# which fact is not used to prove that xyz is similar to vyw?

**Which fact is not used to prove that PQR is similar to STR?** – Which fact is not used to prove that PQR is similar to STR? Angle P is congruent to itself due to the reflexive property. Which fact is not used to prove that ABC is similar to DBE?

**Which triangle is similar to XYZ?** – ∆XYZ is similar to ∆PQR. We write ∆XYZ ∼ ∆PQR (the symbol ‘∼’ means ‘similar to’.) Corrosponding Sides: Sides opposite to equal angles in similar triangles are known as corresponding sides and they are proportional.

**What condition would prove JKL XYZ?** – If all three sides of a triangle are congruent to all three sides of another triangle, then those two triangles are congruent. If JK XY , KL YZ, and JL XZ, then JKL XYZ.

**Is ABC similar or congruent to XYZ?** – Triangle ABC is congruent to traingle XYZ. It means its corresponding parts are equal.

**How can a criterion be used to show that Pqr XYZ?** – 1. SAS criterion of similarity: If two triangles have an angle of one equal to an angle of the other and the sides including them are proportional, the triangles are similar. In ∆XYZ and ∆PQR, if ∠Y = ∠Q and XYPQ = YZQR then ∆XYZ ∼ ∆PQR.

**Which of the following explains how Δaeb could be proven similar to Δdec using the AA similarity postulate?** – Which of the following explains how ΔAEI could be proven similar to ΔDEH using the AA similarity postulate? ∠AEI ≅ ∠DEH because vertical angles are congruent; rotate ΔHED 180° around point E, then translate point D to point A to confirm ∠IAE ≅ ∠HDE.

**What additional information is needed to prove that the triangles are similar to prove XYZ?** – What information is necessary to prove two triangles are similar by the SAS similarity theorem? You need to show that two sides of one triangle are proportional to two corresponding sides of another triangle, with the included corresponding angles being congruent.

**Are triangle ABC and triangle XYZ similar?** – Corresponding angles are congruent. So if we say that triangle ABC is similar to triangle XYZ, that is equivalent to saying that angle ABC is congruent– or we could say that their measures are equal– to angle XYZ.

**Which of the following is true about similar figures?** – Which of the following is true about similar figures? Similar figures have corresponding angles that are congruent and corresponding sides that are proportional.

**Could JKL be congruent to XYZ explain?** – The triangles are similar but they are not congruent. A series of transformations were applied to triangle JKL to create triangle XYZ.

**What is the reason for Statement 3 in this proof?** – What is the reason for statement #3? If two parallel lines are cut by a transversal, then alternate interior angles are congruent.

**What does Cpctc stand for?** – Geometry. CPCTC stands for “corresponding parts of congruent triangles are congruent” and tells us if two or more triangles are congruent, then their corresponding angles and sides are congruent as well.

**Which congruence theorem can be used to prove ABC def?** – If two angle in one triangle are congruent to two angles of a second triangle, and also if the included sides are congruent, then the triangles are congruent. Using labels: If in triangles ABC and DEF, angle A = angle D, angle B = angle E, and AB = DE, then triangle ABC is congruent to triangle DEF.

**Which angle corresponds to angle a given triangle ABC is congruent to triangle XYZ *?** – The first angle we can look at is angle 𝐴. And this will be congruent to angle 𝑋 in triangle 𝑋𝑌𝑍. And as we’re told that this angle 𝑋 is 40 degrees, this means that angle 𝐴 in triangle 𝐴𝐵𝐶 will also be 40 degrees. We can also see that angle 𝐶 in triangle 𝐴𝐵𝐶 is congruent to angle 𝑍 in triangle 𝑋𝑌𝑍.

**Are congruent triangles similar?** – Two triangles are said to be similar if their corresponding angles are congruent and the corresponding sides are in proportion . In other words, similar triangles are the same shape, but not necessarily the same size. The triangles are congruent if, in addition to this, their corresponding sides are of equal length.