In A B C , internal angle bisector of /...

In ` A B C ,` internal angle bisector of `/_A` meets side `B C` in `DdotD E_|_A D` meets `A C` in `Ea n dA B` in `Fdot` Then `A E` is`HdotPdot` of`b` and`c` `A D=(2b c)/(b+c)cosA/2` `E F=(4b c)/(b+c)sinA/2` (d) ` A E Fi si sos c e l e s`

A

AE in H.M of b and c

B

`AD = (2bc)/(b + c) cos.(A)/(2)`

C

`EF = (4bc)/(b +c) sin.(A)/(2)`

D

`DeltaAEF` is isosceles

Text Solution

Verified by Experts

The correct Answer is:

A, B, C, D

In `DeltaAFE, AD` is angle bisector of `angleA and AD bot EF`.
`:.` D is midpoint of EF and `DeltaAEF` is isosceles triangle.
Therefore, `DeltaAFE` is an isosceles triangle. Now,
To find AD.

`rArr (1)/(2) bc sin A = (1)/(2) c AD "sin" (A)/(2) + (1)/(2) b AD "sin "(A)/(2)`
`rArr AD = (2bc "cos"(A)/(2))/(b+c)`
Also, `AD = AE "cos"(A)/(2) " " ("from " DeltaADE)`
`rArr AE = (2bc)/(b+c) = H.M` of b and c
Again `EF = 2DE = 2 AD "tan"(A)/(2) = (4bc "sin"(A)/(2))/(b+c)`

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