数学智力题:数字幻方
数学智力题:数字幻方第一个:把1~9几个数字,填在一个横三格竖三格的框架里,要求每一行和每一列的各数之和相同。
第二题,将1~16几个数字分别填在一个横四格竖四格的框架中,要求和上面一题一样,该如何来填。你能想出答案吗?
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
答案:第一题:上面三格从左到右依次为4,9,2;中间三格为3,5,7;下面三格为8,1,6。第二题:上面四格从左到右依次为15,10,5,4;中间四格为6,3,16,9;接下来的四格为12,13,2,7;最后四格为1,8,11,14。
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