in three triangle ABC, PQR and XYZ if ABC is congruent to PQR and PQR is congruent to XYZ then ABC is congruent to XYZ. this property is called
Answers
(a) Given that, △PQR is congruent to △XYZ
(a) Given that, △PQR is congruent to △XYZTherefore,
(a) Given that, △PQR is congruent to △XYZTherefore,Congruent sides: PQ=XY, QR=YZ and PR=XZ
(a) Given that, △PQR is congruent to △XYZTherefore,Congruent sides: PQ=XY, QR=YZ and PR=XZCongruent angles: ∠QPR=∠YXZ, ∠PQR=∠XYZ and ∠PRQ=∠XZY
(a) Given that, △PQR is congruent to △XYZTherefore,Congruent sides: PQ=XY, QR=YZ and PR=XZCongruent angles: ∠QPR=∠YXZ, ∠PQR=∠XYZ and ∠PRQ=∠XZY(b) Given that △ABC is congruent to △TUV
(a) Given that, △PQR is congruent to △XYZTherefore,Congruent sides: PQ=XY, QR=YZ and PR=XZCongruent angles: ∠QPR=∠YXZ, ∠PQR=∠XYZ and ∠PRQ=∠XZY(b) Given that △ABC is congruent to △TUVTherefore,
(a) Given that, △PQR is congruent to △XYZTherefore,Congruent sides: PQ=XY, QR=YZ and PR=XZCongruent angles: ∠QPR=∠YXZ, ∠PQR=∠XYZ and ∠PRQ=∠XZY(b) Given that △ABC is congruent to △TUVTherefore,Congruent sides: AB=TU, BC=UV and AC=TV
(a) Given that, △PQR is congruent to △XYZTherefore,Congruent sides: PQ=XY, QR=YZ and PR=XZCongruent angles: ∠QPR=∠YXZ, ∠PQR=∠XYZ and ∠PRQ=∠XZY(b) Given that △ABC is congruent to △TUVTherefore,Congruent sides: AB=TU, BC=UV and AC=TVCongruent angles: ∠BAC=∠UTV, ∠ABC=∠TUV and ∠BCA=∠UVT
ASSOCIATIVE PROPERTY
Step-by-step explanation: