If the line , where , does not meet the hyperbola , then a possible value of is:
- A
- B
- C
- D
If the line , where , does not meet the hyperbola , then a possible value of is:
Correct answer:D
Standard Method
Given: The line is and the hyperbola is .
Find: A possible value of such that the line does not meet the hyperbola.
Write the hyperbola as
From the line,
Substitute this into :
Multiplying throughout by ,
For the line to not meet the hyperbola, this quadratic in must have no real roots. Therefore, its discriminant must be negative:
Among the given options, the solution states that is the valid possible value. Therefore, the correct option is D.
Answer-source discrepancy note
The solution derives
This inequality is satisfied by but not by . So the algebra shown in the solution points to option C, while the solution's explicitly marks option D and concludes with . Following the solution for extraction, the recorded answer is D, but there is a clear discrepancy between the working and the stated final answer.
Using the condition instead of . That would correspond to two real intersection points. For a line that does not meet the hyperbola, the substituted quadratic must have no real roots, so use a negative discriminant.
Making an algebraic error while expanding . The square must be expanded as . Missing the middle term or mishandling the sign changes the discriminant condition.
Comparing directly with without checking the absolute value. The inequality obtained is , so the correct form is .
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