If the vertices of a triangle be (a,b - c),(b, c - a) and (c, a - b) , then the centroid of the triangle lies

The vertices of a triangle are (a, b - c), (b, c - a) and (c, a - b). Prove that its centroid lies on x-axis.

The area of a triangle with vertices (a,b+c), (b,c+a) and (c,a+b) is

If A=(2,3),B=(3,5),C(-1,4 " are three vertices of a triangle and the origin is shifted to the point (1,1) then the centroid of the triangle is

If A(1,a),B(a,a^(2)) and C(a^(2),a^(2)) are the vertices of a triangle which are equidistant from the origin,then the centroid of the triangle ABC is at the point

If the centroid and two vertices of a triangle are (4,-8),(-9,7),(1,4) then the area of the triangle (in sq.units ) is a(b)/(c) then (a)/(83)=

If two vertices of a triangle are (-2,3) and (5,-1) the orthocentre lies at the origin, and the centroid on the line x+y=7 , then the third vertex lies at (a) (7,4) (b) (8,14) (c) (12 ,21) (d) none of these