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Nominal number
Nominal number
Nominal number
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Nominal numbers are numerals used as labels to identify items uniquely. Importantly, the actual values of the numbers which these numerals represent are less relevant, as they do not indicate quantity, rank, or any other measurement.

Labelling a pair of referees as referees "1" and "2" is a use of nominal numbers. Any set of numbers (a subset of the natural numbers) will be consistent labels as long as a distinct number is uniquely used for each distinct term which needs to be labelled. Nonetheless, sequences of integers may naturally be used as the simplest way to begin labelling; for example, 1, 2, 3, and so on.

Definition

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The term "nominal number" may be quite recent and of limited use. It appears[citation needed] to have originated in school textbooks derived from the statistical term "nominal data", defined as data indicating "merely statements of qualitative category of membership". This usage comes from the sense of nominal as "name".

Mathematically, nominal numbering is a one-to-one and onto function from a set of objects being named to a set of numerals, which may change (typically growing) over time: it is a function because each object is assigned a single numeral, it is one-to-one because different objects are assigned different numerals, and it is onto because every numeral in the set at a given time has associated with it a single named object.

"Nominal number" can be broadly defined as "any numeral used for identification, however it was assigned", or narrowly as "a numeral with no information other than identification".

For the purposes of naming, the term "number" is often used loosely to refer to any string (sequence of symbols), which may not consist entirely of digits—it is often alphanumeric. For instance, UK National Insurance numbers, some driver's licence numbers, and some serial numbers contain letters.

Use of nominal numbers

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"Nominal" refers to the use of numbers: any nominal number can be used by its numerical value as an integer—added to another, multiplied, compared in magnitude, and so forth—but for nominal numbers these operations are not, in general, meaningful. For example, the ZIP code 11111 is less than the ZIP code 12345, but that does not necessarily mean that 11111 was issued before 12345 or that the region denoted by 11111 is further south than 12345, though it might be. Similarly, one can add or subtract ZIP codes, but this is meaningless: 12345 − 11111 does not have any meaning as a ZIP code.

In general, the only meaningful operation with nominal numbers is to compare two nominal numbers to see whether they are identical or not (whether they refer to the same object).

Examples

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Numbers 102 and 400: bus route 102 in London, run by an Alexander Dennis Enviro400 double-decker bus
Number 107: the car Peugeot 107

A great variety of numbers meet the broad definition, including:

These are usually assigned either in some hierarchical way, such as how telephone numbers are assigned (in NANPA) as Country Code + Area Code + Prefix + Suffix, where the first three are geographically based, or sequentially, as in serial numbers; these latter are thus properly ordinal numbers.

Narrowly defined

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Numerical identifiers that are nominal numbers narrowly defined, viz, convey no information other than identity, are quite rare. These must be defined either arbitrarily or randomly, and most commonly arise in computer applications, such as dynamic IP addresses assigned by Dynamic Host Configuration Protocol. A more everyday example are sports squad numbers, which do not in general have any public meaning beyond identity, though they may be allocated based on some internal club or organization policy. In some settings, these are based on position, but in others they are associated with an individual, being a proper nominal number. The naming function is demonstrated by "retired numbers", where a club no longer issues a number that has become associated with a particularly famous player, but reallocate others to new players when they become available.

See also

[edit]
[edit]
Revisions and contributorsEdit on WikipediaRead on Wikipedia

Nominal number

View on Grokipedia
from Grokipedia
A nominal number, also known as a categorical number, is a numeral employed solely for the purpose of labeling, identifying, or naming entities without conveying any inherent quantitative value, order, or mathematical significance. In statistical contexts, nominal numbers form the basis of the nominal scale of , the most basic level where categories are distinguished but not ranked or arithmetically manipulated. Unlike cardinal numbers, which denote exact quantities (e.g., "five apples"), or ordinal numbers, which indicate sequence or rank (e.g., "second place"), nominal numbers serve purely identificatory functions and do not support operations like addition or comparison of magnitude. Common examples of nominal numbers include telephone area codes, postal ZIP codes, social security numbers, and sports jersey numbers, where the numerals act as unique identifiers rather than measures of amount or position. In everyday applications, such numbers appear in contexts like product serial numbers and license plates, emphasizing categorization over numerical properties. This usage underscores their role in organizing information efficiently without implying relational values between the labels. The concept of nominal numbers is fundamental in fields such as , , and , where distinguishing measurement scales helps determine appropriate analytical methods—nominal data, for instance, is typically analyzed using frequency counts or chi-square tests rather than means or correlations.

Fundamentals

Definition

A nominal number is a numeral or sequence used solely for naming, labeling, or identifying entities without implying any quantity, order, or magnitude. In this context, the numbers function as arbitrary symbols or codes, devoid of mathematical operations such as addition, subtraction, multiplication, or comparison for greater/lesser value. This concept aligns with the nominal scale in measurement theory, where numerals serve only as labels or type numbers with no quantitative significance, permitting only determinations of equality or difference. Key characteristics of nominal numbers include their lack of arithmetic meaning and their role as arbitrary assignments, such as tags or identifiers, that do not represent inherent values or hierarchies. Unlike quantitative numbers, they cannot be meaningfully manipulated through standard numerical processes, emphasizing their purpose as non-measurable descriptors. These properties ensure that nominal numbers prioritize identification over any evaluative or calculative function. The term "nominal" derives from the Latin nominalis, meaning "pertaining to a name," from nomen ("name"), underscoring its function as something existing rather than possessing substantive numerical value. Nominal numbers can consist of purely numeric digits or alphanumeric combinations, with no intrinsic worth beyond their identificatory role. This etymological root highlights the symbolic nature of such numbers across linguistic and statistical applications.

Historical context

The practice of using numbers as labels for identification, rather than for counting quantities or establishing order, predates the and appears informally in historical records, though without a theoretical framework distinguishing it from quantitative or ordinal roles. A more systematic conceptualization emerged in statistics during the early , with Stanley Smith Stevens providing the foundational formalization. In his seminal 1946 paper, Stevens outlined four scales of measurement—nominal, ordinal, interval, and —positioning the nominal scale as the most basic, where observations are assigned to categories based solely on equality or difference, without implications of order or magnitude. This addressed the need to analyze qualitative in psychological and scientific , marking nominal numbers as tools for grouping rather than measuring. Key milestones include Stevens' 1946 framework, which influenced interdisciplinary adoption in statistics and related fields.

Classifications and Distinctions

Relation to cardinal and ordinal numbers

Cardinal numbers represent quantities and are used for counting discrete objects, such as "three apples," where arithmetic operations like and can be meaningfully applied to determine totals or differences. In contrast, nominal numbers function solely as labels or identifiers, such as a jersey number "99," and do not convey any sense of quantity, precluding the application of arithmetic operations. Ordinal numbers denote position or rank within a , for example, "first place" in a race, establishing an order among elements but without assuming equal intervals between positions. Unlike ordinal numbers, nominal numbers impose no such ordering, treating each label as discrete and incomparable in terms of or . The distinctions among these number types can be summarized as follows:
AspectNominal NumbersCardinal NumbersOrdinal Numbers
Primary PurposeIdentification and labelingCounting and quantifying amounts and indicating position
Mathematical OperationsNone (only set-theoretic mappings)Full arithmetic (addition, , etc.)Ordering and comparisons (e.g., greater than)
Example 90210Five booksThird in line
Potential overlaps arise when nominal numbers are assigned sequentially, mimicking the appearance of ordinal numbers, such as in building labels numbered 1 through 10, which may suggest position but are treated as identifiers without implying arithmetic order or equal spacing. Philosophically, nominal numbers are grounded in as symbolic labels assigned via bijective functions to elements of a set, without reference to the set's or internal ordering, distinguishing them fundamentally from the quantitative focus of cardinals and the sequential structure of ordinals.

Role in data measurement scales

In measurement theory, nominal numbers form the foundational level of S. S. Stevens' typology of scales, representing the simplest form of where entities are assigned labels or categories without implying any inherent order, magnitude, or quantitative value. This scale is followed by ordinal (which introduces ranking), interval (equal intervals but no true zero), and (equal intervals with an absolute zero) scales, each building on the previous by permitting more advanced empirical operations and statistical transformations. Nominal measurement is invariant under transformations, meaning the specific numerals used as labels can be freely substituted without altering the underlying . Key properties of nominal scales include the assignment of observations to mutually exclusive and exhaustive categories, allowing only tests of equality or inequality between classes, such as whether two items belong to the same category. This structure supports statistical procedures like chi-square tests for assessing associations in contingency tables, as the categories enable frequency-based hypotheses without assuming order or distance. For , nominal preclude meaningful computations of averages, medians, or differences, as such operations would impose artificial structure; instead, they are suited to descriptive measures like frequency counts and the mode, which capture the of categories. In modern , nominal scales encompass extensions such as binary variables, which involve only two mutually exclusive categories (e.g., yes/no outcomes), facilitating simplified analyses like proportions while remaining within the nominal framework. Nominal numbers are closely aligned with qualitative , serving as a primary means to represent non-numeric attributes through categorization, distinct from quantitative scales that imply measurable magnitudes. Despite its influence, Stevens' hierarchy has faced post-1970s criticisms from measurement theorists, notably Joel Michell, who argues that it conflates operational rules for numeral assignment with the scientific requirement to empirically verify quantitative structure in attributes, potentially justifying untested assumptions of higher-scale applicability in fields like . Michell contends that this approach fosters a where is equated with , undermining rigorous tests for additivity and interval properties essential to true quantitative science. The debate over Stevens' scales continues into the , with recent analyses highlighting ongoing misconceptions and providing recommendations for their application in statistical analysis.

Applications

Identification and labeling

Nominal numbers function primarily as labels in identification systems, where they are assigned to ensure uniqueness for individual entities, such as through serial numbers on manufactured goods, or to enable grouping for categorization, as seen in product codes that distinguish types without implying quantitative differences. This mechanism relies on the nominal scale's core property of using numerals or symbols solely as tags, devoid of inherent order or magnitude, to facilitate recognition and differentiation in non-computational contexts. Key systems employing nominal numbers emphasize non-hierarchical coding to maintain simplicity and universality. Barcodes represent encoded nominal identifiers for products, allowing rapid scanning for inventory and without reference to numerical value. Similarly, International Standard Book Numbers (ISBNs) serve as unique nominal tags for publications, streamlining global distribution and sales by providing a standardized, non-sequential label. Vehicle registration plates utilize alphanumeric nominal codes to uniquely identify automobiles, supporting regulatory enforcement and ownership verification through arbitrary assignments that avoid ranking. These systems offer significant advantages, including simplified tracking of assets or items since nominal labels eliminate the need for value-based comparisons, thereby reducing errors in routine identification processes. Moreover, their scalability supports expansive datasets, as alphanumeric extensions vastly increase the number of possible unique codes, enabling of millions of entities without structural reconfiguration. Despite these benefits, nominal identification systems face challenges related to assignment accuracy, such as the inadvertent creation of duplicate codes that undermine and lead to tracking failures. Privacy issues also emerge, particularly with personal , where nominal codes can inadvertently link to sensitive information, raising risks of unauthorized access or . Non-numeric variants of nominal numbers, such as alphanumeric combinations, further broaden their applicability by incorporating letters to convey additional categorical distinctions without numerical interpretation; license plates exemplify this by blending digits and letters for regional or typological encoding.

Statistical and analytical uses

In statistical , nominal numbers serve as categorical variables that represent qualitative distinctions without inherent order or magnitude, such as , , or geographic regions, forming essential inputs in for exploratory and inferential purposes. These variables are typically encoded as strings or integers in data structures, allowing analysts to group observations into mutually exclusive categories for subsequent processing. For instance, in a on , nominal variables like preferences enable the identification of patterns across non-numeric attributes. Key analytical techniques for nominal data focus on associations and groupings rather than means or variances. The chi-square of assesses whether two nominal variables are related by comparing observed frequencies in a against expected values under the of , providing a to evaluate significance. Contingency tables, which tabulate joint frequencies of nominal categories, form the basis for this test and facilitate cross-tabulation to reveal dependencies, such as between demographics and purchase types. In clustering, algorithms like k-modes extend k-means for nominal features by using frequency-based modes as cluster centers and simple matching dissimilarity to group similar objects, as introduced by Huang for handling categorical datasets without assuming numerical distances. These methods treat nominal variables as primary features, enabling unsupervised partitioning in applications like . Software tools commonly preprocess nominal variables through encoding to integrate them into computational pipelines. In Python, libraries like 's OneHotEncoder transform nominal categories into binary vectors, creating one column per unique value with 1 indicating presence and 0 absence, which is crucial for models that require numerical inputs. ' get_dummies function offers a similar one-hot approach for dataframes, simplifying integration in exploratory analysis. In , the package's dummyVars or model.matrix functions perform analogous one-hot encoding, converting factors into model-compatible matrices for regression or classification tasks. A primary limitation of nominal data is its incompatibility with parametric statistical tests, which assume interval or ratio scales and normality, such as t-tests or ANOVA; instead, non-parametric methods like chi-square or are required to avoid invalid assumptions and biased results. These non-parametric alternatives, while robust to distributional violations, often have lower statistical power compared to parametric counterparts when data meet stricter criteria, necessitating larger sample sizes for equivalent detection rates. In advanced applications, nominal variables play a pivotal in analytics for customer segmentation, where categorical attributes like purchase history categories or tiers are clustered to identify target groups, enhancing strategies in large-scale datasets. Techniques such as k-modes or density-based clustering on encoded nominal features enable scalable partitioning in high-volume environments, as seen in retail analytics for behavioral profiling. This approach supports real-time by leveraging nominal data's discrete nature for efficient, interpretable segments without imposing artificial ordering.

Examples

Common everyday instances

Nominal numbers permeate daily life as labels for identification and categorization, rather than as values subject to mathematical operations like or averaging. These numeric sequences or codes distinguish entities without implying order, magnitude, or , allowing for efficient in routine activities. In personal identification, nominal numbers uniquely tag individuals for administrative purposes. Social security numbers, consisting of nine digits, serve exclusively as identifiers in governmental and financial systems, with no arithmetic meaning attached to their values. Phone numbers, such as a 10-digit U.S. sequence, function similarly to label communication endpoints, enabling connections without quantifying distance or duration. Numeric components in email addresses, like the "123" in "[email protected]," act as part of categorical labels for user accounts, distinct from any ordinal or cardinal interpretation. Consumer goods rely on nominal numbers for and selection. ZIP codes, five-digit codes in the U.S. postal system, categorize geographic zones for mail routing, where operations like averaging codes across a neighborhood yield no meaningful result. Product stock keeping units (SKUs), alphanumeric identifiers like "ABC-123," uniquely label items in retail, facilitating tracking without implying product or volume. denoted as S, M, or L represent nominal categories when used to denote distinct fit types, absent any strict implication of increasing measurement, though context may introduce ordinal elements. Sports and entertainment contexts employ nominal numbers for quick recognition. Jersey numbers, such as 42 on a baseball uniform, identify players on the field without reflecting skill levels or team rankings, as summing them across a roster holds no statistical value. Seat numbers in venues like concert halls or stadiums label specific positions for ticketing and seating, treating each as a unique category rather than a quantifiable attribute. Television channel numbers, such as 5 for a local news station, nominally distinguish broadcast sources, with no inherent order beyond arbitrary assignment. Within households, nominal numbers support addressing and connectivity. House numbers, like 456 on a street address, serve as identifiers for properties in postal and navigation systems, where their numeric form misleads one into thinking they represent countable quantities, but they cannot be meaningfully added to determine neighborhood size. Wi-Fi network IDs, often incorporating digits in names like "HomeNet_202," function as categorical labels to differentiate access points, enabling device connections without numerical computation. These instances underscore a cultural perception where digit-based labels are intuitively viewed as "numbers," yet their nominal nature prohibits quantitative analysis; for example, aggregating house numbers does not quantify homes on a block, just as jersey numbers do not measure athletic prowess, emphasizing their role in labeling over measurement.

Technical and specialized cases

In computing and technology, nominal numbers serve as unique identifiers rather than quantitative measures. For instance, IPv4 addresses, such as 192.168.0.1, function as labels to route data packets across networks without implying any order or magnitude. Similarly, MAC addresses, like 00:1A:2B:3C:4D:5E, are hardcoded hardware identifiers assigned to network interfaces for local communication within a . Database primary keys, often auto-incrementing integers like or UUIDs, ensure record uniqueness in relational databases without representing countable quantities. In science and , nominal numbers categorize biological and chemical entities for identification purposes. Blood types, denoted as A, B, AB, or O (with Rh factors + or -), classify individuals based on presence on red cells, enabling compatibility matching in transfusions without hierarchical ranking. Patient IDs, such as sequential codes like 123456, provide confidential identifiers for medical records, facilitating tracking across healthcare systems without numerical significance. Transportation systems rely on nominal numbers for operational labeling. Flight numbers, for example, AA123 or UA456, designate specific routes and schedules by airlines, serving as categorical tags rather than indicators of sequence or duration. car labels, like CAR-7A, and codes incorporating numerics, such as LAX01 for a terminal gate, function similarly to identify assets and locations without implying measurement. In and , nominal numbers streamline identification in regulated domains. Stock ticker symbols with numbers, such as BRK.A or F45, uniquely reference securities on exchanges for trading and reporting purposes. Patent numbers, like US 10,123,456, assign official identifiers to inventions, enabling legal protection and citation without quantitative value. Case file identifiers, such as 2025-CV-789, catalog legal proceedings in courts, categorizing documents for retrieval. Unique applications appear in specialized fields like and . In , nominal sequences, such as key identifiers or nonces like KID-001, label encryption keys or initialization vectors to prevent reuse without denoting size or order. In and , part numbers, exemplified by PN-AB1234, catalog components in bills of materials, ensuring in assembly processes through non-hierarchical coding.

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