Mathematics
Two sides AB and BC and median AD of triangle ABC are respectively equal to sides PQ and QR and median PN of △PQR. Show that :
(i) △ABD ≡ △PQN.
(ii) △ABC ≡ △PQR.
Related Questions
In the given figure, BC = CE and ∠1 = ∠2.
Prove that : △GCB ≡ △DCE.
The given figure shows two isosceles triangles ABC and DBC with common base BC. AD is extended to intersect BC at point P. Show that :
(i) △ABD ≡ △ACD.
(ii) △ABP ≡ △ACP.
(iii) AP bisects ∠BDC.
(iv) AP is perpendicular bisector of BC.
The given figure shows PQ = PR and ∠Q = ∠R
Prove that: △PQS ≡ △PRT.
In the following figure, AB = AC and AD = AE.
If ∠B = 50° ∠D = 66° and ∠GAC = 18°, find the measure of angles DAE, BAF and AGF.