In an Agrad plane `z_(1),z_(2) and z_(3)` are, respectively, the vertices of an isosceles trinagle ABC with AC= BC and `/_CAB = theta`. If `z_(4)` is incentre of triangle, then
The value of `AB xx AC// (IA)^(2)` is

In an Agrad plane z_(1),z_(2) and z_(3) are, respectively, the vertices of an isosceles trinagle ABC with AC= BC and /_CAB = theta . If z_(4) is incentre of triangle, then The value of (z_(4) -z_(1))^(2) (cos theta + 1) sec theta is

In an Agrad plane z_(1),z_(2) and z_(3) are, respectively, the vertices of an isosceles trinagle ABC with AC= BC and /_CAB = theta . If z_(4) is incentre of triangle, then The value of (z_(2)-z_(1))^(2)tan theta tan theta //2 is

On the Argand plane z_(1),z_(2) and z_(3) are respectively,the vertices of an isosceles triangle ABC with AC=BC and equal angles are theta. If z_(4) is the incenter of the triangle,then prove that (z_(2)-z_(1))(z_(3)-z_(1))=(1+sec theta)(z_(4)-z_(1))^(2)

If z_(1),z_(2),z_(3) are the vertices of an isoscles triangle right angled at z_(2) , then

Let z_1,z_2 and origin be the vertices A,B,O respectively of an isosceles triangle OAB, where OA=OB and /_AOB=2theta. If z_1, z_2 are the roots of equation z^2+z+9=0 then sec^2theta=

ABC is an isosceles triangle with AC = BC. If AB^2 - 2AC^2 =0, prove that ABC is right triangle.

ABC is an isosceles triangle with AC=BC . If AB^(2)=2AC^(2), prove that ABC is right triangle.

If z_(1), z_(2),z_(3) represent the vertices of a triangle, then the centroid of the triangle is given by