In Fig. 6.53, ABD is a triangle right angled at Aand AC BD. Show that:

(i) AB2 = BC . BD


(ii) AC2 = BC . DC


(iii) AD2 = BD . CD


(i) In ΔADB and ΔCAB, we have

DAB = ACB (Each of 90o)


ABD = CBA (Common angle)


Therefore,


ΔADB ΔCAB (AA similarity)



AB2 = CB * BD


(ii) Let CAB = x


In ΔCBA,


CBA = 180o – 90o – x


CBA = 90o – x


Similarly, in ΔCAD


CAD = 90o - CBA


= 90o – x


CDA = 180o – 90o – (90o – x)


CDA = x


In triangle CBA and CAD, we have


CBA = CAD


CAB = CDA


ACB = DCA (Each 90o)


Therefore,


ΔCBA ΔCAD (By AAA similarity)



AC2 = DC * BC


(iii) In ΔDCA and ΔDAB, we have


DCA = DAB (Each 90o)


CDA = ADB (Common angle)


Therefore,


ΔDCA ΔDAB (By AA similarity)



AD2 = BD * CD


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