* Ideal norm

**** Ideal observer theory holds that what is right is determined by the attitudes that a hypothetical ideal observer would have.

Economics dropped the adjective political in the 19th century, but works backwards, by describing " The Ideal Market ", urging governments to formulate policy and law to approach said ideal.

Ideal class groups ( or, rather, what were effectively ideal class groups ) were studied some time before the idea of an ideal was formulated.

Ideal classes can be multiplied: if denotes the equivalence class of the ideal I, then the multiplication = is well-defined and commutative.

* Ideal gas law, in physics, governing the pressure of an ideal gas

* Ideal solution, a solution with thermodynamic properties analogous to those of a mixture of ideal gases

Ideal for this type of procedure are non-smokers, healthy individuals who do not have a life-threatening illness or medical conditions that can impair healing, adults within 30 % of their ideal weight who have firm and elastic skin.

* Ideal Numbers, Proof that the theory of ideal numbers saves unique factorization for cyclotomic integers at Fermat's Last Theorem Blog.

* Ilyenkov, E. V., The Ideal in Human Activity, includes “ Dialectical Logic ” and essays on the ideal and activity, such as “ The Universal ,” “ Activity and Knowledge ” and “ The Concept of the Ideal ,” published by Erythrospress, see Erythrospress. com / Ilyenkov

Quite important to notice is that the results of procedure through defining of ideal types are the process of constant changes and different interpretations because of historical changes as well as the necessity not to avoid the arising of new “ Ideal Types ”.

If there is a Platonic Ideal Form then there must be an ideal representation of such a form.

Ideal Brayton cycles also have an ideal efficiency equal to ideal Carnot cycle efficiency.

; Ideal voltage source, or ideal battery: A dynamic pump with feedback control.

* Humanizam kao politički ideal: Ogled o grčkoj kulturi-Beograd, 1968 ( Humanism as Political Ideal: A Study of Greek Culture )

During the original run of the cartoon ( 1964 ), at the end of each episode, the closing song ended with the phrase: " And there he goes Peter Potamus, our ideal " ( The Ideal toy company was the sponsor of the television series.

H. Freyer, as Philosopher and Sociologist, and the first Bearer of the German professorship for Sociology in Leipzig, keeps the mind that the notion of “ Ideal Type ” is “ a logical peculiarity of historical and cultural cognition ” and “ oversees the contrast of personal and general methods of thinking, on one hand, by defining the logical character in individual, and on the other, by progressing on the way to generalization only till showing the typicalness and not the pure general rule ”.

Ideal for tourist destination, field trips, dates and outings with the family and friends.

In the field of education, the concept of IFR helped to create the models of Ideal Education, Ideal Learner, and Ideal Teacher, all of which paved the way to Creative Pedagogy.

He is a noted music enthusiast, having worked as a DJ and selected all the soundtrack music for seven series of his TV show " Ideal ", as well as curating an ‘ Ideal ’ soundtrack album and helping to release albums by the left field bands Celebricide and Cyclobe.

The industry norm can be argued to be anything between 93 %- 96 % when a UPS is in full operational mode, and to reach these figures companies often put their UPS in an ideal scenario.

of a number field K contains an integral ideal of norm not exceeding a certain bound, depending on K, called Minkowski's bound: the finiteness of the class number of an algebraic number field follows immediately.

The government-sponsored image of the conversion process emphasises psychological persuasion and a variety of " soft-sell " techniques ; this is the " ideal norm " in regime reports, according to Tong.

This result gives a bound, depending on the ring, such that every ideal class contains an ideal norm less than the bound.

If a is an ideal of O < sub > K </ sub >, other than the zero ideal we denote its norm by Na.

Hence this norm of an ideal is always a positive integer.

When I is a principal ideal αO < sub > K </ sub > then N ( I ) is equal to the absolute value of the norm to Q of α, for α an algebraic integer.

In commutative algebra, the norm of an ideal is a generalization of a norm of an element in the field extension.

When the less complicated number ring is taken to be the ring of integers, Z, then the norm of a nonzero ideal I of a number ring R is simply the size of the finite quotient ring R / I.

The norm of a principal ideal generated by α is the ideal generated by the field norm of α.

By convention, the norm of the zero ideal is taken to be zero.

The norm of an ideal can be used to bound the norm of some nonzero element by the inequality

Ushering in the modern recording era, he challenged our perception and processes of how recordings could be made, explored the possibilities of modern recording and exploited the potential for the popularity of classical music-and all this while setting standards of artistic achievement, integrity, risk-taking, and of the aesthetic ideal that became our new norm.

A six-partner group marriage ( three male, three female ) is considered the ideal norm in the alien society described in the novel ; the main characters are in a five-partner group marriage, and much of the dramatic tension hinges on there being more than one candidate for the sixth position.

The previous norm, the mortise lock, is a more complex device, and its higher manufacturing cost as well as its more labor intensive installation make the bored cylindrical lock an ideal substitute, both in price and functionality.

This norm diverges only minimally from the original ideal of " one letter, one sound "; that is, it accepts only minor allophonic variation.

The term " reciprocity law " refers to a long line of more concrete number theoretic statements which it generalized, from the quadratic reciprocity law and the reciprocity laws of Eisenstein and Kummer to Hilbert's product formula for the norm symbol.

The generalization of these three properties to more abstract vector spaces leads to the notion of norm.

It may be the case that we use the truth-predicate to express this norm, not because it has anything to do with the nature of truth in some inflationary sense, but because it is a convenient way of expressing this otherwise inexpressible generalization.

* Norm ( abelian group ), generalization of norm to abelian groups

In mathematics, a semi-Hilbert space is a generalization of a Hilbert space in functional analysis, in which, roughly speaking, the inner product is required only to be positive semi-definite rather than positive definite, so that it gives rise to a seminorm rather than a vector space norm.