问题描述:
通过 DXF 文件导入的几何模型与原模型进行组装时,经常会存在某些重复的几何对象,导致计算结果异常或错误。请问,如何快速查看、定位这些重复的几何对象呢?如何对重复的几何对象进行合并呢?
解答:
所谓“重复的几何对象”,即具有相同坐标的同一类型的几何对象。如:X、Y、Z坐标相同的节点;起点和终点相同的框架;顶点相同的壳等等。
通常来说,上述“重复的几何对象”无法直接在 SAP2000 中进行绘制或创建,因为程序会根据自动合并容差(默认为 1mm)对重复的几何对象进行自动合并。所以,这些“重复的几何对象”多是由导入模型所致,如 AutoCAD, CIS/2 等等。
使用 编辑 > 显示重复对象 命令可以检查模型中是否存在重复的几何对象,并对其进行快速定位供用户识别。SAP2000 将以不同的颜色标识所有的重复对象,以便用户进行删除或合并操作。如下图所示:
使用 编辑 > 合并重复对象 命令可以合并重复对象使其成为一个几何对象,具体操作如下:
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选择需要合并的对象。注意:拟合并的对象必须是相同的几何类型,即节点与节点合并,框架与框架合并等等。
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点击 编辑 > 合并重复对象 命令打开相应的对话框,如下图所示:
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根据需要选择合适的合并选项,主要包括:
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)
以上的方法和操作步骤适用于各种方式的模型组装,如常见的 DXF 文件导入、s2k 文件导入等。建议用户在导入模型后,应及时使用 编辑 > 显示重复对象 命令检查模型中是否存在重复的几何对象,在了解模型几何的基本情况后考虑是否需要进一步的处理(删除或合并)。