Let the ellipse pass through the centre of the circle of radius . Let be the focal distances of the point on the ellipse. Then is equal to
- A
- B
- C
- D
Let the ellipse pass through the centre of the circle of radius . Let be the focal distances of the point on the ellipse. Then is equal to
Correct answer:A
Standard Method
Given: The ellipse is and it passes through the centre of the circle .
Find: The value of .
First, rewrite the circle by completing the square:
Hence, the centre is and the radius is .
Since the ellipse passes through , substitute into :
So the ellipse becomes
which can be written as
Therefore, the semi-axes are and , with major axis along the -axis.
The focal distance satisfies
so
Using the focal distance expressions for the point on this ellipse:
Therefore,
Now compute the required value:
Therefore, the correct option is A.
Using distances from the two foci
Given: lies on the ellipse, and the circle has radius .
Find: .
From the circle,
so .
Substituting in the ellipse gives
Hence,
The foci are
Now the two focal distances are
The extracted solution simplifies these to
and hence
f_1f_2 = \frac{37}{3} $$.Therefore,
So the correct option is A.
A common mistake is completing the square incorrectly for the circle and getting the centre wrong. If is not found as , then both and the final value become incorrect. Always rewrite the circle first in standard form.
Students often identify the wrong major axis of the ellipse. After converting to standard form, compare and carefully. Since is larger, the major axis is along the -axis, not the -axis.
Another mistake is using an incorrect property such as taking the product to be constant for every point on the ellipse. The reliable method here is to use the expressions obtained in the solution and then multiply them carefully.
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