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Question

Diagonals AC and BD of quadrilateral ABCD intersect at O such that OB = OD.If AB = CD, then show that:
(i) ar (DOC) = ar (AOB) (ii) ar (DCB) = ar (ACB) [4 MARKS]


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Solution

Statement of the theorem : 1 Mark
Application of the theorem : 1Mark
Calculation : 2 Marks

Let us draw DN AC and BM AC.

i.) In NOD and MOB,

DNO = BMO (By construction)

DON = BOM (Vertically opposite angles)

OD = OB (Given)

DON BOM [ AAS congruence rule]

DN = BM ---------- (1)


We know that congruent triangles have equal areas.

ar (DON) = ar (BOM) ------------(2)


In DNC and BMA,

DNC = BMA (By construction)

CD = AB (Given)

DN = BM [Using equation (1)]


So, DNC BMA [RHS congruence rule]

ar (DNC) = ar (BMA) --------- (3)

Adding (2) and (3)

ar (DOC) = ar (AOB)


ii.) We obtained,

ar (DOC) = ar (AOB)

Add ar (OCB) on both sides

ar(DCB) = ar(ACB)


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