2017辽宁公务员考试:判断推理——“拼”和“接”
图形推理的题量相对来说是比较固定的,每年考察10道题,其中有几个部分具有明显的江苏特色,主要体现在拼接题目中。这一类题目是省考的“保留曲目”,虽然题量不多,但是知识点比较新颖,国考中是很少考察的,如下题:
【例题】
右边四个图形中,只有一个是由左边的四个图形拼合而成的,请把它找出来。
http://ln2.zhimantian.com/gwy/ziliao/xingce/2016/1117/data:image/png;base64,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
【解析】
此类题目看上去很难,但是实际上却是图形推理中最简单的一类题目,如果考生无法凭借肉眼找出右侧到底哪一个才是正确选项,则完全可以通过灵活的双手撕出一个正解。当然,在这里中公教育专家会告诉大家一个比较简单的方法,可以帮助大家简单、快速、直接地找到正确的选项。
方法的核心:一、斜率,二、轮廓,三、长度。
所谓斜率,大家可以理解为直线倾斜的角度,如上题中左侧第一个图形为倒三角型,大家可以看到倒三角形的底边与题目所给的框架有一个比较明显的倾斜角度,而第四个图形的三角形底边也与题目所给的框架有个明显的倾斜角度,我们就可以通过这样的观察最终找到正确的选项。因为四个已知的图形是原图形经过切割后摆到左侧的,而且是不发生翻转旋转以及顺序和大小的变化的,这也就意味着已知的四个图形中的第一个图形要么是完整图形中的最上面,要么是最左面,而第四个图形要么是完整图形中的最下面,要么是最右面。这样,我们就可以大体通过斜率和外形判断出完整图形的上左下右的轮廓。如上题所示,题干中已知的第一个和第四个图形可能就是所要找的完整图形中上面以及下面,同时观察四个选项大体的轮廓,可知应该为D,拼接如下。
http://ln2.zhimantian.com/gwy/ziliao/xingce/2016/1117/data:image/png;base64,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
除了这个方法之外,大家也可以先观察每两个相邻图形斜率一样,长度相同的两条边,然后将两个图形画在一起,以此类推,这样也是可以最终找到正确选项的,如下图:
http://ln2.zhimantian.com/gwy/ziliao/xingce/2016/1117/data:image/png;base64,iVBORw0KGgoAAAANSUhEUgAAAQkAAABaCAIAAAAkZzTeAAANp0lEQVR4nO3df1DT9R8H8HWdVxGj7IY1gXMYMJAfAhsb4HHLWoin5ppgCwWSOwREQ3TmJWY4IkInUmpIHZKTcVwSUVwJ7SAhEDQRwwjBIUOBSyFk49cNhM/3j92Xg+3DGNvnw369Hv/x2Wef9/v9utcT2Pb5fEZAAABoCMaeAAAmCrIBADrIBgDoIBsAoINsAIAOsgEAOsgGAOggGwCgg2wAgA6yAQA6yAYA6CAbAKCDbACADrIBADrIBgDoIBsAoINsAIAOsgEAOsgGMHUDAwN9cz148CA6Ovqdd955//33RSJRT08PHuOacTaMVTJTYKlrz8nJOTZXamoqmUx+cS4ikRgeHh4bG7tq1aply5Z1dXXhMRnzyIZJlWyJWcDaR0ZGSjT4+/s7zOXo6Ojr60ufi8lkSiSSW3Pdvn1bdeSzZ88uW7bMAv9umGnJMGEZa2/T8OOPP67T4Ofnt0LDqVOnLs1VWFg4PT2t49BPnjypra0NDg7mcDgKhQKP1eGSDcsumXaWvfbTp09/9NFHBw4cSEhI4HK5NhpcXFwOajh//vxTDQbORKlUhoaGNjY2Hj9+HJOlacImG1ZVMjVWtfbS0lICgUAikd599909e/Z0aRgYGMBp6NkqKiqOHTsWFRWFIMihQ4dwGgWbbFhVydRY29orKysDAwNramrwG2JBTU1NNBptZGRkYmLis88+w2kUzP6nsp6SabK2tdfW1m7fvj0yMhLXUVBNTk62t7dTKJSysjIEQUpLS8fHx3EaC8vXG1ZSMlRWuHYej/fee+8twUCz/fTTTzExMW+//bbqx+LiYvzGwv61uMWXTAtrWzuPx4uMjDT8lZKOHj58GBAQ0N7ePrMlJiZG9/cqFguX96ksu2TaWdvaP/jgAy6Xe+XKFbwHEolELBbr888/n72RTCbjNyJen29YcMkWZG1rr66udnFxqaiowG8IpVLJZDJbW1ufPHkys3FsbMzR0RG/QXH87M9SS6YLa1v79evXnZ2d8ft1wOFwUlNT//7779kbMzIyaDQaTiMieH8ubpEl05G1rf3GjRtubm4XL16cmJjA9shyuTwlJeXw4cNq2z/++GMGg4HtWLPhfs6I5ZVMd9a29tu3b8fHx4eFhSmVSgwPK5PJUD/mz8jIcHd3x3AgNUtxPpWFlWxRrHDtycnJbDZ7bGwMk6M1NDRkZmY2NDSobR8eHmaz2bie/bB05xpaTMn0YG1r379/P5vN1pyhHlJTUzkcjub2np6eZ599ViqVGj7EfJb0PFzLKJl+rG3tfD5/xYoVYrFY7yMolcrOzk4GgyGXyzUfffz4sY2Nza1btwyY4wKW+hx1CyiZ3qxt7W1tbZ6enhcuXNDv6QqFgkajFRQUoD7a2dm5fPnylpYW/ee3ECNcv2HuJTOEta39/v377u7u+fn5i33in3/+GRwcrOX3yObNm3ft2mXY7BZgnGubzLpkBrK2tXd1dfn4+LDZbNS/dfNJTk7u6OjQskNERMS2bdsMnp02Rrvuz3xLZjhrW/vExMThw4dFItHjx48X3Hl6evrrr79OSkrq6+ubb58HDx74+fkVFhZiOk11xrwmViaTJSYmBgcHm1fJMGGm7aKfkpKS5557ztPTUywWP3r0SPvOUqm0oqLim2++0bJPVVWVjY0N3ietGf9eCllZWTQazYxKhgkzbRc9dHd3k8nk7777rre3193d/eLFi7W1tfPtrFAoJicnd+/erf2Y9fX1tra2Q0NDWE92DuNnA0GQzMxMBoNhLiUznPm2y2IplUoHBwcWi6WamFQqpVKpIpEoOzsbdf/c3NycnJy6ujrth5VIJPb29ov6j1QPJpENBEGys7OJRKJZlMxAZt0ui3XixIk1a9bMTmxbW9vatWt3796tGeNbt251d3cfPXp0wXPsAwMD09LS8D4V31SygSBIT09PYGBgenq62nZTK5mBzLpdFuXs2bMEAqGkpERtu1QqXb9+/RtvvKF2JX1ra2tUVNTs04rns3LlyvPnz2M5VzQmlA0EQYaGhgICAtQudza1khnC3NtFdwqFwt7e/osvvphvB4FAwGAwhoaGuru7EQRJSUk5duxYTk6OLgdPT09nMpmYzXUeppUNBEEGBgZYLFZwcLDJlkxvFtAuuqPT6QEBAdr3SUtLYzKZcrm8oKDgv//+W9Snli0tLQQCQXWJPE5MLhsIggwODn744YcsFss0S6Y3C2gXHZWXlzs6OqpdW4JqcnJy48aNDx8+1PIrYz5xcXGrVq3SZ366McVsqFy+fPmFF14wwZLpR/d2OXnypMm2iy5++eUXAoHQ3Ny84J5isZhKpUZFReXl5UkkkuXLl6enp+fm5ra1tek4VkdHx7lz5wyb77xMNxsTExP79+9/8803Ta1ketC9XRAEkclkfn5+fD7fTNdOoVCio6MX3I3P51MolAsXLsTGxlIolNdff93T0zMtLe3atWt3797dunVrXV3dtWvXFjzOK6+88s8//2AxcXWmmw2V6enpiooKJpPp7Ozs5uZmCiXTg47tgiBIVVWVq6vrjh075HK52a19ampq165dsbGx2ndrbGwMDQ3lcrmjo6MzN7zr6urKzMxks9m2trZOTk7h4eH5+fn9/f0KhYLL5Wr5eHTDhg3Ozs7//vsvlitBEMT0szHb1atXk5KSiESinZ3dxo0bjVWyRdGxXRAEGR8fj4iIIJPJqPdHNIu1C4VCJycn7fvU1dW5u7vHx8cnJSVp3ux9enp6YGDg+vXrPB6PTqcTiURnZ2eBQHDlypW9e/cKBII//vhD7Smjo6MEAuHo0aNYrgRBEPPKhsrg4GB/f//evXt5PJ6tre3Sl2xRdGmXoaGhU6dOkUgk1HaZzZTX3traSqVSf/755/l2mJqaioyMpFAo1dXVurxhMDQ0dOPGjdLS0rVr11KpVCcnJz8/v7KyspaWlnXr1pWVlc0cpLi4+Pnnnz9x4gRmi0EQxByzMdvNmze3bNni6+vr5ubm6Oi4NCXT3YLtgiBIU1PT+vXr3d3dF/v+kkmtva+vz8HBobS0dL4dZDIZl8vduXNnU1OTHse/f/9+fn7+yZMn7e3tXVxc2Gw2h8Npa2vr7+8/c+ZMX1/fwYMHn3nmGS3nYurBvLMxo7W1taCgQCAQkEgkEonEZDLxK5mOFmyX8fHx7OzsF1980cAONoW18/n84ODg+R4tLy9/6aWXEhISZDKZ4WPduXMnPj4+OjqaQCB4eHi0t7dLpdKqqqqIiAhd/nfVnYVkQ9PY2BhOJdOR9nbp7Oz09PRkMBiYtIuaJV57eXl5UFDQ8PCw5kNyuVwoFPr4+NTX12PydTlisfjIkSMeHh5eXl5btmyprq4eHBw0/LCoLDYbxqWlXRAESU5OXr169bfffmuUb5bC1uDgIJ1Or6+v13xoeHiYxWJRqVQDb+9w8+ZNoVDo6+vr4+Pj6Oi4devWsrIyXO8ZqQLZwJ6WdqmrqwsJCeFwOL/99tvSTwxzcrk8MDAwIyND7RzH8fHxvLw8Go0mEAj0OOzo6Ojg4GBRURGPx9u0aZOtrW1ISIhAIDhz5gxGE9cJZANjWtrlyJEjPj4+ycnJxpob5r7//vusrCzNjUKh0Nvb+/Tp04s9YE1NTVZWFpVKJRKJPj4+XC533759jx49mpycxGjKiwDZwNh87UIikfz9/bVcw2R2xGJxSEjI7C2jo6N9fX2+vr5MJlP3b3Lr6OiorKwMCgpSfcS5Zs2awsLCuro6Xa4WxhVkA0uo7RIaGurv73/58mVjzQoPT58+3bBhw8wXNyMIcu7cuebmZhqNdvz48f7+fu1Pl8vl9+7d2759e2hoqKur68svvywQCHJzc03nVAYEsoEh1HYJDAxMTEw0kXsNYuXp06c7duyY+fxeKpUePHiQz+fb2toWFRVpeeLw8PAnn3xy6NAhLy8vIpG4c+fOuLi46urq0dHRJZn44kA2sIHaLnQ6/csvvzTuxPBQW1u7Z88e1QuqysrK1tbWhISEsLCwu3fvou5fXFxcVFS0bt06MpnMZDKDgoIuXbqk+9mTxgLZwIZau3h5eb311lvzvYdr1q5evfrpp58i/7/MprGxcfXq1RwOR+17FJqbm5ubm8PDw/39/R0cHFauXJmRkaH9FAFTA9nAgFq72NnZ/fDDD8aeFF54PJ5EIsnMzHzttddSUlKoVOrMDbDlcnlJSUlMTAyHw7GxsbGxsYmLixMKhVNTU8ads34gGxiY3S7btm0ztZt9YGV6erqkpCQnJycmJmZqaioxMXHTpk0NDQ137tz56quvDhw4YGdn5+XltXnz5vj4+N7e3t7eXmNP2SCQDYPMbhc6nf7rr7+a6e9IXYjF4ldffdXNzU0ikXh5eTEYDJFI5Ovr6+rq6urqGhYW9vvvvxvl1DWcQDYMMtMulvSJHqr+/n5vb28PDw/VNYwEAkH1wjonJ+evv/4y9uxwAdnQ30y73Lt3z9hzwZdMJqPT6VlZWSMjI97e3vv27aupqVHdcNHYU8MRZENPs9vF2HPBl1KpzMvLq6qqUv2ouj+QNYBs6EOtXYBFgmwAgA6yAQA6yAYA6CAbAKCDbACADrIBADrIBgDoIBsAoINsAIAOsgEAOsgGAOggGwCgg2wAgA6yAQA6yAYA6CAbAKCDbACADrIBALr/AQ5oPC8Q5KwZAAAAAElFTkSuQmCC
辽宁公务员网建议大家对这类题目要静心观察,一定能找到切入点,从而选出正确选项,而并不用费力撕演算纸。此类题目对考生们的要求是能够30秒之内做完,正确率达到100%,所以各位考生在应用方法的同时要进行大量练习,方法才是王道。更多精彩内容欢迎登陆:
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