<section data-role="outer" class="article135" label="edit by 135editor"><p style="line-height:1.75em">　　在绘制配色模纹之前，应当已知织物的组织图和色经、色纬的排列顺序和排列循环。各种颜色经纱的排列顺序简称为色经排列顺序，色经排列顺序重复一次所需的经纱数称为色经循环。各种颜色纬纱的排列顺序简称为色纬排列顺序，色纬排列顺序重复一次所需的纬纱数称为色纬循环。绘制配色模纹图的步骤和方法如下：</p><p><br></p><p style="line-height:1.75em">　　1．已知条件</p><p><br></p><p style="line-height:1.75em">　　（1）确定组织图：最常用的是平纹组织与斜纹组织，也有用其他较为简单的组织的。</p><p><br></p><p style="line-height:1.75em">　　（2）确定色经排列与色经循环。</p><p><br></p><p style="line-height:1.75em">　　（3）确定色纬排列与色纬循环。2．划出绘图区域 把意匠纸分成四个区，如图5-48所示，这四个区为绘制配色模纹的各部分相应位置。I区为绘制基础组织位置，II区为绘制各色纬的排列循环位置，III区为绘制各色经的排列循环位置，IV区为绘制配色模纹图位置。</p><p style="text-align: center; "><img src="data:image/png;base64,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" alt="" style="width: 200.436px; height: 208.5px;"><br></p><p style="line-height:1.75em">　　3．填绘配色模纹图</p><p><br></p><p style="line-height:1.75em">　　（1）根据组织循环、色经循环和色纬循环，求出配色模纹图的大小。配色模纹的经纱循环等于组织循环经纱数与色经循环的最小公倍数；配色模纹的纬纱循环等于组织循环纬纱数与色纬循环的最小公倍数。</p><p><br></p><p style="line-height:1.75em">　　图5-48 绘制配色模纹图的区域划分（2）在划出的I、II、III区内，分别填入组织图、色经排列循环和色纬排列循环。</p><p><br></p><p style="line-height:1.75em">　　（3）先在IV区内，用浅色画出组织图。根据色经排列顺序，在相应色经的纵行内的经组织点处涂绘上色经的颜色符号。根据色纬排列顺序，在相应色纬的横行内的纬组织点处涂绘色纬的颜色符号。这样色经色纬与组织相结合就构成配色模纹。</p><p><br></p><p style="line-height:1.75em">　　必须说明：在配色模纹图上小方格中的符号，只表示某种色经或色纬浮点所显现的效果，而不是经纬组织点。</p></section>