In the adjoining figure, ABCD is a parallelogram, P is a point on side BC and DP when produced meets AB produced at L. Prove that :

(i) DP : PL = DC : BL.

(ii) DL : DP = AL : DC.

(i) Given,

ABCD is a parallelogram.

∴ AB || DC and AD || BC

In ΔDPC and ΔLPB,

∠PDC = ∠PLB [Alternate angles are equal]

∠DPC = ∠LPB [Vertically opposite angles are equal]

∴ ΔDPC ∼ ΔLPB (By A.A. axiom)

Corresponding sides of similar triangles are proportional.

$\dfrac{DP}{LP} = \dfrac{DC}{LB}$

DP : PL = DC : BL

Hence, proved DP : PL = DC : BL.

(ii) In ΔALD and ΔCPD,

∠ALD = ∠PDC [Alternate interior angles, AB || DC]

∠DAL = ∠PCD [Opposite angles of a parallelogram are equal]

∴ ΔLAD ∼ ΔDCP (By A.A. axiom)

Corresponding sides of similar triangles are proportional.

$\dfrac{DL}{DP} = \dfrac{AL}{DC}$

DL : DP = AL : DC

Hence, proved DL : DP = AL : DC.