If the incircle of the triangle ABC pass...

If the incircle of the triangle ABC passes through its circumcenter, then find the value of `4 sin.(A)/(2) sin.(B)/(2) sin.(C)/(2)`

Text Solution

Verified by Experts

The correct Answer is:

`sqrt2 -1`

Distance between circumcenter (O) and incenter (I) is `sqrt(R^(2) -2r R)`
If incircle of triangle ABC passes through it's circumcenter,
`sqrt(R^(2) - 2r R) = r`
`rArr ((r)/(R))^(2) + 2((r)/(R)) - 1 = 0`
`rArr (r)/(R) = (-2 +- sqrt(4 + 4))/(2)`
`rArr (r)/(R) = sqrt2 -1` (as `(r)/(R) gt 0`)
`rArr 1 + (r)/(R) = sqrt2`
`rArr 4 sin.(A)/(2) sin.(B)/(2) sin.(C)/(2) = sqrt2 -1`

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In triangle ABC if a, b, c are in A.P., then the value of (sin.(A)/(2)sin.(C)/(2))/(sin.(B)/(2)) =

`(1)/(2)`

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If the incircle of the triangle ABC passes through its circumcenter, then find the value of `4 sin.(A)/(2) sin.(B)/(2) sin.(C)/(2)`

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