3-1 to 3-5 Solving Equations
... Isosceles triangles have two legs and a base. The base is the bottom of the triangle. Isosceles triangles also have two base angles and a vertex angle. The base angles are on either side of the base and are congruent. The vertex angle is in between the two congruent sides. ...
... Isosceles triangles have two legs and a base. The base is the bottom of the triangle. Isosceles triangles also have two base angles and a vertex angle. The base angles are on either side of the base and are congruent. The vertex angle is in between the two congruent sides. ...
Triangle Congruence Notes New.notebook
... If two angles and a nonincluded side of a triangle are congruent to the corresponding angles and nonincluded side of another triangle, then the triangles are congruent. ...
... If two angles and a nonincluded side of a triangle are congruent to the corresponding angles and nonincluded side of another triangle, then the triangles are congruent. ...
Congruence Supplementary Packet
... 5. If the two triangles created by folding an isosceles triangle in half are congruent, what does that imply about the “crease line”? (You might be able to make a couple of claims about this line—one claim comes from focusing on the line where it meets the third, non-congruent side of the triang ...
... 5. If the two triangles created by folding an isosceles triangle in half are congruent, what does that imply about the “crease line”? (You might be able to make a couple of claims about this line—one claim comes from focusing on the line where it meets the third, non-congruent side of the triang ...
Chapter 4 - Mater Academy Charter Middle/ High
... • IN ORDER TO PROVE THAT TWO FIGURES ARE CONGRUENT WE NEED TO MAKE SURE THAT ALL SIDES AND ALL ANGLES OF ONE POLYGON ARE EQUAL TO ALL ANGLES AND SIDES OF ANOTHER POLYGON. • IN ORDER TO DO THIS, WE MUST FIRST BE ABLE TO DECIDE WHICH SIDES AND ANGLES ON ONE POLYGON MATCH WITH THE SIDES AND ANGLES ...
... • IN ORDER TO PROVE THAT TWO FIGURES ARE CONGRUENT WE NEED TO MAKE SURE THAT ALL SIDES AND ALL ANGLES OF ONE POLYGON ARE EQUAL TO ALL ANGLES AND SIDES OF ANOTHER POLYGON. • IN ORDER TO DO THIS, WE MUST FIRST BE ABLE TO DECIDE WHICH SIDES AND ANGLES ON ONE POLYGON MATCH WITH THE SIDES AND ANGLES ...
Naming a triangle – using the three vertices of the triangle in any order
... Accelerated Geometry – Sec. 1.5 Notes – Triangles The term “triangle” literally means “three angles”. We define a triangle as a polygon that has three sides. We name a triangle using its three vertices named in any order. Thus, every triangle can be named in 6 different ways … 3 starting points * 2 ...
... Accelerated Geometry – Sec. 1.5 Notes – Triangles The term “triangle” literally means “three angles”. We define a triangle as a polygon that has three sides. We name a triangle using its three vertices named in any order. Thus, every triangle can be named in 6 different ways … 3 starting points * 2 ...
Apollonian network
In combinatorial mathematics, an Apollonian network is an undirected graph formed by a process of recursively subdividing a triangle into three smaller triangles. Apollonian networks may equivalently be defined as the planar 3-trees, the maximal planar chordal graphs, the uniquely 4-colorable planar graphs, and the graphs of stacked polytopes. They are named after Apollonius of Perga, who studied a related circle-packing construction.