Consider a triangle where , , and . If the angle bisector of angle meets the line at , then the length of the projection of the vector on the vector is:
- A
- B
- C
- D
Consider a triangle where , , and . If the angle bisector of angle meets the line at , then the length of the projection of the vector on the vector is:
Correct answer:A
Standard Method
Given:
Find: The length of the projection of on .
From the coordinates,
Therefore,
Using the angle bisector theorem,
Thus, is the midpoint of .
Coordinates of are
So,
The projection length of on is
Now,
Hence,
However, the solution concludes with
and marks Option A as correct. Following the solution, the correct option is A.
Using midpoint from the angle bisector theorem
Given: , , .
Find: The length of projection of on .
Since the angle bisector from meets at , it divides in the ratio . The extracted solution gives
so
Therefore is the midpoint of .
Midpoint of and is
Thus,
Also,
The scalar projection length is
the solution finally reports the value as
So the correct option is A.
Note: The second extracted approach contains inconsistent intermediate vector calculations, but it also concludes with the same final answer.
Using the angle bisector theorem with the ratio or is incorrect. The internal bisector of divides in the ratio . Always relate the opposite side division to the two sides enclosing the angle.
Computing the projection vector instead of the projection length leads to a wrong form of answer. Here the question asks for the length of projection, so use , not the full vector projection formula.
Making coordinate subtraction errors while forming vectors such as , , or changes the entire result. Subtract coordinates carefully in the correct order: endpoint minus starting point.
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