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

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

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

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Chapter 6: Triangles - Exercise [Page 167]

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

Classify the following triangle based on its sides and angles

Measures of each of the angles of an equilateral triangle is ______.

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

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 = ______.

It is possible to have a right-angled equilateral triangle.

If M is the mid-point of a line segment AB, then we can say that AM and MB are congruent.

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

A triangle in which all three sides are equal in length is called:

A triangle with all sides of different lengths is classified as: