The Analysis of Shear Strength of Flexural RC Elements According to EC2 and STR / Lenkiamuju Gelžbetoniniu Elementu Istrižojo Pjuvio Stiprumo Pagal Str Ir Ec2 Analize
Auteur(s): |
Šarūnas Kelpša
Mindaugas Augonis |
---|---|
Médium: | article de revue |
Langue(s): | anglais |
Publié dans: | Engineering Structures and Technologies, janvier 2013, n. 4, v. 4 |
Page(s): | 133-144 |
DOI: | 10.3846/2029882x.2012.753683 |
Abstrait: |
When the various reinforced concrete structures are designed according to EC2 and STR, the difference of calculation results, is quite significant. In this article the calculations of shear strength of bending reinforced concrete elements are investigated according to these standards. The comparison of such calculations is also significant in the sense that the shear strength calculations are carried out according to different principles. The STR regulations are based on work of the shear reinforcement crossing the oblique section and the compressed concrete at the end of the section. In this case, at the supporting zone, the external bending moment and shear force should be in equilibrium with the internal forces in reinforcement and compressed concrete, i.e., the cross section must be checked not only from the external shear force, but also from bending moment. In EC2 standard, the shear strengths are calculated according to simplified truss model, which consists of the tension shear reinforcement bars and compressed concrete struts. The bending moment is not estimated. After calculation analysis of these two methods the relationships between shear strength and various element parameters are presented. The elements reinforced with stirrups and bends are investigated additionally because in EC2 this case is not presented. According to EC2 the simplified truss model solution depends on the compression strut angle value θ, which is limited in certain interval. Since the component of tension reinforcement bar directly depends on the angle θ and the component of compression strut depends on it conversely, then exists some value θ when the both components are equal. So the angle θ can be found when such two components will be equated. However, such calculation of angle θ became complicated if the load is uniform, because then the components of tension bar are estimated not in support cross section but in cross section that are displaced by distance d. So, the cube equation should be solved. For simplification of such solution the graphical method to find out the angle θ and the shear strength are presented. In these graphics the intersection point of two components (shear reinforcement and concrete) curves describes the shear strength of element. |
- Informations
sur cette fiche - Reference-ID
10326034 - Publié(e) le:
21.07.2019 - Modifié(e) le:
09.08.2019