math.), a theorem which extends only to
a particular quantity.
Theorem of Pappus. (Math.) See Centrobaric method, under
Centrobaric.
Universal theorem (Math.), a theorem which extends to any
quantity without restriction.
[1913 Webster] |
Theorem
(gcide) | Theorem \The"o*rem\, v. t.
To formulate into a theorem.
[1913 Webster] TheorematicTheorem \The"o*rem\, n. [L. theorema, Gr. ? a sight,
speculation, theory, theorem, fr. ? to look at, ? a
spectator: cf. F. th['e]or[`e]me. See Theory.]
1. That which is considered and established as a principle;
hence, sometimes, a rule.
[1913 Webster]
Not theories, but theorems (?), the intelligible
products of contemplation, intellectual objects in
the mind, and of and for the mind exclusively.
--Coleridge.
[1913 Webster]
By the theorems,
Which your polite and terser gallants practice,
I re-refine the court, and civilize
Their barbarous natures. --Massinger.
[1913 Webster]
2. (Math.) A statement of a principle to be demonstrated.
[1913 Webster]
Note: A theorem is something to be proved, and is thus
distinguished from a problem, which is something to be
solved. In analysis, the term is sometimes applied to a
rule, especially a rule or statement of relations
expressed in a formula or by symbols; as, the binomial
theorem; Taylor's theorem. See the Note under
Proposition, n., 5.
[1913 Webster]
Binomial theorem. (Math.) See under Binomial.
Negative theorem, a theorem which expresses the
impossibility of any assertion.
Particular theorem (Math.), a theorem which extends only to
a particular quantity.
Theorem of Pappus. (Math.) See Centrobaric method, under
Centrobaric.
Universal theorem (Math.), a theorem which extends to any
quantity without restriction.
[1913 Webster] |
Theorem of Pappus
(gcide) | Theorem \The"o*rem\, n. [L. theorema, Gr. ? a sight,
speculation, theory, theorem, fr. ? to look at, ? a
spectator: cf. F. th['e]or[`e]me. See Theory.]
1. That which is considered and established as a principle;
hence, sometimes, a rule.
[1913 Webster]
Not theories, but theorems (?), the intelligible
products of contemplation, intellectual objects in
the mind, and of and for the mind exclusively.
--Coleridge.
[1913 Webster]
By the theorems,
Which your polite and terser gallants practice,
I re-refine the court, and civilize
Their barbarous natures. --Massinger.
[1913 Webster]
2. (Math.) A statement of a principle to be demonstrated.
[1913 Webster]
Note: A theorem is something to be proved, and is thus
distinguished from a problem, which is something to be
solved. In analysis, the term is sometimes applied to a
rule, especially a rule or statement of relations
expressed in a formula or by symbols; as, the binomial
theorem; Taylor's theorem. See the Note under
Proposition, n., 5.
[1913 Webster]
Binomial theorem. (Math.) See under Binomial.
Negative theorem, a theorem which expresses the
impossibility of any assertion.
Particular theorem (Math.), a theorem which extends only to
a particular quantity.
Theorem of Pappus. (Math.) See Centrobaric method, under
Centrobaric.
Universal theorem (Math.), a theorem which extends to any
quantity without restriction.
[1913 Webster]Centrobaric \Cen`tro*bar"ic\, a. [Gr. (?) ? a treatise of
Archimedes on finding the center of gravity, fr. ?
gravitating toward the center; ? center + ? weight.]
Relating to the center of gravity, or to the process of
finding it.
[1913 Webster]
Centrobaric method (Math.), a process invented for the
purpose of measuring the area or the volume generated by
the rotation of a line or surface about a fixed axis,
depending upon the principle that every figure formed by
the revolution of a line or surface about such an axis has
for measure the product of the line or surface by the
length of the path of its center of gravity; -- sometimes
called theorem of Pappus, also, incorrectly, {Guldinus's
properties}. See Barycentric calculus, under Calculus.
[1913 Webster] |
theorem of Pappus
(gcide) | Theorem \The"o*rem\, n. [L. theorema, Gr. ? a sight,
speculation, theory, theorem, fr. ? to look at, ? a
spectator: cf. F. th['e]or[`e]me. See Theory.]
1. That which is considered and established as a principle;
hence, sometimes, a rule.
[1913 Webster]
Not theories, but theorems (?), the intelligible
products of contemplation, intellectual objects in
the mind, and of and for the mind exclusively.
--Coleridge.
[1913 Webster]
By the theorems,
Which your polite and terser gallants practice,
I re-refine the court, and civilize
Their barbarous natures. --Massinger.
[1913 Webster]
2. (Math.) A statement of a principle to be demonstrated.
[1913 Webster]
Note: A theorem is something to be proved, and is thus
distinguished from a problem, which is something to be
solved. In analysis, the term is sometimes applied to a
rule, especially a rule or statement of relations
expressed in a formula or by symbols; as, the binomial
theorem; Taylor's theorem. See the Note under
Proposition, n., 5.
[1913 Webster]
Binomial theorem. (Math.) See under Binomial.
Negative theorem, a theorem which expresses the
impossibility of any assertion.
Particular theorem (Math.), a theorem which extends only to
a particular quantity.
Theorem of Pappus. (Math.) See Centrobaric method, under
Centrobaric.
Universal theorem (Math.), a theorem which extends to any
quantity without restriction.
[1913 Webster]Centrobaric \Cen`tro*bar"ic\, a. [Gr. (?) ? a treatise of
Archimedes on finding the center of gravity, fr. ?
gravitating toward the center; ? center + ? weight.]
Relating to the center of gravity, or to the process of
finding it.
[1913 Webster]
Centrobaric method (Math.), a process invented for the
purpose of measuring the area or the volume generated by
the rotation of a line or surface about a fixed axis,
depending upon the principle that every figure formed by
the revolution of a line or surface about such an axis has
for measure the product of the line or surface by the
length of the path of its center of gravity; -- sometimes
called theorem of Pappus, also, incorrectly, {Guldinus's
properties}. See Barycentric calculus, under Calculus.
[1913 Webster] |
Theorematic
(gcide) | Theorematic \The`o*re*mat"ic\, Theorematical
\The`o*re*mat"ic*al\, a. [Cf. Gr. ?.]
Of or pertaining to a theorem or theorems; comprised in a
theorem; consisting of theorems.
[1913 Webster] |
Theorematical
(gcide) | Theorematic \The`o*re*mat"ic\, Theorematical
\The`o*re*mat"ic*al\, a. [Cf. Gr. ?.]
Of or pertaining to a theorem or theorems; comprised in a
theorem; consisting of theorems.
[1913 Webster] |
Theorematist
(gcide) | Theorematist \The`o*rem"a*tist\, n.
One who constructs theorems.
[1913 Webster] |
Theoremic
(gcide) | Theoremic \The`o*rem"ic\, a.
Theorematic. --Grew.
[1913 Webster] Theoretic |
Universal theorem
(gcide) | Theorem \The"o*rem\, n. [L. theorema, Gr. ? a sight,
speculation, theory, theorem, fr. ? to look at, ? a
spectator: cf. F. th['e]or[`e]me. See Theory.]
1. That which is considered and established as a principle;
hence, sometimes, a rule.
[1913 Webster]
Not theories, but theorems (?), the intelligible
products of contemplation, intellectual objects in
the mind, and of and for the mind exclusively.
--Coleridge.
[1913 Webster]
By the theorems,
Which your polite and terser gallants practice,
I re-refine the court, and civilize
Their barbarous natures. --Massinger.
[1913 Webster]
2. (Math.) A statement of a principle to be demonstrated.
[1913 Webster]
Note: A theorem is something to be proved, and is thus
distinguished from a problem, which is something to be
solved. In analysis, the term is sometimes applied to a
rule, especially a rule or statement of relations
expressed in a formula or by symbols; as, the binomial
theorem; Taylor's theorem. See the Note under
Proposition, n., 5.
[1913 Webster]
Binomial theorem. (Math.) See under Binomial.
Negative theorem, a theorem which expresses the
impossibility of any assertion.
Particular theorem (Math.), a theorem which extends only to
a particular quantity.
Theorem of Pappus. (Math.) See Centrobaric method, under
Centrobaric.
Universal theorem (Math.), a theorem which extends to any
quantity without restriction.
[1913 Webster] |
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