Adobe PDF (1.46 MB)
Title Details:
Verification of the kinematical stability and determination of support reactions
Authors: Avramidis, Ioannis
Morfidis, Konstantinos
Reviewer: Elenas, Anaxagoras
Subject: ENGINEERING AND TECHNOLOGY > > >
Description:
Abstract:
Verification of the kinematical stability and determination of support reactions.
Table of Contents:
Ch. 1 Verification of the kinematical stability and determination of support reactions

1.1 Intuitive verification o the kinematical stability of planar and space structures (Group A)
1.1.1 Planar structures
1.1.2 Space structures

1.2 Numerical verification of the kinematical stability and calculation of support reactions using the free-body principle and the equilibrium conditions (Group B)
1.2.1 Planar structures
1.2.2 Space structures

1.3 Verification of the kinematical stability and determination of the degree of indeterminacy of complex structures using the successive composition/decomposition method (Group Γ)
1.3.1 Planar structures
1.3.2 Space structures

1.4 Verification of the kinematical stability of complex structures using the element-swapping method (Group Δ)

1.5 Verification of the kinematical stability of planar structures using the Williot-diagram, and determination of the virtual displacements of single-kinematical structures (Group E)
Linguistic Editors: Katsarou, Dimitra
Technical Editors: Avramidou, Eleni
Graphic Editors: Avramidou, Eleni
Type: Chapter
Creation Date: 2015
Item Details:
License: Attribution – NonCommercial – NoDerivatives 4.0 International (CC BY-NC-ND 4.0)
Handle http://hdl.handle.net/11419/1005
Bibliographic Reference: Avramidis, I., & Morfidis, K. (2015). Verification of the kinematical stability and determination of support reactions [Chapter]. In Avramidis, I., & Morfidis, K. 2015. Statically determinate structures [Undergraduate textbook]. Kallipos, Open Academic Editions. https://hdl.handle.net/11419/1005
Language: Greek
Is Part of: Statically determinate structures
Publication Origin: Kallipos, Open Academic Editions