Given,
The line x=y=z intersects the line xsinA+ysinB+zsinC−18=0=xsin2A+ysin2B+zsin2C−9
So, let x=y=z=k
Now putting the value in xsinA+ysinB+zsinC=18 we get,
k(sinA+sinB+sinC)=18
Now we know that, if A,B&C are angles of triangle then sinA+sinB+sinC=4cos2A⋅cos2B⋅cos2C
⇒k(4cos2A⋅cos2B⋅cos2C)=18.....(i)
Also k(sin2A+sin2A+sin2A)=9
And similalry sin2A+sin2A+sin2A=4sinA⋅sinB⋅sinC
⇒k(4sinA⋅sinB⋅sinC)=9........(ii)
Now dividing equation (i)&(\mathrm{ii}) we get,
8sin2A⋅sin2B⋅sin2C=189
⇒80sin2A⋅sin2B⋅sin2C=5