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Orthocenter of a triangle is the point of intersection where all three altitudes of a triangle meet. Learn more about the orthocenter of a triangle, its properties, formula along with solving a few examples.
The orthocenter of a triangle is the point where the perpendicular drawn from the vertices to the opposite sides of the triangle intersect each other. For an acute angle triangle, the orthocenter lies inside the triangle. For the obtuse angle triangle, the orthocenter lies outside the triangle.
The orthocenter of a triangle is the point of intersection of any two of three altitudes of a triangle (the third altitude must intersect at the same spot). You can find where two altitudes of a triangle intersect using these four steps:
The orthocenter of a triangle is the intersection of the triangle's three altitudes. It has several important properties and relations with other parts of the triangle, including its circumcenter, incenter, area, and more.
Welcome to the orthocenter calculator – a tool where you can easily find the orthocenter of any triangle, be it right, obtuse, or acute. If you're uncertain what the orthocenter of a triangle is, we've prepared a nice explanation, as well as an orthocenter definition.
The intersection H of the three altitudes AH_A, BH_B, and CH_C of a triangle is called the orthocenter. The name was invented by Besant and Ferrers in 1865 while walking on a road leading out of Cambridge, England in the direction of London (Satterly 1962).
Orthocenter. Draw a line segment (called the "altitude") at right angles to a side that goes to the opposite corner. Where all three lines intersect is the "orthocenter": Note that sometimes the edges of the triangle have to be extended outside the triangle to draw the altitudes.