3.8 and 3.9 Points of Concurrency Investigation
3.8 Investigation 1- Angle Bisectors: Use the angle bisector tool to construct all 3 angle bisectors for the triangle. Use your observations to complete the conjecture below.
C-9 Angle Bisector Concurrency Conjecture
The three angle bisectors of a triangle are _________________.
C-10 Perpendicular Bisector Concurrency Conjecture
The three perpendicular bisectors of a triangle are ___________________.
3.8 Investigation 1- Altitudes: use the perpendicular line tool to construct all 3 altitudes for the triangle. Use your observations to complete the conjecture below.
C-11 Altitude Concurrency Conjecture
The 3 altitudes (or the lines containing the altitudes) of a triangle are ____________________.
How are the measures AX, BX, and CX related?
C-12 Circumcenter Conjecture
The circumcenter of a triangle is _____________ from the ____________ of the triangle.
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How are the distances from Y to each of the sides related?
C-13 Incenter Conjecture
The incenter of a triangle is _______________________ from the ______________ of the triangle.
3.9 Investigations
C-14 Median Concurrency Conjecture
The three medians of a triangle are _____________.
AQ is one median of the triangle.
How does point Z split AQ? In other words, how does AZ compare to ZQ?
BR is one median of the triangle.
How does point Z split BR? In other words, how does BZ compare to ZR?
CP is one median of the triangle.
How does Z split CP? In other words, how does CZ compare to ZP?
C-15 Centroid Conjecture
The centroid of a triangle divides each median into two parts so that the distance from the centroid to the vertex is __________ distance from the centroid to the midpoint of the opposite side.