CD and GH are respectively the bisector...

CD and GH are respectively the bisectors of `/_A C B`and `/_E G F`such that D and H lie on sides AB and FE of `DeltaA B C\ and\ DeltaE F G`respectively. If`DeltaA B C DeltaF E G`, show that:
(i) `(C D)/(G H)=(A G)/(F G)`
(ii) `∆ DCB ~ ∆ HGE`
(iii) `∆ DCA ~ ∆ HGF`

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CD and GH are respectively the bisectors of `/_A C B`and `/_E G F`such that D and H lie on sides AB and FE of `DeltaA B C\ and\ DeltaE F G`respectively. If`DeltaA B C DeltaF E G`, show that:(i) `(C D)/(G H)=(A G)/(F G)` (ii) `∆ DCB ~ ∆ HGE` (iii) `∆ DCA ~ ∆ HGF`

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CD and GH are respectively the bisectors of `/_A C B`and `/_E G F`such that D and H lie on sides AB and FE of `DeltaA B C\ and\ DeltaE F G`respectively. If`DeltaA B C DeltaF E G`, show that:
(i) `(C D)/(G H)=(A G)/(F G)`
(ii) `∆ DCB ~ ∆ HGE`
(iii) `∆ DCA ~ ∆ HGF`