帽型复合材料梁的稳定性分析与固有频率计算
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摘要
根据经典层合板理论,结合纯弯曲状态下内力与应变的关系,推导了帽型复合材料梁的等效弯曲刚度计算公式,并利用等效弯曲刚度进一步推出了该类型梁的轴向临界载荷与固有频率计算公式,最后用有限元法进行验证,为帽型及其他截面类型的复合材料梁在工程中的应用提供参考。
According to the Classical Lamination Theory,this paper deduced the effective flexural rigidity of cap-beam with the relationship between the internal force and strain when the beam are under the pure bending state. Then,the effective flexural rigidity was used to deduce the axial critical load and the natural frequency of this beam. Finally,the finite element method was used to verify the formula,providing a reference for the application of the cap-type and other section types of composite beam in engineering.
According to the Classical Lamination Theory,this paper deduced the effective flexural rigidity of cap-beam with the relationship between the internal force and strain when the beam are under the pure bending state. Then,the effective flexural rigidity was used to deduce the axial critical load and the natural frequency of this beam. Finally,the finite element method was used to verify the formula,providing a reference for the application of the cap-type and other section types of composite beam in engineering.
引文
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[12]蓝铁军.复合材料梁的解析解与有限元解分析研究[J].山西建筑,2010,36(29):59-60.
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[15]凌桂龙,丁金滨,温正.ANSYS Workbench 13.0从入门到精通[J].2012.
[2]王瑞,武玲.船舶用玻璃钢及其性能分析[J].中国纺织大学学报,2000,26(3):123-126.
[3]唐红艳,王继辉,徐鹏遥.复合材料在海军舰艇上的国外应用现状及进展[J].船舶,2006,(2):6-11.
[4]宋志宏,张继栋.复合材料梁,板振动特性的分析与实验研究[J].地震工程与工程振动,1989,4:004.
[5]严冲.复合材料梁腹板的剪切屈曲研究[D].哈尔滨工业大学,2013.
[6]Kaw A K.Mechanics of composite materials[M].CRC press,2005.
[7]程山,龚志钰.复合材料梁弯曲的普遍理论[J].四川轻化工学院学报,1998,11(1):7-10.
[8]Tuttle M E.Structural analysis of polymeric composite materials[M].CRC Press,2012.
[9]单辉祖,谢传锋.工程力学(静力学与材料力学)[M].北京:高等教育出版社,2004.
[10]帕兹M.结构动力学——理论与计算[M].北京:地震出版社,1993.
[11]冯贤桂.梁的弯曲变形简单计算方法[J].现代机械,2001,(1):86-88.
[12]蓝铁军.复合材料梁的解析解与有限元解分析研究[J].山西建筑,2010,36(29):59-60.
[13]李旭伟.复合材料梁有限元分析研究[J].科技信息,2012,(26):405-406.
[14]Lee H H.Finite Element Simulations with ANSYS Workbench 14[M].SDC publications,2012.
[15]凌桂龙,丁金滨,温正.ANSYS Workbench 13.0从入门到精通[J].2012.
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