AU - Jafari, Mohammad AU - Ghandi Varnosefaderani, Iman TI - A semi-analytical solution of stress concentration factor in the isotropic plates containing two quasi-rectangular cut outs PT - JOURNAL ARTICLE TA - mdrsjrns JN - mdrsjrns VO - 15 VI - 8 IP - 8 4099 - http://mme.modares.ac.ir/article-15-11171-en.html 4100 - http://mme.modares.ac.ir/article-15-11171-en.pdf SO - mdrsjrns 8 ABĀ  - In this paper, by expanding Muskhelishvili’s stress functions and with use of Schwarz’s alternating method, the stress distribution in a plate with two quasi-rectangular cut outs has been studied. Muskhelishvili represented the mentioned stress functions for studying the stress distribution in an isotropic plate with a circular or an elliptical cut out. In order to expand the Muskhelishvili’s analytical solution for deriving the stress functions related to quasi-rectangular cut outs, a conformal mapping function has been used. This conformal mapping transformed the area external of the quasi-rectangular cut out into the area outside the unit circle. Considering Schwarz’s alternating method, for calculating the stress distribution around two cut outs, complex series with unknown coefficients have been used. In this study, the effect of different parameters such as the location of the cut outs relative to each other, bluntness and aspect ratio of cut out sides on stress concentration factor can be investigated. The finite element method has been used to verify the accuracy of semi-analytical results. Comparison of two methods demonstrates the precision of obtained semi-analytical solution and indicates that it can be used for computing stress distribution in plates with two rectangular cut outs. Analysis of the proposed solution shows that the mentioned parameters have a significant effect on stress distribution and stress concentration factor decreases noticeably with selection of appropriate values of these parameters. CP - IRAN IN - Shahrood LG - eng PB - mdrsjrns PG - 341 PT - YR - 2015