AI & ChatGPT searches , social queriess for CARDINAL AND-ORDINAL-NUMBERS
Search references for CARDINAL AND-ORDINAL-NUMBERS. Phrases containing CARDINAL AND-ORDINAL-NUMBERS
See searches and references containing CARDINAL AND-ORDINAL-NUMBERS!
Search references for CARDINAL AND-ORDINAL-NUMBERS. Phrases containing CARDINAL AND-ORDINAL-NUMBERS
See searches and references containing CARDINAL AND-ORDINAL-NUMBERS!CARDINAL AND-ORDINAL-NUMBERS
1958 book by Wacław Sierpiński
Cardinal and Ordinal Numbers is a book on transfinite numbers, by Polish mathematician Wacław Sierpiński. It was published in 1958 by Państwowe Wydawnictwo
Cardinal_and_Ordinal_Numbers
Generalization of "n-th" to infinite cases
different infinite ordinals can correspond to sets having the same cardinal. Like other kinds of numbers, ordinals can be added, multiplied, and exponentiated
Ordinal_number
Names of numbers in English
Ordinal numbers predate the invention of zero and positional notation. Ordinal numbers such as 21st, 33rd, etc., are formed by combining a cardinal ten
English_numerals
Word representing the position or rank in a sequential order
for the corresponding cardinal numbers with the addition of a small twist of the wrist. Look up Appendix:English ordinal numbers in Wiktionary, the free
Ordinal_numeral
Number that is larger than all finite numbers
transfinite cardinals, which are cardinal numbers used to quantify the size of infinite sets, and the transfinite ordinals, which are ordinal numbers used to
Transfinite_number
Infinite ordinal number class
limit ordinal is an ordinal number that is neither zero nor a successor ordinal. Alternatively, an ordinal λ is a limit ordinal if there is an ordinal less
Limit_ordinal
Size of a possibly infinite set
to infinite sets and sequences, with the position aspect leading to ordinal numbers, and the size aspect leading to cardinal numbers. When considering
Cardinal_number
Infinite cardinal number
or aleph-null) is the cardinality of the set of all natural numbers, and is an infinite cardinal. The set of all finite ordinals, called ω {\displaystyle
Aleph_number
Part of speech used to count
classified as definite, and are related to ordinal numbers, such as the English first, second, third, etc. Arity Cardinal number for the related usage in mathematics
Cardinal_numeral
Operations on ordinals that extend classical arithmetic
mathematical field of set theory, ordinal arithmetic includes binary operations on ordinal numbers such as addition, multiplication, and exponentiation. Each can
Ordinal_arithmetic
Mathematician (1845–1918)
the existence of an infinity of infinities. He defined the cardinal and ordinal numbers and their arithmetic. Cantor's work is of great philosophical interest
Georg_Cantor
Type of cardinal number in mathematics
sum of a finite number of finite cardinal numbers is itself finite. ω + 1 {\displaystyle \omega +1} is the next ordinal number greater than ω {\displaystyle
Regular_cardinal
Size of a set in mathematics
to Cardinality. Wikidata has the properties: group cardinality (P1164) (see uses) set cardinality (P2820) (see uses) Cardinal and Ordinal Numbers Fuzzy
Cardinality
Numeral system using letters of the Hebrew alphabet
used. Cardinal and ordinal numbers must agree in gender with the noun they are describing. If there is no such noun (e.g., in telephone numbers), the
Hebrew_numerals
Type of transfinite numbers
and of "weaker" operations like addition and multiplication. The original epsilon numbers were introduced by Georg Cantor in the context of ordinal arithmetic;
Epsilon_number
forms, corresponding to the cardinal and ordinal numbers. The cardinal adverbials are formed by suffixing -krat to a cardinal number: ênkrat (once), dvákrat
Slovene_numerals
Omitted words still understood in context
ellipsis occurs with a limited set of determinatives in English (cardinal and ordinal numbers and possessive determiners), though it is much freer in other languages
Ellipsis_(linguistics)
Size of subsets in order theory
non-empty set of cardinal numbers has a least member. The cofinality of a partially ordered set A can alternatively be defined as the least ordinal x such that
Cofinality
Number used for counting
which is the ordinal number that describes its shape of ordering. The position labels here are not counts or size like with the cardinal numbers, just ordered
Natural_number
Smallest ordinal number that, considered as a set, is uncountable
+1} . Formally, cardinal numbers are usually represented as their initial ordinals, in which case ω 1 {\displaystyle \omega _{1}} and ℵ 1 {\displaystyle
First_uncountable_ordinal
In contrast with ordinal utility, in economics
economists originally attempted to replace cardinal utility with the apparently weaker concept of ordinal utility. Cardinal utility appears to impose the assumption
Cardinal_utility
Reconstructed proto-language
(eyes, ears, shoulders), certain fixed expressions, and agreement of nouns when used with numbers; it is synchronically often analyzed as genitive singular
Proto-Balto-Slavic_language
Extremely small quantity in calculus; thing so small that there is no way to measure it
developed surreal numbers, a related formalization of infinite and infinitesimal numbers that include both hyperreal cardinal and ordinal numbers, which is the
Infinitesimal
Type of infinite number in set theory
inaccessible cardinals, Grothendieck universes are very well-closed under set-theoretic operations. An ordinal is a weakly inaccessible cardinal if and only if
Inaccessible_cardinal
Character(s) following an ordinal number
an ordinal indicator is a character, or group of characters, following a numeral denoting that it is an ordinal number, rather than a cardinal number
Ordinal_indicator
Smallest cardinal strictly greater in size than another cardinal
operation on cardinal numbers in a similar way to the successor operation on the ordinal numbers. The cardinal successor coincides with the ordinal successor
Successor_cardinal
Ordinals in mathematics and set theory
ordinal, ω1), described below. Ordinal numbers below ωCK 1 are the recursive ordinals (see below). Countable ordinals larger than this may still be defined
Large_countable_ordinal
well-ordered sets, and the ordinal numbers are the equivalence classes. Two sets of the same order type have the same cardinality. The converse is not
Paradoxes_of_set_theory
Name of numbers in Finnish
one-of-the-second'.) Long ordinal numbers in Finnish are typed in almost the same way as the long cardinal numbers. 32534756 would be (in numbers over one million
Finnish_numerals
Approach to the foundations of mathematics
grounding the cardinal and ordinal numbers, Peano arithmetic and the other usual number systems, and the theory of relations. This section and the next follow
Scott–Potter_set_theory
Set theory concept
field of set theory, a large cardinal property is a certain kind of property of transfinite cardinal numbers. Cardinals with such properties are, as the
Large_cardinal
Names of numbers in the Romanian language
13th", and so on. Ordinal numbers in this range that have the unit digit 0 are formed by replacing the ending -zeci of the corresponding cardinal number
Romanian_numbers
Mathematical concept
"size". Cantor defined two kinds of infinite numbers: ordinal numbers and cardinal numbers. Ordinal numbers characterize well-ordered sets, or counting
Infinity
ultra reference for basic facts about cardinal and ordinal numbers. If you have a question about the cardinality of sets occurring in everyday mathematics
List of publications in mathematics
List_of_publications_in_mathematics
In mathematics, even and odd ordinals extend the concept of parity from the natural numbers to the ordinal numbers. They are useful in some transfinite
Even_and_odd_ordinals
Numeral system used by the Ilocano
the ordinal number (second, third, etc.), except for first, maika- is prefixed to the cardinal form. Note the exceptional forms for third, fourth and sixth
Ilocano_numbers
3-volume treatise on mathematics, 1910–1913
century. The Principia covered only set theory, cardinal numbers, ordinal numbers, and real numbers. Deeper theorems from real analysis were not included
Principia_Mathematica
Class of cardinal numbers
mathematics, limit cardinals are certain cardinal numbers. A cardinal number λ is a weak limit cardinal if λ is neither a successor cardinal nor zero. This
Limit_cardinal
Infinite set that is not countable
of an uncountable set is the set of all countable ordinal numbers, denoted by Ω or ω1. The cardinality of Ω is denoted ℵ 1 {\displaystyle \aleph _{1}} (aleph-one)
Uncountable_set
A cardinal tree (or trie) of degree k, by analogy with cardinal numbers and by opposition with ordinal trees, is a rooted tree in which each node has k
Cardinal_tree
ordinals were named the gamma numbers by Cantor,p.20 and are also called additive principal numbers. The class of additively indecomposable ordinals may
Additively indecomposable ordinal
Additively_indecomposable_ordinal
Word or phrase which describes a numerical quantity
express relationships like quantity (cardinal numbers), sequence (ordinal numbers), frequency (once, twice), and part (fraction). Numerals may be attributive
Numeral_(linguistics)
Native language of the Ibibio People
Eno I-PST.FOC I-rise-NEG I-stand-NEG Eno didn't arise Ibibio cardinal and ordinal numbers from zero to ten: Base System The Ibibio language uses a unique
Ibibio_language
Typographical symbol of a small circle
The number of the rank in question was indicated by ordinal numbers, in abbreviation with the ordinal indicator (a superscript letter ⟨o⟩). Use of "degree"
Degree_symbol
NFU" might be a better analogue to "ordinal of ZFC" than is the apparent analogue "ordinal of NFU". Cardinal numbers are defined in NFU in a way which generalizes
Implementation of mathematics in set theory
Implementation_of_mathematics_in_set_theory
Mathematical technique used in proof theory
In proof theory, ordinal analysis assigns ordinals (often large countable ordinals) to mathematical theories as a measure of their strength. If theories
Ordinal_analysis
Philosophy of mathematics that accepts the existence only of finite mathematical objects
the Cantorist actual infinity consisting of the transfinite cardinal and ordinal numbers, which have nothing to do with the things in nature): But on
Finitism
Branch of elementary mathematics
natural and whole numbers are used, they can be distinguished into cardinal and ordinal numbers. Cardinal numbers, like one, two, and three, are numbers that
Arithmetic
Ethnic group in the Amazon Rainforest
Curiously, although not unprecedentedly, the language has no cardinal or ordinal numbers. Some researchers, such as Peter Gordon of Columbia University
Pirahã_people
Infinite Cardinal number
cofinal (every cardinal number is less than a beth number) in plain Zermelo-Fraenkel set theory. Beth numbers are indexed by ordinal numbers and defined in
Beth_number
set of all countable ordinal numbers Beth-one: ℶ 1 {\displaystyle \beth _{1}} or c {\displaystyle {\mathfrak {c}}} , the cardinality of the continuum 2ℵ0
List_of_numbers
Semitic language spoken in the Horn of Africa
pejorative by the Tigre. The cardinal and ordinal numbers in Tigre are as follows: Ordinal numbers have both feminine and masculine form. To describe the
Tigre_language
encountered by Archimedes, and one can propose that he stopped at this number because he did not devise any new ordinal numbers (larger than 'myriad myriadth')
History_of_large_numbers
Polish mathematician (1882–1969)
and 15th anniversary of Poland joining NATO. Sierpiński authored 724 papers and 50 books, almost all in Polish. His book Cardinal and Ordinal Numbers
Wacław_Sierpiński
Eastern Sudanic language of Suda
(80) wang (and) mädäg (5). The following table shows how ordinal numbers are built. Numbers usually come after the noun with a modifier suffix, in this
Shatt_language
Operation on ordinal numbers
an ordinal number α is the smallest ordinal number greater than α. An ordinal number that is a successor is called a successor ordinal. The ordinals 1
Successor_ordinal
Branch of mathematics that studies sets
transfinite numbers, called cardinals and ordinals, which extended the arithmetic of the natural numbers. His notation for the cardinal numbers was the Hebrew
Set_theory
Particular class of sets which can be described entirely in terms of simpler sets
initial ordinals of cardinals remain initial in L {\displaystyle L} . Regular ordinals remain regular in L {\displaystyle L} . Weak limit cardinals become
Constructible_universe
Generalization of the real numbers
superreal numbers (including the hyperreal numbers) can be realized as subfields of the surreals. The surreals also contain all transfinite ordinal numbers; the
Surreal_number
Proof in set theory
sets are now called uncountable sets, and the size of infinite sets is treated by the theory of cardinal numbers, which Cantor began. Georg Cantor published
Cantor's_diagonal_argument
Number words used in the Japanese language
For ordinal numbers, see Japanese counter word#Ordinal numbers. Distributive numbers are formed regularly from a cardinal number, a counter word, and the
Japanese_numerals
But all these ordinals are still countable. Therefore, admissible ordinals seem to be the recursive analogue of regular cardinal numbers. Notice that α
Admissible_ordinal
Names of numbers in Latin
used in many instances where English would use 'second'. Ordinal numbers, not cardinal numbers, are commonly used to represent dates, because they are
Latin_numerals
System of suffixes of Classical Arabic
Objects of (kam, كَمْ) 'how much/how many'. Cardinal and ordinal numbers from 11, and 13-19 Counted nouns of numbers 11–99 Exclamation of astonishment. i.e
ʾIʿrab
Axiom(s) of Set Theory
construct the natural numbers. These include the representation via von Neumann ordinals, commonly employed in axiomatic set theory, and a system based on
Set-theoretic definition of natural numbers
Set-theoretic_definition_of_natural_numbers
Preference ranking
The functions u and v are ordinally equivalent – they represent George's preferences equally well. Ordinal utility contrasts with cardinal utility theory:
Ordinal_utility
Inflection in the Russian language
(числи́тельные): cardinal, ordinal, collective, and fractional constructions. It also has other types of words, relative to numbers: multiplicative adjectives and compound
Russian_declension
Loss of word-final sounds
(mainly) in the masculine singular form. In Spanish, some adverbs and cardinal and ordinal numbers have apocopations as well. Adjectives grande ("big, great")
Apocope
Natural number
items (most often ten years) is called a decade. The ordinal form is tenth. The adjectives decimal and denary refer to systems or quantities based on ten
10
Numeral system
word for each of them: The following table shows Odia ordinal numbers (Odia: କ୍ରମସୂଚକ ସଙ୍ଖ୍ୟା) and the Odia word for each of them: Fraction symbols are
Odia_numerals
Ethnic group in southern Nigeria
Ibibio or Enyong; Southern Ibibio or Eket and Riverine Ibibio or Uruan. Ibibio cardinal and ordinal numbers from zero to ten:[dead link] Base System The
Ibibio_people
Cebuano language feature
during Magellan's expedition. The native numbers are categorized into four types: cardinal, ordinal, distributive, and multiplicative (also referred to as
Cebuano_numerals
Set theory method
defining set representatives for ordinal numbers, Scott's trick can be used to obtain representatives for cardinal numbers and more generally for isomorphism
Scott's_trick
coefficients. Transfinite numbers: Numbers that are greater than any natural number. Ordinal numbers: Finite and infinite numbers used to describe the order
List_of_types_of_numbers
Proposition in mathematical logic
sets. It states: There is no set whose cardinality is strictly between that of the integers and the real numbers. The name of the hypothesis comes from
Continuum_hypothesis
Mathematical concept
induction to ordinal numbers. Its correctness is a theorem of ZF, and relies on the fact that the ordinal numbers are well-ordered, and thus a statement
Transfinite_induction
Cardinality of the set of real numbers
In set theory, the cardinality of the continuum is the cardinality or "size" of the set of real numbers R {\displaystyle \mathbb {R} } , sometimes called
Cardinality_of_the_continuum
feminine and neutral) and they can have articles. There are several types of numerals: cardinal numerals, ordinal numerals, collective numerals and multiplicative
Macedonian_numerals
Set-theoretic function
countable ordinals, whose principle is to give names to certain ordinals much larger than the one being defined, perhaps even large cardinals (though they
Ordinal_collapsing_function
Ordered listing of items in collection
be an initial segment of the Natural numbers where the domain of the enumerating function can assume any ordinal. Under this definition, an enumeration
Enumeration
Index of articles associated with the same name
and may refer to: Transfinite numbers, numbers that are larger than all the finite numbers. Cardinal numbers, representations of sizes (cardinalities)
Infinity_plus_one
Austronesian language spoken in the Philippines
Maabig a labi! List of numbers from one to ten in English, Tagalog and Pangasinan Cardinal numbers: Ordinal numbers: Ordinal numbers are formed with the
Pangasinan_language
Part of speech
modifiers include cardinal and ordinal numbers numerals (e.g., two, second), superlative adjectives (e.g., largest, youngest), and primacy adjectives
English_nouns
Function that returns cardinal numbers
A its cardinality, denoted by |A|. Aleph numbers and beth numbers can both be seen as cardinal functions defined on ordinal numbers. Cardinal arithmetic
Cardinal_function
Certain kind of cardinal number in set theory
cannot be true, and thus |α| is incomparable to |X|. Conversely, trichotomy for cardinal numbers (the statement that any two cardinal numbers are comparable)
Hartogs_number
Mathematical set containing no elements
empty set or void set is the unique set having no elements; its size or cardinality (count of elements in a set) is zero. Some axiomatic set theories ensure
Empty_set
Order type of the set of all recursive ordinals
non-recursive ordinals are large countable ordinals greater than all the recursive ordinals, and therefore can not be expressed using recursive ordinal notations
Nonrecursive_ordinal
Set theory concept
the class of ordinal numbers; in particular, Vα is the set of all sets having ranks less than α. Thus there is one set Vα for each ordinal number α. Vα
Von_Neumann_universe
Grammar of the Korean language
(particles or postpositions) Both cardinal and ordinal numbers are grouped into their own part of speech. Descriptive verbs and action verbs are classified
Korean_grammar
Type of large transfinite number
cardinal", though the cardinals originally considered by Mahlo were weakly Mahlo cardinals. If κ is a limit ordinal and the set of regular ordinals less
Mahlo_cardinal
Set theory concept
infinite ordinal, which has cardinality ℵ 0 {\displaystyle \aleph _{0}} ; it may be identified with the set of natural numbers. A number of cardinal characteristics
Cardinal characteristic of the continuum
Cardinal_characteristic_of_the_continuum
Word that answers "how many times each?"
rarely used and much less recognized than cardinal numbers and ordinal numbers, but it is clearly distinguished and commonly used in Latin and several Romance
Distributive_numeral
Axiom of set theory
{\displaystyle A} has a minimum element). Consequently, every cardinal has an initial ordinal. For every ordinal α {\displaystyle \alpha } , the powerset (i.e., the
Axiom_of_choice
cardinality ℵ 1 {\displaystyle \aleph _{1}} . Let μ be a large countable ordinal such that a fundamental sequence is assigned to every limit ordinal less
Hardy_hierarchy
Paradox in set theory
strictly less than the cardinality of 2T. Since the cardinal numbers are well-ordered by indexing with the ordinal numbers (see Cardinal number, formal definition)
Cantor's_paradox
Natural number
0. In the Von Neumann cardinal assignment of natural numbers, where each number is defined as a set that contains all numbers before it, 1 is represented
1
Names of numbers in the Proto-Indo-European language
Indo-European languages. The following article lists and discusses their hypothesized forms. The cardinal numbers are reconstructed as follows: Other reconstructions
Proto-Indo-European_numerals
Numbers in traditional Korean writing
consonants of measure words and numbers following the native cardinals 여덟 ('eight', only when the ㅂ is not pronounced) and 열 ('ten') become tensed consonants
Korean_numerals
number, an ordinal with ωε=ε η 1. The order type of the rational numbers 2. An eta set, a type of ordered set 3. ηα is an Erdős cardinal θ The order
Glossary_of_set_theory
Prefix derived from numerals or other numbers
ordinal category are based on ordinal numbers such as the English first, second, third, which specify position of items in a sequence. In Latin and Greek
Numeral_prefix
CARDINAL AND-ORDINAL-NUMBERS
CARDINAL AND-ORDINAL-NUMBERS
Girl/Female
Australian, Dutch
Loving and Musical
Girl/Female
Latin
Ardent. Eager. Industrious.
Boy/Male
Shakespearean
King John' Cardinal Pandulph, the Pope's legate.
Boy/Male
Tamil
Heartfelt, Affectionate, Cordial, Heart full
Surname or Lastname
English, French, Spanish, and Dutch
English, French, Spanish, and Dutch : from Middle English, Old French cardinal ‘cardinal’, the church dignitary (Latin cardinalis, originally an adjective meaning ‘crucial’). The surname may have denoted a servant who worked in a cardinal’s household, but was probably more often bestowed as a nickname on someone who habitually dressed in red or who had played the part of a cardinal in a pageant, or on one who acted in a lordly and patronizing manner, like a prince of the Church.A bearer of the name, of unknown origin, is documented in Montreal by 1666.
Surname or Lastname
English and German
English and German : topographic name from Old English land, Middle High German lant, ‘land’, ‘territory’. This had more specialized senses in the Middle Ages, being used to denote the countryside as opposed to a town or an estate.English : topographic name for someone who lived in a forest glade, Middle English, Old French la(u)nde, or a habitational name from Launde in Leicestershire or Laund in West Yorkshire, which are named with this word.Norwegian : habitational name from any of three farmsteads so named, from Old Norse land ‘land’, ‘territory’ (see 1 above).
Boy/Male
Hindu
Heartfelt, Affectionate, Cordial, Heart full
Boy/Male
Shakespearean
King Henry the Eighth' Cardinal Campeius.
Boy/Male
Shakespearean
King Richard III' Cardinal Bourchier, Archbishop of Canterbury.
Female
Norwegian
Danish and Norwegian form of Greek Hanna, ANE means "favor; grace."
Female
Serbian
(Bulgarian and Serbian Ðна): Bulgarian and Serbian form of Greek Hanna, ANA means "favor; grace."
Female
Scottish
Scottish feminine form of English Rodney, RODINA means "Hroda's fen/island."
Surname or Lastname
English and German
English and German : nickname for someone with a deformed hand or who had lost one hand, from Middle English hand, Middle High German hant, found in such appellations as Liebhard mit der Hand (Augsburg 1383).Jewish (Ashkenazic) : nickname from German Hand ‘hand’ (see 1).Irish : Anglicized form of Gaelic Ó Flaithimh (see Guthrie), resulting from an erroneous association of the Gaelic name with the Gaelic word lámh ‘hand’. It is used as an English equivalent for several other names of Gaelic origin too, e.g. Claffey, Glavin, and McClave.Dutch : from a variant of hont ‘dog’, ‘hound’, either a derogatory nickname, or a habitational name for someone living at a house distinguished by the sign of a dog.
Boy/Male
Tamil
Hardik | ஹாரà¯à®¤à®¿à®•Â
Heartfelt, Affectionate, Cordial, Heart full
Hardik | ஹாரà¯à®¤à®¿à®•Â
Boy/Male
Hindu
Heartfelt, Affectionate, Cordial, Heart full
Female
Italian
Feminine form of Italian Orsino, ORSINA means "bear-like."
Surname or Lastname
English, Scottish, Danish, Norwegian, Swedish, German, and Jewish (Ashkenazic)
English, Scottish, Danish, Norwegian, Swedish, German, and Jewish (Ashkenazic) : topographic name for someone who lived on patch of sandy soil, from the vocabulary word sand. As a Swedish or Jewish name it was often purely ornamental.Dutch and Belgian : reduced form of Van den Sand(e), Van den Zande, a habitational name from places such as Zande in West Flanders or various minor places named with zand ‘sand’.English and Scottish : from a short form of Alexander.French : from a Germanic personal name, Sando.
Surname or Lastname
English
English : variant of Cordell.
Surname or Lastname
English, German, and Jewish (Ashkenazic)
English, German, and Jewish (Ashkenazic) : metonymic occupational name for a maker of hoops and bands, etc., from Middle English band, bond, Middle High German, Middle Low German bant, German Band denoting something used for tying or binding: ‘hoop’, ‘metal band’, ‘fetter’, ‘shackle’.Old spelling of the Dutch cognates Bant, Bande, from Middle Dutch bant ‘band’.
Female
English
 19th-century English elaborated form of Latin cara, CARINA means "beloved." From the constellation Carina, from Latin carina, which originally meant "shell of a nut," later "keel of a ship."
CARDINAL AND-ORDINAL-NUMBERS
CARDINAL AND-ORDINAL-NUMBERS
Girl/Female
Bengali, Gujarati, Hindu, Indian, Kannada, Marathi, Rajasthani, Sanskrit, Telugu
Sacred River of India
Girl/Female
Arabic, Muslim, Sindhi
Narrator of Hadith; Daughter of Anas Bin Malik
Girl/Female
Muslim
Soft to the touch, Pure silk, Tender woman
Boy/Male
Tamil
Very different
Boy/Male
English
From the farm by the sea.
Boy/Male
Hindu, Indian, Sanskrit
Bee
Boy/Male
English
Made of Oak
Girl/Female
Assamese, Gujarati, Hindu, Indian, Kannada, Malayalam, Marathi, Sanskrit, Telugu
Goddess of Spring
Surname or Lastname
German
German : variant spelling of Wert.English : variant spelling of Worth.
Boy/Male
Hindu
Lord Krishna, The first Lord
CARDINAL AND-ORDINAL-NUMBERS
CARDINAL AND-ORDINAL-NUMBERS
CARDINAL AND-ORDINAL-NUMBERS
CARDINAL AND-ORDINAL-NUMBERS
CARDINAL AND-ORDINAL-NUMBERS
a.
One of the ecclesiastical princes who constitute the pope's council, or the sacred college.
v. t.
To render cordial; to reconcile.
n.
A word or number denoting order or succession.
a.
Cardiac.
n.
Aromatized and sweetened spirit, used as a beverage; a liqueur.
n.
Any cordial or substance which invigorates.
n.
Anything that comforts, gladdens, and exhilarates.
n.
A book containing the rubrics of the Mass.
adv.
In a cordial manner.
n.
Any invigorating and stimulating preparation; as, a peppermint cordial.
n.
The book of forms for making, ordaining, and consecrating bishops, priests, and deacons.
n.
The cardinal bird.
a.
Indicating order or succession; as, the ordinal numbers, first, second, third, etc.
n.
An aromatic alcoholic cordial.
a.
Exciting action in the heart, through the medium of the stomach; cordial; stimulant.
a.
Of fundamental importance; preeminent; superior; chief; principal.
a.
Mulled red wine.
a.
Of or pertaining to an order.
a.
A woman's short cloak with a hood.
a.
Helping the stomach; stomachic; cordial.