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.

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.