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1 огибающая кривая
1) Computers: enveloping curve2) Construction: Mohr's enveloping curve, intrinsic curve3) Economy: envelope curve (для прогнозирования), enveloping curve (для прогнозирования)4) Mining: compound curve, enveloping curve5) Astronautics: envelope6) Makarov: intrinsic curve (кругов Мора) -
2 касательная
1) General subject: tan2) Construction: Mohr's enveloping curve (кругов Мора), tangent, tangent line4) Cartography: tangent ratio6) Mathematical analysis: tangency7) Makarov: intrinsic curve (кругов Мора), tangential -
3 Mohr’sche Umhüllungskurve
Deutsch-Englisch Fachwörterbuch Architektur und Bauwesen > Mohr’sche Umhüllungskurve
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4 naturalne równania krzywej
• intrinsic equations of space curveSłownik polsko-angielski dla inżynierów > naturalne równania krzywej
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5 wewnętrzne równania krzywej
• intrinsic equations of space curveSłownik polsko-angielski dla inżynierów > wewnętrzne równania krzywej
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6 потери на стыке
Telecommunications: intrinsic-joint loss (оптоволокон), splice curve (оптоволокон), splice loss (оптоволокон) -
7 потери на стыке
Russian-English dictionary of telecommunications > потери на стыке
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8 Brucheigenlinie
Deutsch-Englisch Fachwörterbuch Architektur und Bauwesen > Brucheigenlinie
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9 опрокидывающий момент
1. tilting moment; pull-out torque2. мор. capsizing moment3. ав. disturbing momentреактивный момент — reactive moment; reactive torque
Русско-английский большой базовый словарь > опрокидывающий момент
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10 кривая начальной намагниченности
Русско-английский военно-политический словарь > кривая начальной намагниченности
См. также в других словарях:
Intrinsic equation of a curve — Intrinsic In*trin sic ([i^]n*tr[i^]n s[i^]k), a. [L. intrinsecus inward, on the inside; intra within + secus otherwise, beside; akin to E. second: cf. F. intrins[ e]que. See {Inter }, {Second}, and cf. {Extrinsic}.] [1913 Webster] 1. Inward;… … The Collaborative International Dictionary of English
Intrinsic — In*trin sic ([i^]n*tr[i^]n s[i^]k), a. [L. intrinsecus inward, on the inside; intra within + secus otherwise, beside; akin to E. second: cf. F. intrins[ e]que. See {Inter }, {Second}, and cf. {Extrinsic}.] [1913 Webster] 1. Inward; internal;… … The Collaborative International Dictionary of English
Intrinsic energy of a body — Intrinsic In*trin sic ([i^]n*tr[i^]n s[i^]k), a. [L. intrinsecus inward, on the inside; intra within + secus otherwise, beside; akin to E. second: cf. F. intrins[ e]que. See {Inter }, {Second}, and cf. {Extrinsic}.] [1913 Webster] 1. Inward;… … The Collaborative International Dictionary of English
Intrinsic value — Intrinsic In*trin sic ([i^]n*tr[i^]n s[i^]k), a. [L. intrinsecus inward, on the inside; intra within + secus otherwise, beside; akin to E. second: cf. F. intrins[ e]que. See {Inter }, {Second}, and cf. {Extrinsic}.] [1913 Webster] 1. Inward;… … The Collaborative International Dictionary of English
Intrinsic equation — In geometry, an intrinsic equation of a curve is an equation that defines the curve using a relation between the curve s intrinsic properties, that is, properties that do not depend on the location and possibly the orientation of the curve.… … Wikipedia
Intrinsic muscles of external ear — Infobox Muscle Name = PAGENAME Latin = GraySubject = 229 GrayPage = 1035 Caption = The muscles of the auricula. Caption2 = Origin = Insertion = Blood = Nerve = Action = Antagonist = MeshName = MeshNumber = DorlandsPre = DorlandsSuf = The… … Wikipedia
Algebraic curve — In algebraic geometry, an algebraic curve is an algebraic variety of dimension one. The theory of these curves in general was quite fully developed in the nineteenth century, after many particular examples had been considered, starting with… … Wikipedia
Track transition curve — The red Euler spiral is an example of an easement curve between a blue straight line and a circular arc, shown in green … Wikipedia
Phase response curve — A phase response curve (PRC) illustrates the transient change in the cycle period of an oscillation induced by a perturbation as a function of the phase at which it is received. PRCs are used in various fields; examples of biological oscillations … Wikipedia
Albert Caquot — Infobox Person name = Albert Caquot image size = 100 birth date = July 1, 1881 birth place = Vouziers, France death date = death date and age|1976|11|28|1881|7|1 death place = Paris, France nationality = FRA occupation = inventor and engineer… … Wikipedia
Differential geometry of surfaces — Carl Friedrich Gauss in 1828 In mathematics, the differential geometry of surfaces deals with smooth surfaces with various additional structures, most often, a Riemannian metric. Surfaces have been extensively studied from various perspectives:… … Wikipedia