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przypadek osiowy

English translation: uniaxial case

GLOSSARY ENTRY (DERIVED FROM QUESTION BELOW)
Polish term or phrase: przypadek osiowy English translation: uniaxial case Entered by: Frank Szmulowicz, Ph. D.

14:39 Sep 7, 2019

Polish to English translations [PRO] Science - Science (general) / general mechanics
Polish term or phrase: przypadek osiowy Course Description: Mechanical Engineering Prawo Hooke'a dla rozciągania - przypadek osiowy.	Darius Saczuk KudoZ activity Questions: 1630 (3 open) (8 closed without grading) Answers: 5914 United States Local time: 12:08
uniaxial case Explanation: Propozycja. -------------------------------------------------- Note added at 3 hrs (2019-09-07 17:49:16 GMT) -------------------------------------------------- In Chapter 1 the deformation of a bar has been characterized by the strain and the displacement. We will now generalize these kinematic quantities to the plane and the spatial cases. For this purpose, we introduce the displacement vector and the strain tensor, the latter describing length and angle changes. In addition, we will extend the already known Hooke’s law from the uniaxial case to the two and three-dimensional cases. Finally, we will discuss the so-called strength hypotheses in order to assess the exertion of the material under multiaxial stress. The students shall learn how to calculate the stresses from the strains or displacements and vice versa. https://link.springer.com/chapter/10.1007/978-3-642-12886-8_... cccccccccc According to Chapter 1, stresses and strains are connected by Hooke's law. In the uniaxial case (bar) it takes the form σ = E ε where E is Young's modulus https://books.google.com/books?id=2fxQDwAAQBAJ&pg=PA86&lpg=P... ccccccccccccccccccccccccccccccccc -------------------------------------------------- Note added at 3 hrs (2019-09-07 17:51:13 GMT) -------------------------------------------------- GENERALIZED HOOKE'S LAW In Section 3.1 we studied the “uniaxial” case only, i.e., the strain in the direction of the acting stress ti I. We shall now extend to the general case of spatial (triaxial)... https://books.google.com/books?id=oEsvBQAAQBAJ&pg=PA43&lpg=P...	Selected response from: Frank Szmulowicz, Ph. D. United States Local time: 12:08
Grading comment Thank you, Frank. 4 KudoZ points were awarded for this answer

Summary of answers provided
3 +1	uniaxial case	Frank Szmulowicz, Ph. D.

Discussion entries: 2

Frank Szmulowicz, Ph. D. United States 17:55 Sep 7, 2019  Stress is related to force per unit area. Strain is a fractional elongation. The "case" here is where the strain is along the line of the stress, i.e., it is axial. Axial would explain it, but uniaxial would emphasize strain along the line of application of stress. M.A.B. Poland 16:57 Sep 7, 2019  Porównując https://pl.wikipedia.org/wiki/Prawo_Hooke’a#Osiowy_stan_napr... oraz https://en.wikipedia.org/wiki/Hooke's_law#Tensional_stress_o... wygląda na to, że polski "Osiowy stan naprężenia i odkształcenia" to angielski "Tensional stress of a uniform bar", czyli terminologia jest nieco inna. Chyba po prostu chodzi o rozciąganie w jednym kierunku (osi). Automatic update in 00:

  

Answers

6 mins   confidence: peer agreement (net): +1

uniaxial case Explanation: Propozycja. -------------------------------------------------- Note added at 3 hrs (2019-09-07 17:49:16 GMT) -------------------------------------------------- In Chapter 1 the deformation of a bar has been characterized by the strain and the displacement. We will now generalize these kinematic quantities to the plane and the spatial cases. For this purpose, we introduce the displacement vector and the strain tensor, the latter describing length and angle changes. In addition, we will extend the already known Hooke’s law from the uniaxial case to the two and three-dimensional cases. Finally, we will discuss the so-called strength hypotheses in order to assess the exertion of the material under multiaxial stress. The students shall learn how to calculate the stresses from the strains or displacements and vice versa. https://link.springer.com/chapter/10.1007/978-3-642-12886-8_... cccccccccc According to Chapter 1, stresses and strains are connected by Hooke's law. In the uniaxial case (bar) it takes the form σ = E ε where E is Young's modulus https://books.google.com/books?id=2fxQDwAAQBAJ&pg=PA86&lpg=P... ccccccccccccccccccccccccccccccccc -------------------------------------------------- Note added at 3 hrs (2019-09-07 17:51:13 GMT) -------------------------------------------------- GENERALIZED HOOKE'S LAW In Section 3.1 we studied the “uniaxial” case only, i.e., the strain in the direction of the acting stress ti I. We shall now extend to the general case of spatial (triaxial)... https://books.google.com/books?id=oEsvBQAAQBAJ&pg=PA43&lpg=P...	Frank Szmulowicz, Ph. D. United States Local time: 12:08 Native speaker of: English, Polish PRO pts in category: 147
Grading comment Thank you, Frank.
Peer comments on this answer (and responses from the answerer) agree  A.G. 4 hrs   -> Dziękuję A. G.. Ta dziedzina pokrywa się z fizyką.
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