The base BC of ∆ABC is divided at D such BD = 
DC. Prove that ar(∆ABD) = 
x ar(∆ABC).
Given: A ∆ABC with a point D on BC such that BD = 
DC
To prove: area(∆ABD) = 
x area(∆ABC)
Construction: Drop a perpendicular onto BC
Proof: area(∆ABC) = 
x BC x AE ---------------(1)
and, area(∆ABD) = 
x BD x AE ----------------- (2)
given that BD = 
DC ------------------ (3)
so, BC = BD + DC = BD + 2BD = 3BD [from 2]
∴ BD = 
(BC)
Sub BD in (1), we get
area(∆ABD) = 
x (
(BC) X AE)
area(∆ABD) = 
x (
BC X AE)
area(∆ABD) = 
x area(∆ABC) [from 1]
Hence proved
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