数学智力题:需要几个B才能保持平衡?
数学智力题:需要几个B才能保持平衡?需要几个B才能保持平衡?
已知天平1和天平2处于平衡状态,要使天平3也处于平衡状态的话,“?”处需要放上几个B?
http://www.aoshu.com/e/20181022/data:image/png;base64,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
答案:2个B。1个C=3个A,1个B=2个A。
页:
[1]