"Slovensk\u00E1 technick\u00E1 univerzita v Bratislave" . . "RIV/00216275:25410/07:00005694!RIV08-MSM-25410___" . . . "S" . . "The Distortion of a Curve"@en . . "Zk\u0159iven\u00ED k\u0159ivky"@cs . "The Distortion of a Curve"@en . . "Bratislava, SK" . "287-291" . "The Distortion of a Curve" . . "2007-02-06+01:00"^^ . . "curve; curvature; flexion; torsion; total curvature; distortion"@en . "The article is focused to problems of setting up suitable quantities which are helping us to evaluate a level of a distortion of a curve at its certain segment. Initial concepts are the first, the second and the third curvature of a curve at a point. Line integrals from the first, the second and the third curvature are described by quantities like a flexional, a torsional and a total distortion of a curve. By associating these quantities to a unit length are established the mean values of the flexional, the torsional and the total distortion of a curve."@en . "The Distortion of a Curve" . . . "Bratislava" . . "RIV/00216275:25410/07:00005694" . "978-80-969562-8-9" . "The article is focused to problems of setting up suitable quantities which are helping us to evaluate a level of a distortion of a curve at its certain segment. Initial concepts are the first, the second and the third curvature of a curve at a point. Line integrals from the first, the second and the third curvature are described by quantities like a flexional, a torsional and a total distortion of a curve. By associating these quantities to a unit length are established the mean values of the flexional, the torsional and the total distortion of a curve." . . "1"^^ . "417595" . . "1"^^ . "25410" . . . "Zahr\u00E1dka, Jarom\u00EDr" . "[5AF158BC02A5]" . "Aplimat 2007 6th International Conference" . "5"^^ . "P\u0159edlo\u017Een\u00FD \u010Dl\u00E1nek se zab\u00FDv\u00E1 probl\u00E9mem zaveden\u00ED vhodn\u00FDch veli\u010Din, pomoc\u00ED nich\u017E je mo\u017Eno ohodnotit m\u00EDru zk\u0159iven\u00ED k\u0159ivky na jist\u00E9m jej\u00EDm \u00FAseku. V\u00FDchoz\u00EDmi pojmy jsou prvn\u00ED, druh\u00E1 a t\u0159et\u00ED k\u0159ivost k\u0159ivky v bod\u011B. K\u0159ivkov\u00FDmi integr\u00E1ly z prvn\u00ED, druh\u00E9 a t\u0159et\u00ED k\u0159ivosti jsou zavedeny veli\u010Diny flexn\u00ED, torzn\u00ED a tot\u00E1ln\u00ED zk\u0159iven\u00ED k\u0159ivky. Vzta\u017Een\u00EDm t\u011Bchto hodnot na jednotkovou d\u00E9lku k\u0159ivky jsou zavedeny p\u0159\u00EDslu\u0161n\u00E9 st\u0159edn\u00ED hodnoty flexn\u00EDho, torzn\u00EDho a tot\u00E1ln\u00EDho zk\u0159iven\u00ED k\u0159ivky."@cs . . . . "Zk\u0159iven\u00ED k\u0159ivky"@cs .