All of the corresponding parts of ΔPTS are congruent to those of ΔRTQ by the indicated markings, the Vertical Angle Theorem and the Alternate Interior Angle theorem.

This means that two sides or angles that are not marked as congruent can be proven to be congruent if they are part of two congruent triangles. This reasoning, when used to prove congruence, is …

Identify congruent figures and corresponding parts. - Analyzing patterns in order to make conjectures regarding future or repeating patterns. Use congruent triangles to plan and write proofs. Prove …

Congruent Polygons – two polygons whose vertices can be paired in such a way so that corresponding parts (angles and sides) of the polygons are congruent.

Lesson 2.1 Congruent Figures. Name corresponding angles and corresponding sides of congruent figures; identify congruent figures (CC.SS.8.G.2) Warm-Up . Given 3x + y = 3, if y = 3 find the value …

Basically, the shapes are identical to each other. When you name congruent polygons, always list corresponding vertices in the same order. Ex. 1) Naming Congruent Parts ∆𝑻𝑱𝑫≅∆𝑹𝑪𝑭. List the congruent …

Find the pairs of congruent triangles and state the reason for congruency. Every triangle has a congruent triangle . Students could accurately draw the triangles that are congruent to practice …

Two shapes are said to be congruent if they are the same shape and size. The shapes may be a reflection of each other, or be rotated or translated. All of the angles and side lengths are the same. …

If two sides and the included angle of one triangle are congruent to the two sides and the included angle of another triangle, then the triangles are congruent.

All of the corresponding parts of ΔPTS are congruent to those of ΔRTQ by the indicated markings, the Vertical Angle Theorem and the Alternate Interior Angle theorem.