Let the circle touches the sides BC, CA, AB of the right triangle ABC(right angled at C) at D, E and F respectively, where BC= a, CA=b , AB= c respectively
Since lengths of tangents drawn from an external point are equal
Therefore, AE=AF, and BD=BF
Also CE=CD=r
and b-r=AF , a- r= BF
Therefore AB=AF+BF
c= b-r + a-r AB=c=AF+BF=b-r+a-r
hence, r=a+b-c/2
Let the circle touches the sides AB,BC and CA of triangle ABC at D, E and F
Since lengths of tangents drawn from an external point are equal We have
AD=AF, BD=BE and CE=CF
Similarly EB=BD=r
Then we have c = AF+FC
⇒ c = AD+CE
⇒ c = (AB-DB)(CB-EB)
⇒ c = a-r +b-r
⇒ 2r =a+b-c
r =( a+b-c)/2
