The vertices B and C of a triangle ABC lie on the line . The coordinates of A and B are and respectively and C is at a distance of units from B. The area (in sq. units) of is:
- A
- B
- C
- D
The vertices B and C of a triangle ABC lie on the line . The coordinates of A and B are and respectively and C is at a distance of units from B. The area (in sq. units) of is:
Correct answer:C
Standard Method
Given: B and C lie on the line , point A is , point B is , and .
Find: The area of .
The area of a triangle in dimensions can be found using
Here, is the base and the height is the perpendicular distance from vertex to the line containing .
Rewrite the line information to identify its direction vector. From
the direction vector is
Now,
Using the perpendicular distance formula,
Compute the cross product:
Hence,
and
Therefore,
Now the area is
According to the provided solution, after simplifying for the given coordinates, the value results in .
Therefore, the area of the triangle is sq. units, so the correct option is C.
Geometric Interpretation
Given: The side lies along the given line, and is the fixed point .
Find: The area of .
Use as the base. Since lies on the same line as , the base has fixed length and its direction is the same as the line direction vector .
So the required height is the perpendicular distance from point to the line through in direction . That distance is obtained by
The computed quantities from the solution are
Thus,
Now apply
The provided solution concludes that this simplifies to .
Therefore, the correct option is C.
Taking the direction vector of the line incorrectly from . The middle term gives , so the -component is negative. Use direction vector , not .
Using or inconsistently in the cross product and then changing signs incorrectly. The magnitude is what matters for distance, so keep one vector definition throughout and compute the determinant carefully.
Treating as the height instead of the base. The statement says C is at a distance of units from B, so is the base length. The height is the perpendicular distance from to the line containing .
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