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Question Number 180400 by a.lgnaoui last updated on 12/Nov/22

Area BEF=AreaCDF Prouve AD×BE=AE×CD

$$\mathrm{Area}\:\mathrm{BEF}=\mathrm{AreaCDF} \\ $$$$\mathrm{Prouve}\:\:\mathrm{AD}×\mathrm{BE}=\mathrm{AE}×\mathrm{CD} \\ $$

Commented by a.lgnaoui last updated on 12/Nov/22

Answered by Acem last updated on 12/Nov/22

(1/2) (p+ a) b sin A= (1/2) (q+ b) a sin A p.b + b.a = a.q + a.b ⇒ p.b= a.q

$$\frac{\mathrm{1}}{\mathrm{2}}\:\left({p}+\:{a}\right)\:{b}\:\mathrm{sin}\:{A}=\:\frac{\mathrm{1}}{\mathrm{2}}\:\left({q}+\:{b}\right)\:{a}\:\mathrm{sin}\:{A} \\ $$$$\:{p}.{b}\:+\:{b}.{a}\:=\:{a}.{q}\:+\:{a}.{b}\:\Rightarrow\:{p}.{b}=\:{a}.{q} \\ $$$$ \\ $$

Answered by HeferH last updated on 16/Nov/22

1. Area DCB = Area EBC but DCB and EBC have the same base, so they need to have the same height (since their areas are equal) ⇒ DEBC is a trapezoid ⇒ DE ∣∣ CB 2. By using similar triangles ((AD)/(AD + DC)) = ((AE)/(AE + EB)) AD∙AE + AD∙EB = AD∙AE+ AE∙DC AD ∙ EB = AE ∙ DC ✓

$$\:\mathrm{1}.\:{Area}\:{DCB}\:=\:{Area}\:{EBC} \\ $$$$\:{but}\:{DCB}\:{and}\:{EBC}\:{have}\:{the}\:{same}\:{base},\:{so} \\ $$$$\:{they}\:{need}\:{to}\:{have}\:{the}\:{same}\:{height} \\ $$$$\:\left({since}\:{their}\:{areas}\:{are}\:{equal}\right)\:\Rightarrow\:{DEBC}\:{is} \\ $$$$\:{a}\:{trapezoid}\:\Rightarrow\:{DE}\:\mid\mid\:{CB} \\ $$$$\:\mathrm{2}.\:{By}\:{using}\:{similar}\:{triangles} \\ $$$$\:\frac{{AD}}{{AD}\:+\:{DC}}\:=\:\frac{{AE}}{{AE}\:+\:{EB}} \\ $$$$\:{AD}\centerdot{AE}\:+\:{AD}\centerdot{EB}\:=\:{AD}\centerdot{AE}+\:{AE}\centerdot{DC} \\ $$$$\:{AD}\:\centerdot\:{EB}\:=\:{AE}\:\centerdot\:{DC}\:\checkmark \\ $$$$\: \\ $$

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