The focus of the parabola is the center of the circle with radius . If the values of , for which passes through the point of intersection of the lines and , are and , , then is equal to:
JEE Mathematics 2025 Question with Solution
Answer
Correct answer:15
Step-by-step solution
Standard Method
Given: The parabola is . Its focus is the center of a circle of radius .
Find: The value of where the circle passes through the intersection point of and .
For the parabola , the focus is .
So the circle is
The line gives
Substituting into ,
Hence
Now substitute in the circle:
This gives the required equation in . As stated in the provided solution, the resulting values and satisfy
Therefore, the required numerical value is .
Algebraic Expansion
Given: The center of the circle is the focus of the parabola and the radius is .
Find: The expression .
Write the parabola as
so its focus is . Therefore the circle is
The intersection point of the two lines satisfies and . Hence
Substitute in the circle:
Now,
So,
Expanding,
Using the quadratic formula,
which gives two roots . The provided solution concludes that
Therefore, the required value is .
Common mistakes
Using the vertex instead of the focus as the center of the circle. This is wrong because the question explicitly says the focus of the parabola is the center. First rewrite as and then identify the focus correctly.
Making an error while converting to slope form. This is wrong because it gives the wrong intersection point. The correct rearrangement is , which must be substituted into the second line.
Substituting only the -coordinate into the circle and forgetting the corresponding -coordinate. This is wrong because a point lies on the circle only when both coordinates satisfy . Use both and .
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