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Tucker Unit 3
| Question | Answer |
|---|---|
| All angles are acute | Acute Triangle |
| Two sides are congruent | Isosceles Triangle |
| All angles are congruent | Equiangular triangle |
| A segment whose endpoints are a vertex and the midpoint of the opposite side. | Median |
| In a triangle, the point of concurrency of the medians ( This is the point where triangle is balanced..."center of gravity" ) | Centroid |
| Midsegment | |
| The circle is inside the triangle and touches each of the three sides. | Inscribed In |
| All sides are congruent. | Equilateral Triangle |
| One right angle | Right Triangle |
| One obtuse angle | Obtuse Triangle |
| No sides congruent | Scalene Triangle |
| A triangle that is both equilateral and equiangular. | Regular Triangle |
| A line that splits an angle in two congruent angles. | Angle Bisector |
| The perpendicular segment from a vertex to the line containing the opposite side. | Altitude |
| A line that intersects a line to form a right angle and two congruent sides. | Perpendicular Bisector |
| The point of concurrency of the perpendicular bisectors of a triangle. | Circumcenter |
| The point of concurrency of the angle bisectors of a triangle. | Incenter |
| The point of concurrency of the altitudes of a triangle. | Orthocenter |
| The circle is around/on the outside of the triangle and contains the triangle vertices. | Circumscribed about |
| equal distance | Equidistant |
| When 3 or more lines intersect in one point | Concurrent |
| The point at which 3 or more lines that intersect | Point of Concurrency |
Created by:
mustangathlete02
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