The equation of the chord of the ellipse , whose mid-point is is:
- A
- B
- C
- D
The equation of the chord of the ellipse , whose mid-point is is:
Correct answer:C
Standard Method
Given: The ellipse is and the midpoint of the chord is .
Find: The equation of the chord.
For the ellipse , the equation of the chord whose midpoint is is obtained by using the midpoint form:
where
and
Now substitute and :
Multiplying by ,
Therefore, the equation of the chord is . So the defensible correct option from the given choices is D. The solution also contains a conflicting final selection of C, but the midpoint formula working gives D.
Checking the midpoint condition directly
Given: The midpoint is .
Find: Which option can represent a chord with this midpoint.
A chord with midpoint must have its midpoint lying on the line itself. So substitute and into the options.
For option C:
So option C passes through .
For option D:
So option D also passes through .
Hence passing through the midpoint alone is not sufficient. The correct chord equation must satisfy the standard midpoint formula for the ellipse, which gives
Therefore, the mathematically consistent answer is D, while the solution's marks C. This discrepancy should be noted.
Using the tangent form instead of the chord with midpoint form is incorrect. A tangent touches the ellipse at one point, whereas this question asks for a chord with a given midpoint. Use the midpoint formula for conics.
Substituting the midpoint into directly is wrong because is not on the ellipse. First compute at the midpoint, then use .
Assuming that any line passing through the midpoint is the required chord is incorrect. The midpoint condition alone does not determine the chord. The line must also satisfy the ellipse chord relation.
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