The set of all values of for which where denotes the greatest integer less than or equal to , is equal to:
- A
- B
- C
- D
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The set of all values of for which where denotes the greatest integer less than or equal to , is equal to:
](streamdown:incomplete-link)
Correct answer:B
Standard Method
Given:
Find: the set of all values of .
Using the property of greatest integer function shown in the extracted solution,
So the condition becomes
Hence,
Let
where and . Then
Therefore,
Now consider cases for .
Case I: , so . Then
Thus,
Case II: , so . Then
Thus,
Combining both cases,
The extracted solution concludes this interval, which corresponds to option B in the given options list. There is a discrepancy because the option texts place as A, but the solution explicitly states The Correct Option is B. Therefore, following the solution as authority, the correct option is B.](streamdown:incomplete-link)
Casewise Fractional-Part Analysis
Given:
Find: all possible values of .
Rewrite the expression:
So for the limit to be ,
Hence the extracted working uses
Write
Then
and
Thus,
Given this equals ,
Now can only be or .
If
Assuming the raw option position must be correct. Here the interval appears as option A in the listed options, but the solution declares B. Use the solution working and note the mismatch.
Forgetting to rewrite and correctly. The extracted method uses and for integer shifts. Missing this changes the equation entirely.
Not splitting into integer and fractional parts. Writing with and is essential because determines the two cases. Without this, the interval cannot be derived correctly.
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