The absolute difference between the squares of the radii of the two circles passing through the point and touching the lines and , is equal to:
- A
- B
- C
- D
The absolute difference between the squares of the radii of the two circles passing through the point and touching the lines and , is equal to:
Correct answer:A
Standard Method
Given: Two circles pass through the point and touch the lines and .
Find: The absolute difference between the squares of their radii.
The center of a circle tangent to both intersecting lines must lie on an angle bisector of the two lines.
For and , the angle bisectors are obtained from
So the two bisectors are and .
Take the first case where the center is on . Let the center be .
Since the circle touches the line , its radius is the perpendicular distance of from the line:
Hence,
Because the circle passes through , we have
Multiplying by ,
So,
Solving,
Thus,
Casewise Derivation
For ,
For ,
Reject the Other Bisector Quickly
Now check the second bisector . Let the center be .
Then the radius is
Using the condition that the circle passes through ,
This gives
Its discriminant is
which is negative, so there is no real circle with center on .
Therefore only the two circles from are valid, and
So the correct option is A.
Assuming the center can be anywhere in the plane. For a circle tangent to both intersecting lines, the center must lie on an angle bisector. Always find the angle bisectors first.
Using the distance from the center to the point directly as a linear equation instead of equating squared distances. Here, use to avoid sign errors.
Forgetting to test both angle bisectors. One bisector gives the two valid circles, while the other leads to a quadratic with negative discriminant and no real circle.
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