Match the following terms with their charactristics (Use your reference chart)(4 points) Intersection of the angle bisectors. It is always inside the triangle. It is equidistant to the sides of the triangle. Intersection of the altitudes. Can be inside, on, or outside of the triangle. Intersection of the medians. It is always inside of the triangle. Intersection of the perpendicular bisectors. Can be inside, on, or outside of the triangle. It is equidistant from the vertices. Centroid Intersection of the angle bisectors. It is always inside the triangle. It is equidistant to the sides of the triangle. – Centroid Intersection of the altitudes. Can be inside, on, or outside of the triangle. – Centroid Intersection of the medians. It is always inside of the triangle. – Centroid Intersection of the perpendicular bisectors. Can be inside, on, or outside of the triangle. It is equidistant from the vertices. – Centroid Orthocenter Intersection of the angle bisectors. It is always inside the triangle. It is equidistant to the sides of the triangle. – Orthocenter Intersection of the altitudes. Can be inside, on, or outside of the triangle. – Orthocenter Intersection of the medians. It is always inside of the triangle. – Orthocenter Intersection of the perpendicular bisectors. Can be inside, on, or outside of the triangle. It is equidistant from the vertices. – Orthocenter Circumcenter Intersection of the angle bisectors. It is always inside the triangle. It is equidistant to the sides of the triangle. – Circumcenter Intersection of the altitudes. Can be inside, on, or outside of the triangle. – Circumcenter Intersection of the medians. It is always inside of the triangle. – Circumcenter Intersection of the perpendicular bisectors. Can be inside, on, or outside of the triangle. It is equidistant from the vertices. – Circumcenter Incenter Intersection of the angle bisectors. It is always inside the triangle. It is equidistant to the sides of the triangle. – Incenter Intersection of the altitudes. Can be inside, on, or outside of the triangle. – Incenter Intersection of the medians. It is always inside of the triangle. – Incenter Intersection of the perpendicular bisectors. Can be inside, on, or outside of the triangle. It is equidistant from the vertices. – Incenter Skip to navigation
I apologize, but I am unable to reference a chart.
just type out all the 2 that match
The two matches are:
1- Intersection of the angle bisectors and Incenter
2- Intersection of the perpendicular bisectors and Circumcenter