[求助]MATH D.S.

If S an infinite set of real numbers, is there a numver in S that is less than every other number? 1)every number is a interger 2)every number is positive
Could anyone help me? I've chosen E as a correct answer. The examples are 222222~this kind of set of numbers and 123456~this kind of set of numbers. But the correct answer is C. I dont't know why![em08]

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孤注一掷发表于 2003-1-20 23:43 | 只看该作者

According to the 2 condidtions, the numbers in the set S are positive integers, and now you should be able to tell the smallest number is 1. So choice C is correct.

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chenwu77发表于 2003-1-21 01:14 | 只看该作者

can we have same number twice in this set?

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yahoo750发表于 2003-1-21 12:08 | 只看该作者

Thank you. In the set S for example 222222~,the answer is no, but in set S for example 12345~,the answer is yes. So there isn't a universal answer to the question. I also take for granted the E is the correct answer. Could you give me more concrete explanation, please!

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