SOLVED: The triangle shows various points of concurrency and their corresponding names. Each point of concurrency corresponds to a specific point on the triangle. Match the points of concurrency to th

Incenter, Circumcenter, Orthocenter \u0026 Centroid of a Triangle – Geometry
Incenter, Circumcenter, Orthocenter \u0026 Centroid of a Triangle – Geometry

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The triangle shows various points of concurrency and their corresponding names. Each point of concurrency corresponds to a specific point on the triangle. Match the points of concurrency to their names (6 to 10) (10 matches to (h to 5)) and write the segment.
Points (single letter): A, B, C
Segments (two letters): AB, BC, AC
Centroid, Altitude, Circumcenter, Angle Bisector, Incenter, Extended Side, Midpoint, Median, Orthocenter, Perpendicular Bisector
Write one letter only.

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02:49

Learning task 2: Using the same triangle, QJUG is an equilateral triangle and UN is one of its medians. A. Construct one of the other two medians from vertices J or G. B. Name the congruent triangles. C. Name the angle bisector and perpendicular bisector formed.

03:21

List the names of the segments in the triangle. LIST ALL THAT APPLY.Midsegment, Altitude, Angle Bisector, Median, Perpendicular Bisector

02:12

Find the length and the slope of each side of the triangle below. Then, find the coordinates of the midpoint of each side.

B(h)A(0, 0)C(0, 1)

The length of AB isIts slope is /and its midpoint is /

The length of BC isIts slope is /and its midpoint is /

The length of AC isIts slope is /and its midpoint is /

01:33

Which of the following can intersect outside the triangle? Angle bisectors, altitudes, medians, and sides.

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