In the given figure, DEFG is a square and angle BAC = 90°. Show that FG square=
BG X FC
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Answer:
BG * FC = FG²
Step-by-step explanation:
∠B = 90° - ∠C or ∠C = 90° - ∠B
in Δ BDG
ΔD = 90° - ∠B = ∠C
& in Δ CEF
∠E = 90° - ∠C = ∠B
now comparing
Δ BDG & Δ CEF
ΔD = ∠C
∠B = ∠E
∠G = ∠F = 90°
=> Δ BDG ≈ Δ CEF
=> BD/CE = BG/ EF = DG/ FC
=> BG/ EF = DG/ FC
=> BG * FC = EF * DG
EF = DG = FG ( sides of square)
=> BG * FC = FG * FG
=> BG * FC = FG²
QED
proved
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