If ∆PQR and ∆XYZ are congruent under the correspondence QPR ↔ XYZ, then QR = ______. - Mathematics

If ∆PQR and ∆XYZ are congruent under the correspondence QPR `leftrightarrow` XYZ, then QR = ______.

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If ∆PQR and ∆XYZ are congruent under the correspondence QPR `leftrightarrow` XYZ, then QR = XZ.

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Chapter 6: Triangles - Exercise [Page 167]

Chapter 6 Triangles
Exercise | Q 63. (ii) | Page 167

Classify the given triangle based on its sides

Classify the following triangle based on its sides and angles

Can a triangle be formed with the following sides? If yes, name the type of triangle.

3.5 cm, 3.5 cm, 3.5 cm

The given triangle is _________

If for ∆ABC and ∆DEF, the correspondence CAB `leftrightarrow` EDF gives a congruence, then which of the following is not true?

If ∆PQR and ∆XYZ are congruent under the correspondence QPR `leftrightarrow` XYZ, then ∠P = ______.

If ∆PQR and ∆XYZ are congruent under the correspondence QPR `leftrightarrow` XYZ, then QP = ______.

If ∆PQR and ∆XYZ are congruent under the correspondence QPR `leftrightarrow` XYZ, then ∠Q = ______.

If ∆PQR and ∆XYZ are congruent under the correspondence QPR `leftrightarrow` XYZ, then RP = ______.

It is possible to have a triangle in which each angle is equal to 60°.

A one rupee coin is congruent to a five rupee coin.

If the areas of two squares is same, they are congruent.

If three angles of two triangles are equal, triangles are congruent.

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