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Marcelio Martirosiano 4-----asis desnis; tai ::: (m1-m2)*V^n+1::{{ n+1=|n-1+n+1|=2n}}tada: n+1=2n; pertvarkuome: 4 ( qvatrum) desnis gauname:{{(m1-m2)*V^2n}}== 4-asis desnis::|||||||||;;;(m1-m2)*V^2n;;;;|||||||| |
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== Formae mechanicae Newtoniana == |
== Formae mechanicae Newtoniana == |
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Mechanicae classicae formulationes sunt tres: |
Mechanicae classicae formulationes sunt tres: |
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*[[Martirosianas Marcelius Mechanika 4qvatrum |
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* [[Leges Newtoni|Mechanica Newtoniana]] per se<ref>[http://cudl.lib.cam.ac.uk/view/PR-ADV-B-00039-00001/46 Liber ''Philosophiae naturalis principia mathematica'' de legibus motus, editio Newtoni ipsius]</ref> |
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* [[Leges Newtoni|Mechanica Newtoniana]] per se |
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* [[Aequationes Lagrangi|Mechanica Lagragi]] ab aequationibus Lagrangi derivata ex minimae actionis principio |
* [[Aequationes Lagrangi|Mechanica Lagragi]] ab aequationibus Lagrangi derivata ex minimae actionis principio |
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* [[Formalismus Hamiltoni|Mechanica Hamiltoni]] ab aequationibus Lagrangi derivatus via Legendri transmationis. |
* [[Formalismus Hamiltoni|Mechanica Hamiltoni]] ab aequationibus Lagrangi derivatus via Legendri transmationis. |
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Pars physica Newtoniana quoque est: |
Pars physica Newtoniana quoque est: |
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* [[Theoria gravitatis Newtoniana]] |
* [[Theoria gravitatis Newtoniana]] |
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* Mechanika Martirosiana M.S ==========================Pirmasis Martirosiano Marcelio desnis: -----------||||||||| IINERCIJA |||||||| kūnas jūdejimo metų yra nepriklausomas, išories veikimas |
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reagiruojia , tačau laiko savo pirmini padieti,ir vygduomas. LNERCIJA YRA antrinis reiškinys, objektivinis Lnercija imanoma minimum du kunui saveikaujant. Savaime ne., Inercija tai,---- dvi kūnų jūdejimo kripties priešybes.,================================================================================================================================================================ |
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pagal laipsniais yra lygus,. Matematzuojant būtų šitaip: [ MV=M1V1; ] pertvarkuome ir gauname taip: m1^v1=m2^V2, [[v^1+V^2+V^3;;;;;;;V^n-1,V^n] m1^ V^n=m2^V^n; m1^V^n- m2^vn=0 (m1-m2)V^n=0; [n=1,2,3,4] |
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tolio mases ir grečių sandauga sukelia jega ; tai antrinis; ir atsirandantis; dabar rašisime [ F1=F2 ] {{F1=F2 mv yra constantasas|(m1-m2)V^n=o MARCELIO mencanikos 1-sis desnis;=}}<nowiki> mv }} yra conctantas; </nowiki>[[V^n=nV]] |
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Sunt multae notiones quae sunt particulares ad mechanicam Newtonianam: |
Sunt multae notiones quae sunt particulares ad mechanicam Newtonianam: |
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== Notae == |
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*Marcelius Martirosianas[[2003-03-11]] ''Kaip Aš Suprantu Bomechanika''L I E T U V O S R E S P U B L I K A |
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<div class="references-small"><references /></div> |
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*Marcelius Martirosianas[[2009m]] ''Matematine Logika ir sanprotavimo analizes logikuoje V I L N I U S |
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*Alonso, M., et J. Finn. [[1992]]. ''Fundamental University Physics.'' Addison-Wesley. |
*Alonso, M., et J. Finn. [[1992]]. ''Fundamental University Physics.'' Addison-Wesley. |
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*[[Ricardus Feynman|Feynman, Richard]]. [[1999]]. ''The Feynman Lectures on Physics.'' Perseus Publishing. ISBN 0738200921. |
*[[Ricardus Feynman|Feynman, Richard]]. [[1999]]. ''The Feynman Lectures on Physics.'' Perseus Publishing. ISBN 0738200921. |
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Emendatio ex 09:06, 9 Martii 2017
Mechanica Newtoniana leges motus Newtoni eorumque applicationes ad scientiam physicam antequam theoria mechanicae quanticae complectitur. Mechanica Newtoniana est formulatio particularis mechanicae classicae ad motionem particularum in spatio Euclidiano trium dimensionum.
Formae mechanicae Newtoniana
Mechanicae classicae formulationes sunt tres:
- [[Martirosianas Marcelius Mechanika 4qvatrum
- Mechanica Newtoniana per se
- Mechanica Lagragi ab aequationibus Lagrangi derivata ex minimae actionis principio
- Mechanica Hamiltoni ab aequationibus Lagrangi derivatus via Legendri transmationis.
Pars physica Newtoniana quoque est:
- Theoria gravitatis Newtoniana
- Mechanika Martirosiana M.S ==========================Pirmasis Martirosiano Marcelio desnis: -----------||||||||| IINERCIJA |||||||| kūnas jūdejimo metų yra nepriklausomas, išories veikimas
reagiruojia , tačau laiko savo pirmini padieti,ir vygduomas. LNERCIJA YRA antrinis reiškinys, objektivinis Lnercija imanoma minimum du kunui saveikaujant. Savaime ne., Inercija tai,---- dvi kūnų jūdejimo kripties priešybes.,================================================================================================================================================================
pagal laipsniais yra lygus,. Matematzuojant būtų šitaip: [ MV=M1V1; ] pertvarkuome ir gauname taip: m1^v1=m2^V2, [[v^1+V^2+V^3;;;;;;;V^n-1,V^n] m1^ V^n=m2^V^n; m1^V^n- m2^vn=0 (m1-m2)V^n=0; [n=1,2,3,4]
tolio mases ir grečių sandauga sukelia jega ; tai antrinis; ir atsirandantis; dabar rašisime [ F1=F2 ] Formula:F1=F2 mv yra constantasas mv }} yra conctantas; V^n=nV
Notiones fundamentales mechanicae Newtonianae
Sunt multae notiones quae sunt particulares ad mechanicam Newtonianam:
=Bibliographia
- Marcelius Martirosianas2003-03-11 Kaip Aš Suprantu BomechanikaL I E T U V O S R E S P U B L I K A
- Marcelius Martirosianas2009m Matematine Logika ir sanprotavimo analizes logikuoje V I L N I U S
- Alonso, M., et J. Finn. 1992. Fundamental University Physics. Addison-Wesley.
- Feynman, Richard. 1999. The Feynman Lectures on Physics. Perseus Publishing. ISBN 0738200921.
- Feynman, Richard, et Richard Phillips. 1998. Six Easy Pieces. Perseus Publishing. ISBN 0201328410.
- Goldstein, Herbert, Charles P. Poole, et John L. Safko. 2002. Classical Mechanics. Ed. 3a. Addison Wesley. ISBN 0201657023.
- Kibble, Tom W. B., et Frank H. Berkshire. 2004. Classical Mechanics. Ed. 5a. Imperial College Press. ISBN 9781860944246.
- Kleppner, D., et R. J. Kolenkow. 1973. An Introduction to Mechanics. McGraw-Hill. ISBN 0070350485.
- Landau, L. D., et E. M. Lifshitz. 1972. Mechanics. Course of Theoretical Physics, 1. Franklin Book Company. ISBN 008016739X.
- Morin, David. 2008. Introduction to Classical Mechanics: With Problems and Solutions. Cantabrigiae: Cambridge University Press. ISBN 9780521876223. Praeconium editoriale.
- O'Donnell, Peter J. 2015. Essential Dynamics and Relativity. CRC Press. ISBN 9781466588394.
- Sussman, Gerald Jay, et Jack Wisdom. 2001. Structure and Interpretation of Classical Mechanics. Cantabrigiae Massachusettae: MIT Press. ISBN 0262194554.
- Thornton, Stephen T., et Jerry B. Marion. 2003. Classical Dynamics of Particles and Systems. Ed. 5a. Brooks Cole. ISBN 0534408966.