Question

CD and GH are respectively the bisectors of
triangle ACB
and
triangle EGF
such that D and H lie on sides
AB and FE
of
triangle ABC and EFG
respectively. If triangle ABC~ triangle EFG,

Show that :

(i)
CD/GH=AC/FG

(ii)
triangle DCB ~ triangle HGE

(iii)
triangle DCA ~ triangle HGF.

[ ~ = similar to]​

Answer 1

Answer:

Here is your answer buddy

To show that: (i) CD over GH equals AC over FG (ii) increment DCB tilde increment HGE (iii) space space increment (ii)[∴ CD and GH are bisector of ∠C and ∠G respectively]Thus, in ∆ s ACD and ... (ii) increment DCB tilde increment HGE ... All ______ triangles are similar,(isosceles ...

Thanks...