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2013 American film
Inequality for All is a 2013 documentary film directed by Jacob Kornbluth and narrated by American economist, author and professor Robert Reich. Based
Inequality_for_All
Distribution of income or wealth between different groups
Economic inequality is an umbrella term for three concepts: income inequality, how the total sum of money paid to people is distributed among them; wealth
Economic_inequality
Topics referred to by the same term
Look up inequality or ≠ in Wiktionary, the free dictionary. Inequality may refer to: Inequality (mathematics), a relation between two quantities when
Inequality
The inequality of wealth (i.e., inequality in the distribution of assets) has substantially increased in the United States since the late 1980s. Wealth
Wealth inequality in the United States
Wealth_inequality_in_the_United_States
Mathematical inequality relating inner products and norms
the modern proof of the integral version. The Cauchy–Schwarz inequality states that for all vectors u {\displaystyle \mathbf {u} } and v {\displaystyle
Cauchy–Schwarz_inequality
Theorem in analysis
For other inequalities named after Wirtinger, see Wirtinger's inequality. In the mathematical field of analysis, the Wirtinger inequality is an important
Wirtinger's inequality for functions
Wirtinger's_inequality_for_functions
Inequality between integrals in Lp spaces
analysis, Hölder's inequality, named after Otto Hölder, is a fundamental inequality between integrals and an indispensable tool for the study of Lp spaces
Hölder's_inequality
IHDI can be interpreted as the level of human development when inequality is accounted for", whereas the Human Development Index itself, from which the
List of countries by inequality-adjusted Human Development Index
List_of_countries_by_inequality-adjusted_Human_Development_Index
American former labor secretary and political commentator (born 1946)
on Netflix in November 2017, and their film Inequality for All won a U.S. Documentary Special Jury Award for Achievement in Filmmaking at the 2013 Sundance
Robert_Reich
Mathematical relation making a non-equal comparison
In mathematics, an inequality is a relation which makes a non-equal comparison between two numbers or other mathematical expressions. It is used most often
Inequality_(mathematics)
Concept in probability theory
Markov's inequality is tight in the sense that for each chosen positive constant, there exists a random variable such that the inequality is in fact
Markov's_inequality
Mathematical concept
In mathematics, Young's inequality for products is a mathematical inequality about the product of two numbers. The inequality is named after William Henry
Young's inequality for products
Young's_inequality_for_products
Bound on probability of a random variable being far from its mean
In probability theory, Chebyshev's inequality (also called the Bienaymé–Chebyshev inequality) provides an upper bound on the probability of deviation
Chebyshev's_inequality
This is a list of sovereign states by wealth inequality, including Gini coefficients. Wealth distribution can vary greatly from income distribution in
List of sovereign states by wealth inequality
List_of_sovereign_states_by_wealth_inequality
Probabilistic inequality applying on sum of bounded random variables
Hoeffding's inequality was proven by Wassily Hoeffding in 1963. Hoeffding's inequality is a special case of the Azuma–Hoeffding inequality and McDiarmid's
Hoeffding's_inequality
countries and territories by income inequality metrics, as calculated by the World Bank, UNU-WIDER, OCDE, and World Inequality Database, based on different indicators
List of countries by income inequality
List_of_countries_by_income_inequality
Property of geometry, also used to generalize the notion of "distance" in metric spaces
In mathematics, the triangle inequality states that for any triangle, the sum of the lengths of any two sides must be greater than or equal to the length
Triangle_inequality
Inequality in information theory
In information theory, Pinsker's inequality, named after its inventor Mark Semenovich Pinsker, is an inequality that bounds the total variation distance
Pinsker's_inequality
United Nations index for gender inequality
The Gender Inequality Index (GII) is an index for the measurement of gender disparity that was introduced in the 2010 Human Development Report 20th anniversary
Gender_Inequality_Index
Mathematical theorem
In mathematics, Grönwall's inequality (also called Grönwall's lemma or the Grönwall–Bellman inequality) allows one to bound a function that is known to
Grönwall's_inequality
highest level of income inequality among its (post-industrialized) peers. When measured for all households, U.S. income inequality is comparable to other
Income inequality in the United States
Income_inequality_in_the_United_States
Mathematical theorem
Kantorovich inequality is a particular case of the Cauchy–Schwarz inequality, which is itself a generalization of the triangle inequality. The triangle
Kantorovich_inequality
Theorem of convex functions
earlier proof of the same inequality for doubly-differentiable functions by Otto Hölder in 1889. Given its generality, the inequality appears in many forms
Jensen's_inequality
Type of mathematical inequality
In mathematics, a variational inequality is an inequality involving a functional, which has to be solved for all possible values of a given variable, belonging
Variational_inequality
Arithmetic mean is greater than or equal to geometric mean
In mathematics, the inequality of arithmetic and geometric means, or more briefly the AM–GM inequality, states that the arithmetic mean of a list of non-negative
AM–GM_inequality
Probability and computer science concept
theoretical computer science, McDiarmid's inequality (named after Colin McDiarmid ) is a concentration inequality which bounds the deviation between the
McDiarmid's_inequality
Inequality between nations' wealth
International inequality refers to inequality between countries, as compared to global inequality, which is inequality between people across countries
International_inequality
Inequality applying to probability spaces
In probability theory, Boole's inequality, also known as the union bound, says that for any finite or countable set of events, the probability that at
Boole's_inequality
Exponentially decreasing bounds on tail distributions of random variables
Markov's inequality or Chebyshev's inequality. The Chernoff bound is related to the Bernstein inequalities. It is also used to prove Hoeffding's inequality, Bennett's
Chernoff_bound
Statement in information theory
In information theory, Gibbs' inequality is a statement about the information entropy of a discrete probability distribution. Several other bounds on the
Gibbs'_inequality
Mathematical relationships
In mathematics, the QM–AM–GM–HM inequalities, also known as the mean inequality chain, state the relationship between the harmonic mean (HM), geometric
QM–AM–GM–HM_inequalities
Concept in Hlibert spaces mathematics
many kinds of inequalities involving matrices and linear operators on Hilbert spaces. This article covers some important operator inequalities connected with
Trace_inequality
Concept in statistics
statistics, Samuelson's inequality, named after the economist Paul Samuelson, also called the Laguerre–Samuelson inequality, after the mathematician
Samuelson's_inequality
Uneven distribution of resources in a society
Social inequality occurs when resources within a society are distributed unevenly, often as a result of inequitable allocation practices that create distinct
Social_inequality
Testable implication of local hidden-variable theories
verification of the inequality being violated is seen as confirmation that nature cannot be described by such theories. CHSH stands for John Clauser, Michael
CHSH_inequality
Algebra theorem about convex functions
mathematics, Karamata's inequality, named after Jovan Karamata, also known as the majorization inequality, is a theorem in elementary algebra for convex and concave
Karamata's_inequality
Inequality in mathematics
In mathematics, Maclaurin's inequality, named after Colin Maclaurin, is a refinement of the inequality of arithmetic and geometric means. Let a 1 , a 2
Maclaurin's_inequality
1755 treatise by Jean-Jacques Rousseau
Discourse on the Origin and Basis of Inequality Among Men (French: Discours sur l'origine et les fondements de l'inégalité parmi les hommes), also commonly
Discourse_on_Inequality
economy of the People's Republic of China has a high degree of income inequality. According to the Asian Development Bank Institute, "before China implemented
Income_inequality_in_China
Horizontal inequality is the inequality—economical, social or other—that does not follow from a difference in an inherent quality such as intelligence
Horizontal_inequality
Correlation inequality
In mathematics, the Fortuin–Kasteleyn–Ginibre (FKG) inequality is a correlation inequality, a fundamental tool in statistical mechanics and probabilistic
FKG_inequality
Measure of inequality of a statistical distribution
dispersion intended to represent the income inequality, the wealth inequality, or the consumption inequality within a nation or a social group. It was developed
Gini_coefficient
Term used to explain attention distribution across social media
Attention inequality is the inequality of distribution of attention across users on social networks, people in general, and for scientific papers. Yun
Attention_inequality
Topics referred to by the same term
Young's inequality may refer to: Young's inequality for products, bounding the product of two quantities Young's convolution inequality, bounding the
Young's_inequality
Inequality applying to triangles
In mathematics, Weitzenböck's inequality, named after Roland Weitzenböck, states that for a triangle of side lengths a {\displaystyle a} , b {\displaystyle
Weitzenböck's_inequality
Triangle inequality in Lp spaces
mathematical analysis, the Minkowski inequality establishes that the L p {\displaystyle L^{p}} spaces satisfy the triangle inequality in the definition of normed
Minkowski_inequality
Inequality about exponentiations of ''1+x''
In mathematics, Bernoulli's inequality (named after Jacob Bernoulli) is an inequality that approximates exponentiations of 1 + x {\displaystyle 1+x}
Bernoulli's_inequality
Mathematical inequality explaining concentration of random variables
In probability theory, concentration inequalities provide mathematical bounds on the probability of a random variable deviating from some value (typically
Concentration_inequality
Mathematics theorem
mathematics, the Lubell–Yamamoto–Meshalkin inequality, more commonly known as the LYM inequality, is an inequality on the sizes of sets in a Sperner family
Lubell–Yamamoto–Meshalkin inequality
Lubell–Yamamoto–Meshalkin_inequality
Form of social inequality
Structural inequality occurs when the fabric of organizations, institutions, governments or social networks contains an embedded cultural, linguistic,
Structural_inequality
Ways inequality is measured
income inequality and economic growth. The article economic inequality discusses the social and policy aspects of income distribution questions. All of the
Income_inequality_metrics
Inequalities in probability theory
Bernstein inequalities are also known as the Chernoff bound, Hoeffding's inequality and Azuma's inequality. The martingale case of the Bernstein inequality is
Bernstein inequalities (probability theory)
Bernstein_inequalities_(probability_theory)
Arithmetic function related to the divisors of an integer
that the inequality is true for all n > 5040 if and only if the Riemann hypothesis is true (Robin 1984). This is Robin's theorem and the inequality became
Divisor_function
Relation between distances of four points
Ptolemy's inequality relates the six distances determined by four points in the plane or in a higher-dimensional space. It states that, for any four points
Ptolemy's_inequality
pay higher wages to for one group as opposed to another, many acts of discrimination that lead to inequality occur frequently. For example, until the 1980s
Ascriptive_inequality
2024 book by David Lay Williams
The Greatest of All Plagues is a 2024 book by David Lay Williams, tracking how economic inequality has been treated by great thinkers of the Western canon
The_Greatest_of_All_Plagues
Mathematical inequality in Sobolev space theory
the Poincaré inequality is a result in the theory of Sobolev spaces, named after the French mathematician Henri Poincaré. The inequality allows one to
Poincaré_inequality
Stochastic processes in mathematics
In mathematics, Doob's martingale inequality, also known as Kolmogorov's submartingale inequality, is a fundamental result in the study of stochastic
Doob's_martingale_inequality
Integral inequality
Prékopa–Leindler inequality is an integral inequality closely related to the reverse Young's inequality, the Brunn–Minkowski inequality and a number of
Prékopa–Leindler_inequality
Sweden has moderate income inequality and a generally high standard of living. Unemployment was 9% as of 2026, one of the highest unemployment rates in
Income_inequality_in_Sweden
Idea and situation that women and men are not treated as equal
Gender inequality is the social phenomenon in which people are not treated equally on the basis of gender. This inequality can be caused by gender discrimination
Gender_inequality
Theorem in physics
OCLC 1180958776. Hardy, L. (1993). "Nonlocality for 2 particles without inequalities for almost all entangled states". Physical Review Letters. 71 (11):
Bell's_theorem
Database of wealth and income distribution
World Inequality Database (WID), previously The World Wealth and Income Database, also known as WID.world, is an extensive, open and accessible database
World_Inequality_Database
Norm on a vector space of matrices
satisfies the inequality for all positive integers r, where ρ(A) is the spectral radius of A. For symmetric or hermitian A, we have equality in (1) for the 2-norm
Matrix_norm
Theorem in probability theory
theory, Azuma's inequality or the Azuma–Hoeffding inequality (named after Kazuoki Azuma and Wassily Hoeffding) gives a concentration result for the values
Azuma's_inequality
The history of economic inequality is the study of the evolution of the uneven distribution of wealth or income throughout history between groups in a
History of economic inequality
History_of_economic_inequality
2009 book by Richard G. Wilkinson and Kate Pickett
the subtitle, Why Equality is Better for Everyone. The book argues that there are "pernicious effects that inequality has on societies: eroding trust, increasing
The Spirit Level (Wilkinson and Pickett book)
The_Spirit_Level_(Wilkinson_and_Pickett_book)
Inequality which involves a linear function
mathematics a linear inequality is an inequality which involves a linear function. A linear inequality contains one of the symbols of inequality: < less than
Linear_inequality
Inequality of sum of product of number and logarithm of ratios
The log sum inequality is used for proving theorems in information theory. Let a 1 , … , a n {\displaystyle a_{1},\ldots ,a_{n}} and b 1 , … , b n {\displaystyle
Log_sum_inequality
inequality is a result that gives a lower bound for the bilinear form induced by a real linear elliptic partial differential operator. The inequality
Gårding's_inequality
Mathematical inequality about convex functions
if the above inequality holds for all x, y, z from I {\displaystyle I} . When f is strictly convex, the inequality is strict except for x = y = z. It
Popoviciu's_inequality
Topics referred to by the same term
Bernstein inequality, named after Sergei Natanovich Bernstein, may refer to: Bernstein's inequality (mathematical analysis) Bernstein inequalities (probability
Bernstein_inequality
Unequal quality of housing in a society
Housing inequality is a disparity in the quality of housing in a society which is a form of economic inequality. The right to housing is recognized by
Housing_inequality
Concept in mathematical analysis
In mathematical analysis, the Pólya–Szegő inequality (or Szegő inequality) states that the Sobolev energy of a function in a Sobolev space does not increase
Pólya–Szegő_inequality
Development Index (HDI), but is also used separately. Adjusting income for inequality based on the Gini coefficient was first proposed by Amartya Sen in 1976
List of countries by inequality-adjusted income
List_of_countries_by_inequality-adjusted_income
Geometric inequality applicable to any closed curve
In mathematics, the isoperimetric inequality is a geometric inequality involving the square of the circumference of a closed curve in the plane and the
Isoperimetric_inequality
Physical law for entropy and heat
system boundary where the heat transfer occurs. The modified Clausius inequality, for all heat transfer scenarios, can then be expressed as ∫ cycle ( δ Q C
Second_law_of_thermodynamics
Effects of income inequality, researchers have found, include higher rates of health and social problems, and lower rates of social goods, a lower population-wide
Effects of economic inequality
Effects_of_economic_inequality
Theorem about inclusions between Sobolev spaces
In mathematics, there is in mathematical analysis a class of Sobolev inequalities, relating norms including those of Sobolev spaces. These are used to
Sobolev_inequality
Mathematical inequality
In mathematics, Schur's inequality, named after Issai Schur, establishes that for all non-negative real numbers x, y, z, and t, x t ( x − y ) ( x − z
Schur's_inequality
Mathematical inequality
mathematics, Muirhead's inequality, named after Robert Franklin Muirhead, also known as the "bunching" method, generalizes the inequality of arithmetic and
Muirhead's_inequality
Theorem
In mathematics, Hadamard's inequality (also known as Hadamard's theorem on determinants) is a result first published by Jacques Hadamard in 1893. It is
Hadamard's_inequality
Bound on optimal stopping in random sequences
achieved by a "prophet" who knows all the inputs (and not just their distributions) ahead of time. These inequalities have applications in the theory of
Prophet_inequality
Adage about availability of health care
health inequality. As Frank Dobson put it when he was United Kingdom Secretary of State for Health: "Inequality in health is the worst inequality of all. There
Inverse_care_law
Probabilistic inequality
theory, Ville's inequality provides an upper bound on the probability that a supermartingale exceeds a certain value. The inequality is named after Jean
Ville's_inequality
Spread of wealth in a society
of wealth, which is rarely used in measuring wealth inequality, also includes human capital. For example, the United Nations definition of inclusive wealth
Distribution_of_wealth
Inequality in probability theory
In probability theory, Kolmogorov's inequality is a so-called "maximal inequality" that gives a bound on the probability that the partial sums of a finite
Kolmogorov's_inequality
In probability theory, the Vysochanskij–Petunin inequality gives a lower bound for the probability that a random variable with finite variance lies within
Vysochanskij–Petunin inequality
Vysochanskij–Petunin_inequality
Concept in coding theory
In coding theory, the Kraft–McMillan inequality gives a necessary and sufficient condition for the existence of a prefix code (in Leon G. Kraft's version)
Kraft–McMillan_inequality
Causes of income inequality in the United States describes the reasons for the unequal distribution of income in the US and the factors that cause it
Causes of income inequality in the United States
Causes_of_income_inequality_in_the_United_States
Mathematical norm
p . {\displaystyle \|UTV\|_{p}=\|T\|_{p}.} They satisfy Hölder's inequality: for all p ∈ [ 1 , ∞ ] {\displaystyle p\in [1,\infty ]} and q {\displaystyle
Schatten_norm
Probabilistic inequality
In probability theory, Bennett's inequality provides an upper bound on the probability that the sum of independent random variables deviates from its expected
Bennett's_inequality
Inequality in mathematics
holds if and only if a n = 0 {\displaystyle a_{n}=0} for all n. An integral version of Hardy's inequality states the following: if f is a measurable function
Hardy's_inequality
Denmark has been noted as having one of the lowest income inequality ratings in the world and has been known to maintain relative stability in this metric
Income_inequality_in_Denmark
Set of mathematical inequalities
mathematics, the Newton inequalities refer to a set of mathematical inequalities related to mathematical series. These inequalities are named after Isaac
Newton's_inequalities
Mathematical bound
achieved in Fischer's inequality if and only if all the entries of B are 0. Inductively one may conclude that a similar inequality holds for a block decomposition
Fischer's_inequality
and studios—to name some of the major players. Inequality has been present to varying degrees in all of these branches ever since Hollywood emerged as
Inequality_in_Hollywood
Geometric inequality or concentration inequality in mathematics and probability theory
Loomis–Whitney inequality and Hölder's inequality. The second is a result of probability theory which gives a concentration inequality for log-concave probability
Brascamp–Lieb_inequality
Unequal distribution of academic resources
Inequality in education is broken down into different types: regional inequality, inequality by sex, inequality by social stratification, inequality by
Educational_inequality
American entrepreneur and venture capitalist
action for citizens to embrace their roles in a democratic society.” In 2013, Hanauer appeared in the Robert Reich documentary Inequality for All, arguing
Nick_Hanauer
INEQUALITY FOR-ALL
INEQUALITY FOR-ALL
Boy/Male
Arabic, Muslim
Equality
Girl/Female
Hindu
Equality
Girl/Female
Christian, Gujarati, Hindu, Indian, Jain, Kannada, Malayalam, Marathi, Sanskrit, Sindhi, Telugu
Equality
Female
English
English variant spelling of French Fleur, or perhaps just a short form of Latin Flora, both FLOR means "flower."
Surname or Lastname
English, French, and Catalan
English, French, and Catalan : nickname from Old French, Middle English, Catalan fort, ‘strong’, ‘brave’ (Latin fortis). In some cases it may be from the Latin personal name derived from this word; this was borne by an obscure saint whose cult was popular during the Middle Ages in southern and southwestern France.English and French : topographic name for someone who lived near a fortress or stronghold, or an occupational name for someone employed in one. Compare Fortier 1.Czech (Fořt) : variant of Forst.
Girl/Female
Tamil
Equality
Girl/Female
Tamil
Equality
Male
Scandinavian
 Scandinavian form of Old Norse Þórr, TOR means "Thor" or "thunder." Compare with other forms of Tor.
Boy/Male
Hindu, Indian
Equality
Girl/Female
Indian, Traditional
Equality
Boy/Male
Muslim
Equality
Male
English
From an Old English byname, FOX means "fox."
Girl/Female
Bengali, Gujarati, Hindu, Indian, Kannada, Marathi
Equality
Surname or Lastname
English
English : nickname from the animal, Middle English, Old English fox. It may have denoted a cunning individual or been given to someone with red hair or for some other anecdotal reason. This relatively common and readily understood surname seems to have absorbed some early examples of less transparent surnames derived from the Germanic personal names mentioned at Faulks and Foulks.Irish : part translation of Gaelic Mac an tSionnaigh ‘son of the fox’ (see Tinney).Jewish (American) : translation of the Ashkenazic Jewish surname Fuchs.Americanized spelling of Focks, a North German patronymic from the personal name Fock (see Volk).Americanized spelling of Fochs, a North German variant of Fuchs, or in some cases no doubt a translation of Fuchs itself.
Boy/Male
Bengali, Indian
Equality
Girl/Female
Arabic, Muslim
Equality
Girl/Female
Tamil
Equality
Girl/Female
Australian, British, Indian, Newzealand
Equality
Male
Welsh
Welsh form of Old Norse Ãvarr, IFOR means "bow warrior."
Surname or Lastname
English
English : topographic name for someone who lived near a ford, Middle English, Old English ford, or a habitational name from one of the many places named with this word, such as Ford in Northumberland, Shropshire, and West Sussex, or Forde in Dorset.Irish : Anglicized form (quasi-translation) of various Gaelic names, for example Mac Giolla na Naomh ‘son of Gilla na Naomh’ (a personal name meaning ‘servant of the saints’), Mac Conshámha ‘son of Conshnámha’ (a personal name composed of the elements con ‘dog’ + snámh ‘to swim’), in all of which the final syllable was wrongly thought to be áth ‘ford’, and Ó Fuar(th)áin (see Foran).Jewish : Americanized form of one or more like-sounding Jewish surnames.Translation of German Fürth (see Furth).
INEQUALITY FOR-ALL
INEQUALITY FOR-ALL
Girl/Female
Gujarati, Hindu, Indian, Kannada, Malayalam, Marathi, Telugu
A Tree with Very Dark Bark
Boy/Male
Hindu, Indian
Sprouting; Germinating
Girl/Female
Biblical
Just people.
Girl/Female
Tamil
Vindya | விநà¯à®¤à¯à®¯à®¾
Knowledge
Female
English
English unisex form of Hebrew Terach, TERAH means "delay" and "station." In the bible, this is the name of a place in the wilderness where the Israelites stopped on their Exodus. It is also the name of the father of Abraham.
Boy/Male
American, Australian, British, Celtic, Christian, English, Welsh
Like a Lion; Ruling; Resembling a Lion; Oath
Girl/Female
Hindu
Goddess Parvati, Calm cool
Boy/Male
Scottish American
Form of Cameron 'crooked nose.
Girl/Female
Australian, French, Greek
Shining Light; Similar to Helen
Girl/Female
Tamil
Splendor or light or glow
INEQUALITY FOR-ALL
INEQUALITY FOR-ALL
INEQUALITY FOR-ALL
INEQUALITY FOR-ALL
INEQUALITY FOR-ALL
prep.
Indicating that instead of which something else controls in the performing of an action, or that in spite of which anything is done, occurs, or is; hence, equivalent to notwithstanding, in spite of; -- generally followed by all, aught, anything, etc.
n.
The state of being on an equality, as in rank or power.
n.
An expression consisting of two unequal quantities, with the sign of inequality (< or >) between them; as, the inequality 2 < 3, or 4 > 1.
v. i.
Unevenness; inequality of surface.
n.
Variableness; changeableness; inconstancy; lack of smoothness or equability; deviation; unsteadiness, as of the weather, feelings, etc.
n.
The quality of being unequal; difference, or want of equality, in any respect; lack of uniformity; disproportion; unevenness; disparity; diversity; as, an inequality in size, stature, numbers, power, distances, motions, rank, property, etc.
n.
Disproportion to any office or purpose; inadequacy; competency; as, the inequality of terrestrial things to the wants of a rational soul.
n.
Evenness; uniformity; as, an equality of surface.
n.
Sameness in state or continued course; evenness; uniformity; as, an equality of temper or constitution.
n.
An inequality in a board.
adv.
With coequality.
prep.
Indicating the space or time through which an action or state extends; hence, during; in or through the space or time of.
n.
Unevenness; want of levelness; the alternate rising and falling of a surface; as, the inequalities of the surface of the earth, or of a marble slab, etc.
n.
An inequality.
n.
An irregularity, or a deviation, in the motion of a planet or satellite from its uniform mean motion; the amount of such deviation.
pl.
of Inequality
prep.
Indicating that on place of or instead of which anything acts or serves, or that to which a substitute, an equivalent, a compensation, or the like, is offered or made; instead of, or place of.
n.
The condition or quality of being equal; agreement in quantity or degree as compared; likeness in bulk, value, rank, properties, etc.; as, the equality of two bodies in length or thickness; an equality of rights.
conj.
Because; by reason that; for that; indicating, in Old English, the reason of anything.
n.
A single algebraic expression; that is, an expression unconnected with any other by the sign of addition, substraction, equality, or inequality.