abc is an obtuse triangle. which is true about point d? point d can be the orthocenter because it is the…

abc is an obtuse triangle. which is true about point d? point d can be the orthocenter because it is the point of intersection of three segments coming from the vertices of the triangle. point d can be the orthocenter because each vertex angle appears to be bisected. point d cannot be the orthocenter because the orthocenter of an obtuse triangle is located outside the triangle. point d cannot be the orthocenter because the orthocenter of an obtuse triangle is located on the perimeter of the triangle.
Answer
Answer:
C. Point D cannot be the orthocenter because the orthocenter of an obtuse triangle is located outside the triangle.
Explanation:
Step 1: Recall orthocenter properties
The orthocenter is the intersection of a triangle's altitudes.
Step 2: Obtuse triangle orthocenter location
In an obtuse triangle, altitudes extend outside, so the orthocenter lies outside the triangle.
Step 3: Evaluate options
Only the third option correctly states the orthocenter’s location for an obtuse triangle.