Let AF = AD = 2r1, FC = FE = 2r2 & BE = BD = 2r3 Semisum of sides, s = 2r1+2r2+2r3 Thus, r^2= (Area/s)^2 =(s-a)(s-b)(s-c)/s where a=2r1+2r2,b=2r2+2r3 & c=2r3+2r1 which gives us, r^2 = (2r1*2r2*2r3)/(2r1+2r2+2r3) = (4r1*r2*r3)/(r1+r2+r3) or 1/r^2 = (r1+r2+r3)/(4r1r2r3) --------(1) It's easy to see that, d^2=(r3+r1)^2-(r3-r1)^2 =4r3r1. Likewise, e^2=4r2r3 & f^2=4r1r2. Now, 1/d^2+1/e^2+1/f^2 = 1/4r1r2+1/4r2r2+3/4r3r1 = (r1+r2+r3)/(4r1r2r3) By equation (1), 1/r^2 = 1/d^2 + 1/e^2 + 1/f^2 QED Ajit: ajitaathle@gmail.com By (1),1/r^2 = (r1+r2+r3)/(4r1*r2*r3) (r1+r2+r3)
Let AF = AD = 2r1, FC = FE = 2r2 & BE = BD = 2r3
ReplyDeleteSemisum of sides, s = 2r1+2r2+2r3
Thus, r^2= (Area/s)^2 =(s-a)(s-b)(s-c)/s
where a=2r1+2r2,b=2r2+2r3 & c=2r3+2r1 which gives us, r^2 = (2r1*2r2*2r3)/(2r1+2r2+2r3)
= (4r1*r2*r3)/(r1+r2+r3)
or 1/r^2 = (r1+r2+r3)/(4r1r2r3) --------(1)
It's easy to see that, d^2=(r3+r1)^2-(r3-r1)^2 =4r3r1. Likewise, e^2=4r2r3 & f^2=4r1r2. Now, 1/d^2+1/e^2+1/f^2 = 1/4r1r2+1/4r2r2+3/4r3r1 = (r1+r2+r3)/(4r1r2r3)
By equation (1), 1/r^2 = 1/d^2 + 1/e^2 + 1/f^2
QED
Ajit: ajitaathle@gmail.com
By (1),1/r^2 = (r1+r2+r3)/(4r1*r2*r3) (r1+r2+r3)