In the givne figure, OA = OB and OP = OQ.
Prove that (i) PX = QX, (ii) AX = BX.

In the given figure,OA=OB and OP=OQ. Prove that (i)PX=QX, (ii) AX=BX

In the given figure, OA = OB and OD = OC. Show that (i) DeltaAOD cong DeltaBOC and (ii) AD||BC

In the following figure, OA = OC and AB = BC. Prove that : (i) angleAPB=90^(@) (ii) DeltaAOD cong DeltaCOD (iii) AD = CD

In the given figure, Oa = OB and OC = OD. Which is the criteria to prove DeltaAOC ~=DeltaBOD .

In the given figure DA _|_ OP and DB _|_OQ and /_ADB = 170^@ find /_AOB .

In the adjoining figure, QX and RX are the bisectors of the angles Q and R respectively of the angles Q and R respectively of the triangle PQR. If XS bot PQ . Prove that : (i) DeltaXTQ cong DeltaXSQ (ii) PX bisects angle P.

In figure OA*OB=OC*OD. Show that /_A=/_C and /_B=/_D

In the given figure A, B and C are points on OP, OQ and OR respectively such that AB||PQ and BC||QR. Show that AC||PR.

In the given figure angle ABC = angle BAC , D and E are pointts on BC and AC respectively such that DB = AE . If AD and BE intersect at O then prove that OA = OB