Welcome! To clarify the problem, I suggest rewriting it as: "Consider (a+b/c)*(e+d) where a, b,c,d,e are distinct integers from 1-9. What is the minimum integer value we can obtain from the expression above? In addition, justify your answer by showing why there is no smaller integer answer. " If my suggestion is correct, the answer should be 3 with (1) a+b = 4, c=8, and e+d = 6; or (2) a+b = 3, c=9, and e+d = 9; or (3) a+b = 3, c=7, and e+d = 7; or ...... 本贴由[yinyin]最后编辑于:2007-5-30 2:51:36 |
The reason for the answer being 3 is: (a+b)*(d+e) is at least 21. If it can be exactly divided by an integer between 1 and 9, the quotient is at least 3. |
I think you made a mistake in understanding of this question. The question is (a +b/c), it is not (a+b)/c. So the answer is not 3. |
Sorry for my misunderstanding! If the dot in the expression is the multiplication operator, then the minimun value of the expression is 15, which is reached by (1+8/4)*(2+3) or (3+8/4)*(1+2). |
(2+4/8)*(1+3) =10 |
(4+3/9)*(1+2)=13 (3+4/6)*(1+2)=11 (2+4/8)*(1+3)=10 (1+4/5)*(2+3)=9 Seems 9 is the minimum integer. |
(1+3/9)*(2+4)=8. |
Finally, you got the right answer. But you know what the average time to do this question is only 80 seconds. |
一群大笨蛋,就楼主聪明!但要琢磨楼主的英文,恐怕80秒还不够. |
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