The set of all values of for which the equation holds is:
- A
- B
- C
- D
The set of all values of for which the equation holds is:
Correct answer:D
Standard Method
Given:
Find: The set of all possible values of .
Convert everything into terms of :
From the working shown, this simplifies to
So,
Now, since , we get
Hence,
Therefore, the range is and the correct option is D.
The solution labels option B, but the computed interval matches option D.
Completing the Square
Given: The expression in is reduced to a polynomial in .
Find: Its maximum and minimum values.
Write
Complete the square inside the bracket:
Therefore,
The squared term is smallest when it is , giving
The squared term is largest when or , so
Thus,
Therefore, the set of all values is .
Using the raw marked answer without checking the interval against the options. The worked range is , which corresponds to D, not B. Always match the derived result with the listed options.
Missing the identity conversion while rewriting in terms of . If and are not expressed carefully, the resulting polynomial becomes incorrect. Rewrite each term systematically before simplifying.
Finding only one endpoint of the range. After completing the square, students often identify the minimum but forget that the squared term also has a maximum on . Both bounds are needed to get the full interval.
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