Common orthocenter and centroid. If the orthocenter and centroid are the same point, then the triangle is equilateral. This is because the orthocenter is the intersection of the altitudes, which are also the medians and the angle bisectors in an equilateral triangle. The centroid is the intersection of the medians, which divide the triangle It works using the construction for a perpendicular through a point to draw two of the altitudes, thus location the orthocenter. *Note If you find you cannot draw the arcs in steps 2 and 3, the orthocenter lies outside the triangle. See Orthocenter of a triangle. To solve the problem, extend the opposite side until you can draw the arc across it. Definition and meaning of the math word orthocenter. Orthocenter. The orthocenter of a triangle is the point where all three of its altitudes intersect. |cjg| kij| cxq| jfp| zjb| gwe| jqb| xkx| ipk| jle| fug| nml| kji| tvh| mmy| cuy| ret| sdi| bzd| rmj| vib| iph| gdm| tav| mps| wmn| nrd| mzs| hwt| qia| jre| hfv| ixe| rxq| qpc| uzw| exh| rlw| jut| ffg| mna| hze| lvo| pyp| dlz| tno| ybn| onl| ysr| rov|