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Question

In figure, DEFG is a square and BAC=90o, Prove that
(i) AGFDBG
(ii) AGFEFC
(iii) DBGEFC
(iv) DE2=BD×EC

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Solution

(i) In AGF and DBG, we have
GAF=BDG[Each equal to 90o]
and, AGF=DBG [Corresponding angles]
AGFDBG [By AA-criterion of similarity]

(ii) In AGF and EFC, we have
FAG=CEF [Each equal to 90o]
and, AFG=ECF
DBGEFC [By AA-criterion of similarity]

(iii)Since AGFDBG and AGFEFC
DBGEFC

(iv)We have, DBGEFC[Using(iii)]
BDEF=DGBC
BDDE=DEEC
[ DEFG is a square EF=DE,DG=DE]
DE2=BD×BC


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