If plane `6x-3y+2z-18=0` meets co-ordinate axes at points `A,B,C`,
then centroid of `triangleABC` is

The plane ax + by + cz = 1 meets the coordinate axes in A, B, C . The centroid of DeltaABC is

The plane (x)/(a)+(y)/(b)+(z)/(c )=3 meets the co-ordinate axes in A,B,C. The centroid of the triangle ABC is

A plane meets the co-ordinate axes at A,B,C such that the centroid of the triangle is (3,3,3) . The eqation of the plane is

A plane meets the co-ordinate axes at A,B,C and (alpha,beta,gamma) is the centroid of the triangle ABC. Then the equation of the plane is

A plane a constant distance p from the origin meets the coordinate axes in A, B, C. Locus of the centroid of the triangle ABC is

A plane cuts the coordinate axes X,Y,Z at A,B,C respectively such that the centroid of the triangleABC is (6,6,3) . Then the equation of that plane is

If the tangent to the circle x^2+y^2=r^2 at the point (a,b) meets the co-ordinate axes at the points A and B, and O is the origin, then the area of the triangle OAB is

A variable plane at a distance of 1 unit from the origin cuts the axes at A, B and C. If the centroid D(x, y, z) of triangleABC satisfies the relation (1)/(x^2)+(1)/(y^2)+(1)/(z^2)=K, then the value of K is

A(-7,6), B(2,-2) and C(8,5) are co-ordinates of vertices of triangle ABC . Find the co-ordinates of centroid of triangle ABC .

A(1,4),B(2,3) and C(1,6) are vertices triangleABC . Find the eqaution of the altitude through B and hence find the co-ordinates of the point where this altitude cuts the side AC of triangleABC