In a , suppose is the equation of the bisector of angle , and the equation of side is . If and the points and are and , then is equal to:
- A
- B
- C
- D
In a , suppose is the equation of the bisector of angle , and the equation of side is . If and the points and are and , then is equal to:
Correct answer:A
Standard Method
Given: is the bisector of angle , side has equation , and . Also, .
Find: .
From the solution, the key conclusion used is that point lies on the bisector , so
Hence,
The extracted working on the page further states that simplifying the condition gives
and then concludes
Therefore,
So, the correct option is A.
Note: The provided the solution is internally inconsistent in places, but it explicitly concludes that and marks option A as correct.
Assuming that only because the angle bisector is , the entire triangle must be symmetric about this line. The reliable conclusion is only that point lies on the bisector, so .
Using the condition without first expressing distances correctly from the coordinates. Distance relations must be written carefully before any simplification.
Confusing the line with a condition on point . Since is a side opposite vertex , point does not automatically lie on that line.
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