Respuesta :
The orthocenter is the point at which three altitudes drawn from the vertices of a triangle to opposite sides intersect. The circumcenter, centroid, and orthocenter are all collinear.
What is the relationship between the centroid circumcenter and orthocenter?
The circumcenter, centroid, and orthocenter are all collinear.
The centroid separates the line connecting the circumcenter and orthocenter in the proportion of 2 :1
i.e, CSOC = 21.
Where, C-Coordinate of the centroid. O-Coordinate of the orthocenter.
The orthocenter is the point at which three altitudes drawn from the vertices of a triangle to opposite sides intersect. A centroid is the point at which the lines drawn from the midpoints of each side of a triangle intersect at the opposite vertex.
Any triangle's orthocenter, centroid, and circumcenter are collinear. The centroid divides the distance between the orthocenter and the circumcenter in a 2:1 ratio. The line connecting these three points is known as the triangle's Euler line. to represent the ABC triangle's circumcircle.
To learn more about centroid circumcenter refer to:
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