| 1. | The correct solution must satisfy the compatibility equation .
正确的解必须满足协调方程。 |
| 2. | We have written the compatibility equation in a form that corresponds with the polar geometry .
我们已经把协调方程写成了极坐标的形式。 |
| 3. | Generalized compatibility equations of quasi - conforming element methods
拟协调元广义协调方程的研究 |
| 4. | Equation of strain compatibility
应变协调方程 |
| 5. | Elasticity ; stress function ; beltrami stress compilability equation ; general solution
弹性力学应力函数beltrami应力协调方程通解 |
| 6. | A new method is introduced to derive the general solution of elasticity equations in terms of stresses
将应力协调方程的解带入到平衡方程,给出了应力函数通解的另外一种证明。 |
| 7. | And then , some examples show the problems can be solved by their compatibility equations of deformation and static equations of equilibrium easily
实例证明,将这种方法得到的变形协调方程与静力干衡方程联立可方便地求解拉压超静定问题。 |
| 8. | Thus , based on effect coefficient harmonic resolution and energy optimal resolution equation are established , which is shown by very simple expression
为此,建立了基于影响系数的协调方程和能量最优解析方程,使拉力分布的最优解呈显式表示。 |
| 9. | Different from b , the general solution is obtained by substituting the general solution of stress compatibility equations into equilibrium equations . this solution is identical with b s
其方法与b的将已有的平衡方程通解带入到应力协调方程的方法恰好相反,得到的通解形式和b的结果完全一致。 |
| 10. | The relation between deformation of bar under normal force and node displacement is analyzed and applied to setting up compatibility equations of deformation for statically indeterminate problems
摘要分析了轴向拉压杆件的变形与杆端结点位移之间的关系,并将其应用于拉压超静定问题变形协调方程的建立。 |
