Consider ellipse , for . Let be the circle which touches the four chords joining the end points (one on the minor axis and another on the major axis) of the ellipse . If is the radius of the circle , then the value of is:
- A
- B
- C
- D
Consider ellipse , for . Let be the circle which touches the four chords joining the end points (one on the minor axis and another on the major axis) of the ellipse . If is the radius of the circle , then the value of is:
Correct answer:C
Standard Method
Given: the solution states that the correct option is C and concludes that .
Find: The value of .
From the extracted solution text:
Hence,
The solution then writes:
Therefore, according to the solution, the value of is . Hence, the correct option is C.
Note: The intermediate derivation shown in the solution is internally inconsistent, but its stated final conclusion clearly selects option C.
Treating the given conic as a general ellipse without first interpreting its axes correctly. The equation shown is symmetric in and , so misreading major and minor axes leads to an incorrect geometric setup. First identify the actual geometry before writing chord equations.
Using the radius of the ellipse itself instead of the perpendicular distance from the origin to the relevant chord lines. The circle touches the four chords, so its radius must come from the distance to those lines, not from the semi-axis lengths directly.
Summing instead of . The question explicitly asks for , so squaring must be done before applying the summation.
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