If s−x/4= s−y/3=s-z/2 and area of incircle of the triangle XYZ is 8(pi)/3 thenThe radius of the circumcircle of `!XYZ`

If s−x/4= s−y/3=s-z/2 and area of incircle of the triangle XYZ is 8(pi)/3 thenThe radius of the circumcircle of triangle XYZ

In a triangle XYZ, let x, y, z be the lengths of sides opposite to the angles X, Y, Z, respectively, and 2s = x + y + z. If (s-x)/4=(s-y)/3=(s-z)/2 and area of incircle of the triangle XYZ is (8pi)/3 . then the area of triangle XYZ is _

In a !XYZ ,let x , y , z be the length of the side opposite to angles. X , Y, Z respectively and 2s = x + y + z. If (s-x)/4=(s-y)/3=(s-z)/2 and area of the incircle of the triangle XYZ is (8pi)/3 , the area of DeltaXYZ is

In a triangle XYZ, let x,y,z be the lengths of sides opposite to the angles X, Y, Z, respectively, and 2s = x + y + z . " If" (s - x)/4 = (x - y)/3 = (x - z)/2 and area o incircle of the triangle XYZ is (8pi)/3 , then

If the difference between areas of the circumcircle and the incircle of an equllateral triangle is 44 cm^(2) , then the area of the triangle is (Take pi = (22)/(7) )

If the difference between areas of the circumcircle and the incircle of an equilateral triangle is 44 cm^(2) , then the area of the triangle is (Take pi = (22)/(7) )

In a triangle XYZ,let x,y,z be the lengths of sides opposite to the angles X,Y,Z, respectively,and 2s=x+y+z. If (s-x)/(4)=(s-y)/(3)=(s-z)/(2) of incircle of the triangle XYZ is (8 pi)/(3)

In a triangle XYZ, let x, y, z be the lengths of sides opposite to the angles X, Y, Z, respectively, and 2s = x + y + z. If (s-x)/4=(s-y)/3=(s-z)/2 of incircle of the triangle XYZ is (8pi)/3

In a triangle XYZ, let x, y, z be the lengths of sides opposite to the angles X, Y, Z, respectively, and 2s = x + y + z. If (s-x)/4=(s-y)/3=(s-z)/2 of incircle of the triangle XYZ is (8pi)/3