In figure, DEFG is a square and ∠BAC=90o, Prove that
(i) △AGF∼△DBG
(ii) △AGF∼△EFC
(iii) △DBG∼△EFC
(iv) DE2=BD×EC
(i) In △AGF and △DBG, we have
∠GAF=∠BDG[Each equal to 90o]
and, ∠AGF=∠DBG [Corresponding angles]
∴△AGF∼△DBG [By AA-criterion of similarity]
(ii) In △AGF and △EFC, we have
∠FAG=∠CEF [Each equal to 90o]
and, ∠AFG=∠ECF
∴△DBG∼△EFC [By AA-criterion of similarity]
(iii)Since △AGF∼△DBG and △AGF∼△EFC
∴△DBG∼△EFC
(iv)We have, △DBG∼△EFC[Using(iii)]
∴BDEF=DGBC
△BDDE=DEEC
[∵ DEFG is a square ∴EF=DE,DG=DE]
⇒DE2=BD×BC