If is the equation of the chord of the ellipse whose midpoint is , then is equal to:
- A
- B
- C
- D
If is the equation of the chord of the ellipse whose midpoint is , then is equal to:
Correct answer:C
Standard Method
Given: The ellipse is and the midpoint of the chord is .
Find: The value of if the chord is .
For the ellipse , the equation of the chord whose midpoint is is
Here, , , and .
Substituting these values,
So,
Now simplify the right-hand side:
Therefore,
Multiplying throughout by ,
Comparing with , we get
Hence,
Therefore, the correct option is C.
Using the midpoint chord formula
Given: The chord of the ellipse has midpoint .
Find: The value of in .
Using the midpoint form directly,
For the point ,
and
Hence the chord is
Multiplying by ,
So and . Therefore,
Thus, the answer is .
Using the tangent form instead of the chord-with-midpoint form is incorrect because the given point is the midpoint of the chord, not a point of contact. Use or the midpoint chord formula for an ellipse.
Substituting incorrectly into the formula often leads to wrong coefficients. Keep the substitutions as and carefully before simplifying.
Adding and without taking the correct LCM gives an incorrect right-hand side. First convert both fractions to denominator , then add them.
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