The position vectors of the vertices A, B, and C of a triangle are , , and respectively. If is the length of the angle bisector of , then equals:
- A
- B
- C
- D
The position vectors of the vertices A, B, and C of a triangle are , , and respectively. If is the length of the angle bisector of , then equals:
Correct answer:D
Standard Method
Given: The vertices are , , and .
Find: The value of , where is the length of the angle bisector of .
First find the side lengths adjacent to angle :
Since , triangle is isosceles. Therefore, the angle bisector from meets at its midpoint. Hence,
Now compute :
Therefore,
\ell^2=|\vec{AD}|^2=\left(-\frac32\right)^2+\left(\frac92\right)^2=rac94+\frac{81}{4}=rac{90}{4}=rac{45}{2}So,
Therefore, the correct option is D.
Using the angle bisector idea
Given: , , .
Find: for the angle bisector of .
By the angle bisector theorem,
From the side lengths obtained in the solution,
Hence,
so is the midpoint of .
Now use the midpoint formula:
Then,
AD^2=\left(\frac32\right)^2+\left(-\frac92\right)^2=rac94+\frac{81}{4}=rac{45}{2}Therefore,
So the correct answer is , that is, option D.
Assuming the angle bisector theorem must be applied with unequal ratios without first checking whether . Here the triangle is isosceles at , so the bisector goes to the midpoint of . Always compute and first.
Using the wrong midpoint coordinates for by adding coordinates incorrectly. The midpoint of and is , not any other point. Average each coordinate separately.
Making an error while forming from the coordinates of and . The vector is obtained by subtraction, and the squared length uses the squares of all components. Write carefully before taking magnitude.
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