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Suppose There Exists , So That for Any

Question 87

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Suppose there exists Suppose there exists , so that for any we can find satisfying and . We may conclude that: A) is the limit of as . B) is not the limit of as . C) The limit of as does not exist. D) The limit of as exists but is not equal to L. E) none of the above. , so that for any Suppose there exists , so that for any we can find satisfying and . We may conclude that: A) is the limit of as . B) is not the limit of as . C) The limit of as does not exist. D) The limit of as exists but is not equal to L. E) none of the above. we can find Suppose there exists , so that for any we can find satisfying and . We may conclude that: A) is the limit of as . B) is not the limit of as . C) The limit of as does not exist. D) The limit of as exists but is not equal to L. E) none of the above. satisfying Suppose there exists , so that for any we can find satisfying and . We may conclude that: A) is the limit of as . B) is not the limit of as . C) The limit of as does not exist. D) The limit of as exists but is not equal to L. E) none of the above. and Suppose there exists , so that for any we can find satisfying and . We may conclude that: A) is the limit of as . B) is not the limit of as . C) The limit of as does not exist. D) The limit of as exists but is not equal to L. E) none of the above. . We may conclude that:


A) Suppose there exists , so that for any we can find satisfying and . We may conclude that: A) is the limit of as . B) is not the limit of as . C) The limit of as does not exist. D) The limit of as exists but is not equal to L. E) none of the above. is the limit of Suppose there exists , so that for any we can find satisfying and . We may conclude that: A) is the limit of as . B) is not the limit of as . C) The limit of as does not exist. D) The limit of as exists but is not equal to L. E) none of the above. as Suppose there exists , so that for any we can find satisfying and . We may conclude that: A) is the limit of as . B) is not the limit of as . C) The limit of as does not exist. D) The limit of as exists but is not equal to L. E) none of the above. .
B) Suppose there exists , so that for any we can find satisfying and . We may conclude that: A) is the limit of as . B) is not the limit of as . C) The limit of as does not exist. D) The limit of as exists but is not equal to L. E) none of the above. is not the limit of Suppose there exists , so that for any we can find satisfying and . We may conclude that: A) is the limit of as . B) is not the limit of as . C) The limit of as does not exist. D) The limit of as exists but is not equal to L. E) none of the above. as Suppose there exists , so that for any we can find satisfying and . We may conclude that: A) is the limit of as . B) is not the limit of as . C) The limit of as does not exist. D) The limit of as exists but is not equal to L. E) none of the above. .
C) The limit of Suppose there exists , so that for any we can find satisfying and . We may conclude that: A) is the limit of as . B) is not the limit of as . C) The limit of as does not exist. D) The limit of as exists but is not equal to L. E) none of the above. as Suppose there exists , so that for any we can find satisfying and . We may conclude that: A) is the limit of as . B) is not the limit of as . C) The limit of as does not exist. D) The limit of as exists but is not equal to L. E) none of the above. does not exist.
D) The limit of Suppose there exists , so that for any we can find satisfying and . We may conclude that: A) is the limit of as . B) is not the limit of as . C) The limit of as does not exist. D) The limit of as exists but is not equal to L. E) none of the above. as Suppose there exists , so that for any we can find satisfying and . We may conclude that: A) is the limit of as . B) is not the limit of as . C) The limit of as does not exist. D) The limit of as exists but is not equal to L. E) none of the above. exists but is not equal to L.
E) none of the above.

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