Let the area of a triangle with vertices , , and be square units. If its orthocenter and centroid are and respectively, then is equal to:
- A
- B
- C
- D
Let the area of a triangle with vertices , , and be square units. If its orthocenter and centroid are and respectively, then is equal to:
Correct answer:B
Standard Method
Given: , , , area of square units, orthocenter , and centroid .
Find: .
Using the area formula for triangle :
So,
Hence,
Therefore,
Using orthocenter and centroid
Since and both have , the side is horizontal. Therefore the altitude from is vertical, so its equation is
The orthocenter lies on every altitude, and given orthocenter is , we get
Now the centroid of triangle is
Substituting ,
Case 1:
Thus,
Case 2:
Then,
The solution states that checking the orthocenter condition gives a contradiction, so this case is invalid.
Therefore, the correct value is and the correct option is B.
Using the area formula incorrectly by mishandling signs is a common mistake. Here must be expanded carefully. A sign error gives wrong values of . Expand each term step by step before simplifying.
Assuming the centroid formula without substituting the correct vertex coordinates can lead to errors. The centroid is the average of the three vertices, so use and exactly.
Ignoring the geometry of the orthocenter is incorrect. Since is horizontal, the altitude from is vertical, so the orthocenter must satisfy . Use this to get from the orthocenter coordinate.
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