1. 首页
  2. 题库
  3. 知到智慧树期末考试答案章节题库2024春-非顺序

工程制图(南昌大学)期末答案和章节题库2024春

所有课程章节/期末均有答案,可提供word版,点击联系客服✅
117 阅读 0 评论

  1. 图样中书写汉字的字体,应为长仿宋体。

    2. 答案:对
  2. 在斜二测图中,物体上所有平行于坐标面的圆,其轴测投影都是类似形。

    3. 答案:错
  3. 剖视图中金属材料的剖面线水平方向成(    )

    4. 答案:45°
  4. 孔与轴的配合为, 这是(      ) 制的间隙配合。

    5. 答案:基轴制
  5. 对称机件都必须采用半剖视图表达。

    6. 答案:错
  6. 零件图中用去除材料的方法获得的表面其符号是: (     )

    7. 答案:[removed]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
  7. 内外螺纹连接时,常采用全剖视图画出,其旋合部分按内螺纹绘制。

    8. 答案:错
  8. 图样中注写圆或圆弧的直径尺寸时应在尺寸数字前加注符号(  )

    9. 答案:Φ
  9. 在装配图中,宽度小于或等于2mm的狭小面积的断面,可用涂黑代表剖面符号

    10. 答案:对
  10. 正等轴测图中,平行于坐标面的圆,如果直径相等,其轴测投影图的形状也相同

    11. 答案:对
  11. 剖视图正确的画法是(     )

    12. 答案:
  12. 斜体字字头向右倾斜15°。
    13. 内容已经隐藏,点击付费后查看
  13. 当直线与某一投影面平行时,在该投影面上的投影反映直线的实际长度。
    14. 内容已经隐藏,点击付费后查看
  14. [removed]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
    15. 内容已经隐藏,点击付费后查看
  15. 圆柱螺旋压缩弹簧不论左旋还是右旋均可画成右旋,对于左旋弹簧要在弹簧标记中注明旋向代号为左。
    16. 内容已经隐藏,点击付费后查看
  16. 局部视图的断裂边界通常用波浪线表示,波浪线不可以省略。
    17. 内容已经隐藏,点击付费后查看
  17. 点A在圆柱表面上,正确的一组视图是(      )
    18. 内容已经隐藏,点击付费后查看
  18. 图块在插入时,可以被缩放或旋转。
    19. 内容已经隐藏,点击付费后查看
  19. 互相啮合的一对齿轮,模数应相同。
    20. 内容已经隐藏,点击付费后查看
  20. [removed]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
    21. 内容已经隐藏,点击付费后查看
  21. [removed]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
    22. 内容已经隐藏,点击付费后查看
  22. 直线EF在平面ABCD上正确的投影是(      )
    23. 内容已经隐藏,点击付费后查看
  23. 标注角度尺寸的尺寸界线应沿径向引出,尺寸线是以角度顶点为圆心的圆弧线。
    24. 内容已经隐藏,点击付费后查看
  24. [removed]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
    25. 内容已经隐藏,点击付费后查看
  25. 点D在△ABC平面上正确的投影是 (  )
    26. 内容已经隐藏,点击付费后查看
  26. 国家标准将配合分为        配合。
    27. 内容已经隐藏,点击付费后查看
  27. 公差带由公差大小和其相对零线的位置确定。
    28. 内容已经隐藏,点击付费后查看
  28. 装配图一般应标注的尺寸包括:
    29. 内容已经隐藏,点击付费后查看
  29. 表面粗糙度高度参数轮廓算术平均偏差Ra的值单位是       。
    30. 内容已经隐藏,点击付费后查看
  30. 根据孔、轴公差带关系,配合分为         三种。
    31. 内容已经隐藏,点击付费后查看
  31. 剖视图正确的画法是       。
    32. 内容已经隐藏,点击付费后查看
  32. 普通螺纹的牙型代号是     。
    33. 内容已经隐藏,点击付费后查看
  33. 移出断面图的轮廓线用粗实线绘制。
    34. 内容已经隐藏,点击付费后查看
  34. 剖视图正确的画法是      。
    35. 内容已经隐藏,点击付费后查看
  35. 剖面线用双点划线绘制。
    36. 内容已经隐藏,点击付费后查看
  36. 圆球表面取点只能用素线法。
    37. 内容已经隐藏,点击付费后查看
  37. 组合体的组合形式有         两种基本形式,或是两种形式的综合。
    38. 内容已经隐藏,点击付费后查看
  38. 点A在圆锥表面上,正确的一组视图是     。
    39. 内容已经隐藏,点击付费后查看
  39. 圆柱的圆投影具有积聚性。
    40. 内容已经隐藏,点击付费后查看
  40. 组合体的三视图正确的是       。
    41. 内容已经隐藏,点击付费后查看
  41. 若两直线的三面投影都相交,则该两直线在空间相交。
    42. 内容已经隐藏,点击付费后查看
  42. 图样中书写汉字的字体,应为长仿宋体,字高不应小于      号字。
    43. 内容已经隐藏,点击付费后查看
  43. 若两直线垂直,其各面投影也必定垂直。
    44. 内容已经隐藏,点击付费后查看
  44. 投影面平行线分为        三种 。
    45. 内容已经隐藏,点击付费后查看
  45. 图样中的粗实线图线宽度为b,细实线的宽度为        。
    46. 内容已经隐藏,点击付费后查看
  46. 点在平面内的条件是:点在该平面内的一条线上。
    47. 内容已经隐藏,点击付费后查看
  47. 在装配图中两零件的接触面只画一条线,不接触面画两条线,所以间隙配合面应画两条线。
    48. 内容已经隐藏,点击付费后查看
  48. 擦除一个实体或一个实体的一部分应使用Erase 命令。
    49. 内容已经隐藏,点击付费后查看
  49. 在系统提示“指定下一点:”时,输入“@50内容已经隐藏,点击付费后查看
    内容已经隐藏,点击付费后查看
  50. 正交模式和极轴追踪不会同时打开。
    51. 内容已经隐藏,点击付费后查看
  51. [removed]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
    52. 内容已经隐藏,点击付费后查看
  52. [removed]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
    53. 内容已经隐藏,点击付费后查看
  53. 在斜二测图中,物体上平行于XOZ坐标面的直线和平面都反映实长和实形。
    54. 内容已经隐藏,点击付费后查看
  54. 关于表面粗糙度参数Ra 12.5,叙述正确的是:(     )
    55. 内容已经隐藏,点击付费后查看
  55. 半剖视图中,半个视图与半个剖视图的分界线应是细点画线。
    56. 内容已经隐藏,点击付费后查看
  56. [removed]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
    57. 内容已经隐藏,点击付费后查看
  57. 绘制同一图样,当某个图形需要不同的比例时,必须按规定另行标注。
    58. 内容已经隐藏,点击付费后查看
  58. 尺寸精度越高,零件的尺寸精确程度就越高,但加工成本也高,因此应在满足使用的前提下,选用较低的公差等级。
    59. 内容已经隐藏,点击付费后查看
  59. 牙型、大径、线数、导程、旋向是确定螺纹的五个要素,五个要素都相同的内外螺纹才能旋合。
    60. 内容已经隐藏,点击付费后查看
  60. 投影面平行线是指平行于某一个投影面,而对另外两个投影面倾斜的直线。
    61. 内容已经隐藏,点击付费后查看
  61. 圆球体穿圆柱孔,正确的投影是(      )
    62. 内容已经隐藏,点击付费后查看
  62. 相贯线都是封闭的空间曲线。
    63. 内容已经隐藏,点击付费后查看
    64. 内容已经隐藏,点击付费后查看
  64. 下图中的尺寸标注正确的是:(     )
    65. 内容已经隐藏,点击付费后查看
  65. [removed]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
    66. 内容已经隐藏,点击付费后查看
  66. 标注组合体尺寸时,一般在长、宽、高方向至少各有一个尺寸基准。
    67. 内容已经隐藏,点击付费后查看
  67. 根据平面的两面投影可以判断平面对投影面的位置关系。
    68. 内容已经隐藏,点击付费后查看
  68. 圆锥被平面截切,正确的投影是(      )
    69. 内容已经隐藏,点击付费后查看
  69. 画组合体视图时应尽可能使形体上的主要表面平行投影面,以使投影能得到实形。
    70. 内容已经隐藏,点击付费后查看
  70. 平行于坐标轴的线段,轴测投影仍平行于相应的轴测轴。
    71. 内容已经隐藏,点击付费后查看
  71. 执ZOOM(缩放)命令,对象的实际尺寸(     )
    72. 内容已经隐藏,点击付费后查看
  72. [removed]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
    73. 内容已经隐藏,点击付费后查看
  73. 图样中的尺寸以(        ) 为单位时,不需标注计量单位的代号或名称。
    74. 内容已经隐藏,点击付费后查看
  74. 组合体是由基本几何体通过叠加和挖切的方式组合而成。
    75. 内容已经隐藏,点击付费后查看
  75. [removed]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
    76. 内容已经隐藏,点击付费后查看
  76. 圆柱被平面截切,正确的投影是 (       )
    77. 内容已经隐藏,点击付费后查看
  77. 确定平面图形尺寸位置的几何元素称为尺寸基准。尺寸基准通常是图形的对称线、较大圆的中心线或较长的直线等。
    78. 内容已经隐藏,点击付费后查看
  78. 为了使投影反映物体表面的真实形状,应该让物体上尽可能多的平面和直线平行或垂直于投影面。
    79. 内容已经隐藏,点击付费后查看
  79. [removed]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
    80. 内容已经隐藏,点击付费后查看
  80. 机件的真实大小以图样上所标注的尺寸数值为准,与图形的大小、比例及绘图的准确度无关。
    81. 内容已经隐藏,点击付费后查看
  81. 截交线都是平面曲线。
    82. 内容已经隐藏,点击付费后查看
  82. 图样中注写圆或圆弧的半径尺寸时应在尺寸数字前加注符号 (   )
    83. 内容已经隐藏,点击付费后查看
  83. 在使用“W”窗口方式选择对象时,   被选中,使用“C”窗口方式选择对象时,(      )图形对象被选中。
    84. 内容已经隐藏,点击付费后查看
  84. 两个形状不同的物体,但在同一投影面上的投影也是不同的。
    85. 内容已经隐藏,点击付费后查看
  85. 断面图的标注与其配置位置无关。
    86. 内容已经隐藏,点击付费后查看
  86. 在V面上所得的投影,反映长和宽。
    87. 内容已经隐藏,点击付费后查看
  87. 圆球的截交线都是圆。
    88. 内容已经隐藏,点击付费后查看
  88. 图样中所注尺寸应为机件的(   ) ,与画图比例和绘图准确性无关。
    89. 内容已经隐藏,点击付费后查看
  89. 两圆柱相交,正确的一组视图是 (      )
    90. 内容已经隐藏,点击付费后查看
  90. 组合体视图中的一个封闭线框,一定是基本体的一个表面。
    91. 内容已经隐藏,点击付费后查看
  91. 一张完整的装配图主要包括以下四个方面的内容:一组图形、(     ) 、技术要求、标题栏、明细栏。
    92. 内容已经隐藏,点击付费后查看
  92. 公差等级用于确定尺寸精确的程度,共分为20个等级,其最高级是1级。
    93. 内容已经隐藏,点击付费后查看
  93. 左旋梯形螺纹,公称直径30,螺距6,导程12,其螺纹代号是(    )
    94. 内容已经隐藏,点击付费后查看
  94. 轴测图中,如果轴向伸缩系数p=q=r=1,且轴间角均为120°时,该轴测图是(       )
    95. 内容已经隐藏,点击付费后查看
  95. 尺寸“C2”中的“C”表示各种倒角。
    96. 内容已经隐藏,点击付费后查看
  96. 回转体的素线都是互相平行的。
    97. 内容已经隐藏,点击付费后查看
  97. [removed]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
    98. 内容已经隐藏,点击付费后查看
  98. 空间两直线平行,则其投影也平行。
    99. 内容已经隐藏,点击付费后查看
  99. 外螺纹的大径用(     ) 符号表示 。
    100. 内容已经隐藏,点击付费后查看
  100. 正四棱台被截切、穿孔,正确的投影是(      )
    101. 内容已经隐藏,点击付费后查看
  101. 圆球被平面截切,正确的投影是(      )
    102. 内容已经隐藏,点击付费后查看
  102. 如果一个平面内有一条直线和另一个平面平行,那么这两个平面平行。
    103. 内容已经隐藏,点击付费后查看
  103. 只需要物体的二个投影就可以确定形状。
    104. 内容已经隐藏,点击付费后查看
  104. 画组合体视图时一般选择反映形状特征最明显、反映形体间相对位置最多的投影方向作为主视图的投影方向。
    105. 内容已经隐藏,点击付费后查看
  105. 任何情况下断面图都只能画出剖切平面与机件接触部分的图形。
    106. 内容已经隐藏,点击付费后查看
  106. 图样中书写的所有字体,都可写成斜体和直体。
    107. 内容已经隐藏,点击付费后查看
  107. 角度尺寸的数字应与尺寸线平行。
    108. 内容已经隐藏,点击付费后查看
  108. 在装配图中同一零件的剖面线方向间隔应一致,不同零件要有区别。
    109. 内容已经隐藏,点击付费后查看
  109. (       )命令用于按指定数量等分一个选定的实体,使之成为等距离的几段。
    110. 内容已经隐藏,点击付费后查看
  110. 自由配置的视图称为向视图。
    111. 内容已经隐藏,点击付费后查看
  111. 正确的内外螺纹旋合画法是(    )
    112. 内容已经隐藏,点击付费后查看
  112. 斜轴测图是用 (      )投影法得到的。
    113. 内容已经隐藏,点击付费后查看
  113. 圆锥的截交线含有三角形。
    114. 内容已经隐藏,点击付费后查看
  114. 圆锥的纬圆直径各不相同。
    115. 内容已经隐藏,点击付费后查看
  115. 两圆柱相交时,相贯线的形状取决于直径的相对大小和轴线的相对位置。
    116. 内容已经隐藏,点击付费后查看
  116. 若物体只有一个方向有圆时,选择斜二测画轴测图更方便。此时,该圆应平行于(      )坐标面 。
    117. 内容已经隐藏,点击付费后查看
  117. 局部视图是将机件的某一部分向基本投影面投射所得的视图。
    118. 内容已经隐藏,点击付费后查看
  118. [removed]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
    119. 内容已经隐藏,点击付费后查看
  119. 绘制机械图样的三种比例是(   )
    120. 内容已经隐藏,点击付费后查看
  120. 投影法分中心投影法和平行投影法。
    121. 内容已经隐藏,点击付费后查看
  121. [removed]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
    122. 内容已经隐藏,点击付费后查看
  122. 特殊情况下,相贯线可能是椭圆。
    123. 内容已经隐藏,点击付费后查看
  123. 下列正等轴测图正确的是(     )
    124. 内容已经隐藏,点击付费后查看
  124. 组合体的尺寸标注正确的是(     )
    125. 内容已经隐藏,点击付费后查看
  125. [removed]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
    126. 内容已经隐藏,点击付费后查看
  126. 内外结构都比较复杂的对称机件可以采用(      )的表示法。
    127. 内容已经隐藏,点击付费后查看
  127. 根据点的二个投影可以求出其第三面投影。
    128. 内容已经隐藏,点击付费后查看
  128. [removed]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
    129. 内容已经隐藏,点击付费后查看
  129. 图纸分基本幅面和加长幅面。
    130. 内容已经隐藏,点击付费后查看
  130. 按照剖切面剖开机件的情况,剖视图可分为(     )
    131. 内容已经隐藏,点击付费后查看
  131. 画组合体视图时视图的选择应使更多结构为不可见。
    132. 内容已经隐藏,点击付费后查看
  132. 立体上互相平行的线段,轴测图上仍互相平行。
    133. 内容已经隐藏,点击付费后查看
  133. 圆柱穿孔,正确的投影是(        )
    134. 内容已经隐藏,点击付费后查看
  134. [removed]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
    135. 内容已经隐藏,点击付费后查看
  135. 下图画法正确的是(     )
    136. 内容已经隐藏,点击付费后查看
  136. 断面图分为移出断面图和重合断面图两种。
    137. 内容已经隐藏,点击付费后查看
  137. 组合体的总体尺寸任何情况下都必须标注。
    138. 内容已经隐藏,点击付费后查看
  138. 轴测图是能同时反映物体三度空间形状的单面投影图。
    139. 内容已经隐藏,点击付费后查看
  139. 机械图样的尺寸组成包括:(    )
    140. 内容已经隐藏,点击付费后查看
  140. 读图时应明确视图中的图线可能是面与面交线的投影或一个面的积聚性投影。
    141. 内容已经隐藏,点击付费后查看
  141. 字体高度h的尺寸系列为 (    )
    142. 内容已经隐藏,点击付费后查看
  142. [removed]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
    143. 内容已经隐藏,点击付费后查看
  143. 平面截切圆锥体,正确的一组视图是 (      )
    144. 内容已经隐藏,点击付费后查看
  144. 圆锥的素线都过锥顶点。
    145. 内容已经隐藏,点击付费后查看
  145. 立体上所有线段的轴测投影其轴向伸缩系数相同。
    146. 内容已经隐藏,点击付费后查看
  146. 纬圆与轴线垂直
    147. 内容已经隐藏,点击付费后查看
  147. 正投影法投射线与投影面垂直。
    148. 内容已经隐藏,点击付费后查看
  148. 尺寸界线应从图形的轮廓线、轴线或对称中心线处引出。不可以用轮廓线、轴线或对称中心线代替。
    149. 内容已经隐藏,点击付费后查看
  149. 根据视图的布置需要,图纸可以横放或竖放。
    150. 内容已经隐藏,点击付费后查看
  150. 尺寸界线用粗实线绘制,尺寸线用细实线绘制。
    151. 内容已经隐藏,点击付费后查看
  151. 剖视图正确的画法是 (      )
    152. 内容已经隐藏,点击付费后查看
  152. 一张图样中的各个图形只能采用相同的比例。
    153. 内容已经隐藏,点击付费后查看
  153. 下列局部剖视图中,正确的画法是(    )
    154. 内容已经隐藏,点击付费后查看
  154. 球与圆柱或圆锥相交,正确的投影是(      )
    155. 内容已经隐藏,点击付费后查看
  155. 在W面上所得的投影,反映高和宽。
    156. 内容已经隐藏,点击付费后查看
  156. 组合体的三视图正确的是(    )
    157. 内容已经隐藏,点击付费后查看
  157. 半球上穿圆柱孔,正确的一组视图是(     )
    158. 内容已经隐藏,点击付费后查看
  158. 加长幅面的幅面图纸沿长边方向按基本幅面的(   )增加。
    159. 内容已经隐藏,点击付费后查看
  159. 标注尺寸的起点称为基准。
    160. 内容已经隐藏,点击付费后查看
  160. 俯视图和左视图靠近主视图的方向为物体的(     )方。
    161. 内容已经隐藏,点击付费后查看
  161. 同轴回转体的相贯线是椭圆。
    162. 内容已经隐藏,点击付费后查看
  162. 通常以组合体的对称平面、重要的底面或端面以及主要回转体的轴线作为尺寸基准。
    163. 内容已经隐藏,点击付费后查看
  163. 垂直于一个投影面的平面称为投影面垂直面。
    164. 内容已经隐藏,点击付费后查看
  164. 基本幅面图纸的大小有 (    )种规格。
    165. 内容已经隐藏,点击付费后查看
  165. 在半剖视图中,半个外形视图和半个剖视图的分界线应画成(     )
    166. 内容已经隐藏,点击付费后查看
  166. 在明细表中填写序号时应由上向下排列,这样便于补充编排序号时被遗漏的零件。
    167. 内容已经隐藏,点击付费后查看
  167. 相贯线是两立体表面的共有线,相贯线上的点是立体表面上的共有点。
    168. 内容已经隐藏,点击付费后查看
  168. 回转体被垂直于轴线的平面截切,断面为圆。
    169. 内容已经隐藏,点击付费后查看
  169. 下列正等轴测图正确的是(    )
    170. 内容已经隐藏,点击付费后查看
  170. 直线通过平面内的一点,则直线在该平面内。
    171. 内容已经隐藏,点击付费后查看
  171. 圆柱体穿圆柱孔,正确的投影是 ()
    172. 内容已经隐藏,点击付费后查看
  172. [removed]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
    173. 内容已经隐藏,点击付费后查看
  173. 基本幅面图纸的宽长尺寸比例是     。
    174. 内容已经隐藏,点击付费后查看
  174. [removed]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
    175. 内容已经隐藏,点击付费后查看
  175. 读组合体视图时应明确视图中的线框和图线所代表的含义。
    176. 内容已经隐藏,点击付费后查看
  176. 轴套类零件的基本形状是同轴回转体,主要在车床上加工。为了便于加工时看图,轴套类零件的主视图一般将轴线水平放置。
    177. 内容已经隐藏,点击付费后查看
  177. 使用Offset(偏移)命令做等距复制时,距离值只能为正,不能为负。
    178. 内容已经隐藏,点击付费后查看
  178. 装配图上要标注配合尺寸。
    179. 内容已经隐藏,点击付费后查看
  179. 两回转面相贯,交线有(       )等。
    180. 内容已经隐藏,点击付费后查看
  180. 截交线是截平面与立体表面的交线。
    181. 内容已经隐藏,点击付费后查看
  181. 基本立体可分为(     ) 两大类
    182. 内容已经隐藏,点击付费后查看
  182. 将机件分别向六个基本投影面投射得到的六个视图称为基本视图。
    183. 内容已经隐藏,点击付费后查看
  183. 组合体应标注定形尺寸、定位尺寸和总体尺寸。
    184. 内容已经隐藏,点击付费后查看
  184. 当直线或平面垂直于投影面时其正投影具有(    )
    185. 内容已经隐藏,点击付费后查看
  185. 平面截切圆柱体其断面形状为:(    )
    186. 内容已经隐藏,点击付费后查看
  186. 尺寸界线一般应超出尺寸线2~3mm。
    187. 内容已经隐藏,点击付费后查看
  187. 机械图样的尺寸组成包括(     )
    188. 内容已经隐藏,点击付费后查看
  188. 已知两圆柱体相交,正确的尺寸标注是(     )
    189. 内容已经隐藏,点击付费后查看
  189. 组合体的三视图错误的是(     )
    190. 内容已经隐藏,点击付费后查看
  190. 用矩形命令不能绘制 (     ) 图形。
    191. 内容已经隐藏,点击付费后查看
  191. 假想将组合体分解成若干个基本体,分析各部分的形状、组合形式及其相对位置关系,这个过程称为形体分析。
    192. 内容已经隐藏,点击付费后查看
  192. 绘制平面图形要根据所给尺寸进行线段分析,分清已知线段、中间线段和连接线段。绘图次序为:(   )
    193. 内容已经隐藏,点击付费后查看
    194. 内容已经隐藏,点击付费后查看
  194. [removed]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
    195. 内容已经隐藏,点击付费后查看
  195. 局部剖视图是剖开机件的一小部分。
    196. 内容已经隐藏,点击付费后查看
  196. 标题栏的位置应位于图纸的右下角。
    197. 内容已经隐藏,点击付费后查看
  197. [removed]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
    198. 内容已经隐藏,点击付费后查看
  198. 根据下列公差带图,可判断出(     )为过渡配合。
    199. 内容已经隐藏,点击付费后查看
  199. [removed]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
    200. 内容已经隐藏,点击付费后查看
  200. 用规定画法绘制轴承,内圈和外圈的剖面线方向要相反。
    201. 内容已经隐藏,点击付费后查看
  201. 正确的键联结画法是(      )
    202. 内容已经隐藏,点击付费后查看
  202. 组合体的三视图正确的是(     )
    203. 内容已经隐藏,点击付费后查看
  203. 正确的螺钉连接画法是(   )
    204. 内容已经隐藏,点击付费后查看
  204. 圆柱、圆锥、圆球表面的截交线都可能是矩形。
    205. 内容已经隐藏,点击付费后查看
  205. 斜体字字头向右倾斜, 与水平线成 (    ) 。
    206. 内容已经隐藏,点击付费后查看
  206. 读图时各视图必须联系起来看。
    207. 内容已经隐藏,点击付费后查看
  207. 组合体的尺寸标注有错误的是(     )
    208. 内容已经隐藏,点击付费后查看
  208. 尺寸线可以用轮廓线、轴线或对称中心线代替。
    209. 内容已经隐藏,点击付费后查看
  209. 机件的每一个尺寸,一般只标注一次,并应标注在反映该结构最清晰的图形上。
    210. 内容已经隐藏,点击付费后查看
  210. 向视图应标注投影方向和视图名称。
    211. 内容已经隐藏,点击付费后查看
  211. 截交线和相贯线是由形成相交线的两对象的形状、大小和相对位置决定的,因此不能对截交线和相贯线标注尺寸。
    212. 内容已经隐藏,点击付费后查看
  212. 两点的相对位置指空间两点的上下、前后、左右位置关系。可以通过两点的相对坐标的大小来判断,两点的前后的位置关系是:y坐标较大的在后,较小的在前。
    213. 内容已经隐藏,点击付费后查看
  213. 如果平面外的一条直线和平面内的一条直线平行,那么这条直线和这个平面平行。
    214. 内容已经隐藏,点击付费后查看
  214. 三视图的投影规律是主、俯视图(      ) ,主、左视图(    ) ,俯、左视图(     )
    215. 内容已经隐藏,点击付费后查看
  215. 执行Break(打断)命令,从圆或圆弧上删除一部分时,系统默认将第一点到第二点之间的逆时针方向的圆弧删除。
    216. 内容已经隐藏,点击付费后查看
  216. 一边平行于某一投影面的直角,其三面投影也是直角。
    217. 内容已经隐藏,点击付费后查看
  217. 标注组合体尺寸的基本要求是: 正确、完整、清晰。
    218. 内容已经隐藏,点击付费后查看
  218. 用矩形命令不能绘制____图形。
    219. 内容已经隐藏,点击付费后查看
  219. 在工作界面打开未显示工具栏的方法是____ 。
    220. 内容已经隐藏,点击付费后查看
  220. 在使用“W”窗口方式选择对象时,____ 被选中,使用“C”窗口方式选择对象时,___ 图形对象被选中。
    221. 内容已经隐藏,点击付费后查看
  221. Pline命令只能画直线,不能画圆弧。
    222. 内容已经隐藏,点击付费后查看
  222. 在装配图中每个零件都需要编一个序号。
    223. 内容已经隐藏,点击付费后查看
  223. 在装配图中,宽度小于或等于2mm的狭小面积的断面,可用涂黑代表断面符号。
    224. 内容已经隐藏,点击付费后查看
  224. 基本偏差确定孔轴配合的松紧程度。
    225. 内容已经隐藏,点击付费后查看
  225. 装配图的特殊表达方法有拆卸画法、假想画法、夸大画法、展开画法、简化画法等。
    226. 内容已经隐藏,点击付费后查看
  226. 1、一张完整的装配图主要包括以下四个方面的内容:一组图形、     、技术要求、标题栏、明细栏。
    227. 内容已经隐藏,点击付费后查看
  227. 零件图至少需要三个视图表达清楚结构。(  )
    228. 内容已经隐藏,点击付费后查看
  228. 孔的基本偏差代号用        表示 。
    229. 内容已经隐藏,点击付费后查看
  229. 在满足使用要求的前提下,表面粗糙度应尽可能选用较大的轮廓参数值。
    230. 内容已经隐藏,点击付费后查看
    231. 内容已经隐藏,点击付费后查看
    232. 内容已经隐藏,点击付费后查看
  232. 零件图是制造和检验零件的主要技术资料。(  )
    233. 内容已经隐藏,点击付费后查看
  233. 零件图的尺寸除了要符合正确、完整、清晰的要求外,还要求     。
    234. 内容已经隐藏,点击付费后查看
  234. 螺纹的的牙型分粗牙与细牙两种。
    235. 内容已经隐藏,点击付费后查看
  235. 螺纹的圆投影图大经画粗实线,小径画细实线。( )
    236. 内容已经隐藏,点击付费后查看
  236. 左旋弹簧和右旋弹簧都可以画成左旋,不需要做任何说明。(  )
    237. 内容已经隐藏,点击付费后查看
  237. 左旋梯形螺纹,公称直径30,螺距6,导程12,其螺纹代号是      。
    238. 内容已经隐藏,点击付费后查看
  238. 外螺纹的大径用     符号表示 。
    239. 内容已经隐藏,点击付费后查看
    240. 内容已经隐藏,点击付费后查看
  240. 有关剖面线的方向正确的是    。
    241. 内容已经隐藏,点击付费后查看
  241. 图示断面的正确画法是
    242. 内容已经隐藏,点击付费后查看
  242. 下列局部剖视图中,正确的画法是
    243. 内容已经隐藏,点击付费后查看
  243. 当剖切平面通过非圆孔时,断面图只能画出剖切平面与机件接触部分的图形。
    244. 内容已经隐藏,点击付费后查看
  244. 机件对称或基本对称可采用半剖视图。
    245. 内容已经隐藏,点击付费后查看
  245. 正等轴测图中,平行于坐标面的圆,如果直径相等,其轴测投影图的形状也相同(    )
    246. 内容已经隐藏,点击付费后查看
  246. 正等轴测图叙述正确的是        。
    247. 内容已经隐藏,点击付费后查看
  247. 轴测图是能同时反映物体三度空间形状的单面投影图。(   )
    248. 内容已经隐藏,点击付费后查看
  248. 若物体只有一个方向有圆时,选择斜二测画轴测图更方便。此时,该圆应平行于             坐标面 。
    249. 内容已经隐藏,点击付费后查看
  249. 轴测图是用          投影法得到的。
    250. 内容已经隐藏,点击付费后查看
  250. 物体上互相平行的线段,其轴测图的投影       。
    251. 内容已经隐藏,点击付费后查看
  251. 轴测图中,如果p=q=r=1,且轴间角均为120°时,该轴测图是             。
    252. 内容已经隐藏,点击付费后查看
  252. 组合体的主视图选择的原则是:        。
    253. 内容已经隐藏,点击付费后查看
  253. 三视图的投影规律是主、左视图
    254. 内容已经隐藏,点击付费后查看
  254. 组合体的组合形式有叠加和切割两种。
    255. 内容已经隐藏,点击付费后查看
  255. 三视图的投影规律是主、俯视图
    256. 内容已经隐藏,点击付费后查看
  256. 下列可以作为组合体尺寸基准的是       。
    257. 内容已经隐藏,点击付费后查看
  257. 三视图的投影规律是俯、左视图            。
    258. 内容已经隐藏,点击付费后查看
  258. 确定组合体各组成部分形状大小的是             尺寸。
    259. 内容已经隐藏,点击付费后查看
  259. 截交线是指平面与立体的交线。
    260. 内容已经隐藏,点击付费后查看
  260. 平面立体有        和         两类
    261. 内容已经隐藏,点击付费后查看
  261. 点A在圆柱表面上,正确的一组视图是           。
    262. 内容已经隐藏,点击付费后查看
  262. 相贯线有        ,      和       等。
    263. 内容已经隐藏,点击付费后查看
  263. ABCD是         面
    264. 内容已经隐藏,点击付费后查看
  264. 当直线与投影面平行时,其投影反映直线的实际长度,这是正投影法的真形性。()
    265. 内容已经隐藏,点击付费后查看
  265. EFGH是           面
    266. 内容已经隐藏,点击付费后查看
  266. KMN是         面
    267. 内容已经隐藏,点击付费后查看
  267. 一边平行于投影面的直角,其投影也是直角。 (  )
    268. 内容已经隐藏,点击付费后查看
  268. 空间两直线平行,则其投影也平行。 (  )
    269. 内容已经隐藏,点击付费后查看
  269. 当直线或平面垂直于投影面时其正投影具有        。
    270. 内容已经隐藏,点击付费后查看
  270. 绘制机械图样的三种比例是          ,           和           。
    271. 内容已经隐藏,点击付费后查看
  271. 图样中的尺寸以         为单位时,不需标注计量单位的代号或名称。
    272. 内容已经隐藏,点击付费后查看
  272. 图样中所注尺寸应为机件的           ,与画图比例和绘图准确性无关。
    273. 内容已经隐藏,点击付费后查看
  273. 图样中注写圆或圆弧的直径尺寸时应在尺寸数字前加注符号           ,注写圆或圆弧的半径尺寸时应在尺寸数字前加注符号          。
    274. 内容已经隐藏,点击付费后查看
  274. 图样中汉字字体的大小,不应小于3.5号字。
    275. 内容已经隐藏,点击付费后查看

温馨提示支付 ¥5.00 元后可查看付费内容,请先翻页预览!
微信支付
点赞(9) dxwkbang
工程制图(南昌大学)章节测试课后答案2024春
工程制图(南昌大学)章节测试课后答案2024春
工程制图(南昌大学)期末答案和章节题库2024春
工程制图(南昌大学)期末答案和章节题库2024春
工程制图(南昌大学)期末考试答案2023春
工程制图(南昌大学)期末考试答案2023春
工程制图(南昌大学)期末答案2023秋
工程制图(南昌大学)期末答案2023秋
工程制图(南昌大学)答案2023秋
工程制图(南昌大学)答案2023秋
工程制图(南昌大学)答案2023
工程制图(南昌大学)答案2023
知到答案工程制图(南昌大学)_智慧树见面课答案2022年
知到答案工程制图(南昌大学)_智慧树见面课答案2022年
工程制图(南昌大学)章节测试课后答案2024秋
工程制图(南昌大学)章节测试课后答案2024秋
返回
顶部