数学智力题:根据数字规律找出问号处的数
数学智力题:根据数字规律找出问号处的数根据下图中前两个图形中数字的规律,确定第三幅图中问号处应该是几?
http://www.aoshu.com/e/20181122/data:image/png;base64,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
答案:第一排两个数相加,然后乘以第二排第一个数,等于第二排第二个数。答案是(2+4)×5=30
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