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05 Oct 2020, 03:00
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Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
65%
(hard)
Question Stats:
44% (01:19) correct
56%
(01:21)
wrong
based on 34
sessions
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If Z is an infinite sequence of distinct positive real numbers, is there a number in sequence Z that is greater than every other number in Z?
(1) Every number in Z is divisible by 5.
(2) Every number in Z is a negative multiple of a prime number.
Are You Up For the Challenge: 700 Level Questions
(1) Every number in Z is divisible by 5.
(2) Every number in Z is a negative multiple of a prime number.
Are You Up For the Challenge: 700 Level Questions
If Z is an infinite subset of real numbers, is there a number in Z that is greater than every other number in Z?
1. Every number in Z is divisible by 5.
2. Every number in Z is a negative multiple of a prime number.
1. Every number in Z is divisible by 5.
2. Every number in Z is a negative multiple of a prime number.
Archived Topic
Hi there,
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08 Oct 2020, 05:14
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Bunuel
There is something wrong with the question (see highlights).
If you know the sequence contains only distinct positive integers (which is something the question would absolutely need to say from the outset, if it's later going to talk about divisibility -- the concept of divisibility is defined differently for non-integers, so it's not clear what Statement 1 even means if you don't know the sequence contains integers), then the answer is D, since there could not possibly be a unique largest number in the sequence (if there were, there could only be a finite number of things in the sequence). In fact, you wouldn't even need any of the Statements in that case. As written though, I have no idea how to answer the question.
Archived Topic
Hi there,
This topic has been closed and archived due to inactivity or violation of community quality standards. No more replies are possible here.
Where to now? Join ongoing discussions on thousands of quality questions in our Data Sufficiency (DS) Forum
Still interested in this question? Check out the "Best Topics" block above for a better discussion on this exact question, as well as several more related questions.
Thank you for understanding, and happy exploring!
