If AD is a median of a triangle ABC, then prove that triangles ADB and ADC are equal in area. If G is the mid-point of median AD, prove that ar(Δ BGC) = 2ar(Δ AGC).
Construction: Draw AM⊥ BC
Proof: Since,
AD is the median of ΔABC
Therefore,
BD = DC
BD * AM = DC * AM
(BD * AM) = 
(DC * AM)
Area (Δ ABD) = Area (Δ ACD) (i)
Now, in Δ BGC
GD is the median
Therefore,
Area (BGD) = Area (CGD) (ii)
Also,
In Δ ACD, CG is the median
Therefore, Area (
AGC) = Area (
CGD) (iii)
From (i), (ii) and (iii) we have
Area (ΔBGD) = Area (ΔAGC)
But,
Area (ΔBGC) = 2 Area (ΔBGD)
Therefore,
Area (
BGC) = 2 Area (ΔAGC)
Hence, proved
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