Let the foci and length of the latus rectum of an ellipse , be and , respectively. Then, the square of the eccentricity of the hyperbola equals:
- A
- B
- C
- D
Let the foci and length of the latus rectum of an ellipse , be and , respectively. Then, the square of the eccentricity of the hyperbola equals:
Correct answer:A
Standard Method
Given: The ellipse is with foci and latus rectum length .
Find: The square of the eccentricity of the hyperbola .
For the ellipse, the focal distance is and the length of latus rectum is
Also,
Using ,
Now substitute in :
So,
Since , we have . Substituting,
Hence,
which gives
Factorizing,
So the admissible value is
Therefore,
and hence
For the hyperbola , comparing with the standard form , we get
Therefore, its eccentricity satisfies
Thus, the correct option is A.
Using ellipse relations first
From the solution working,
For the ellipse,
and also
Hence,
Using ,
which leads to
So,
Thus,
Then
For the hyperbola,
Therefore, the square of the eccentricity is .
Using the hyperbola eccentricity formula directly with the ellipse parameters without first identifying that, for , the hyperbola has and . This is wrong because the symbols and in the hyperbola are not in standard-position roles. First compare with standard form, then use .
Taking the root or for the ellipse. This is wrong because an ellipse must satisfy
Misusing the latus rectum formula as instead of for the ellipse with major axis along the -axis. Use the correct relation before substituting into .
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