A plane meets the coordinates axes respectively at A, B and C such that the centroid of the triangle ABC is `( 3, 3, 3)`. If the equation of the plane is x+y+z=p. Then p is equal to

A plane meets the coordinates axes at L, M, N respectively, such that the centroid of the triangle LMN is (1,-2,3) . Find the equation of the plane.

A plane meets the coordinates axes in A, B, C such that the centroid of the triangle ABC is the point (a,a,a) .Then the equation of the plane is x+y+z=p , where p is ___

A plane meets the coordinate axes at P, Q, R such that the centroid of the triangle PQR ar (a, b, c). If the equation of the plane is (x)/(a)+(y)/(b)+(z)/(c )=m , then the value of m is -

If a plane meets the equations axes at A ,Ba n dC such that the centroid of the triangle is (1,2,4), then find the equation of the plane.

If a plane meets the equations axes at A ,Ba n dC such that the centroid of the triangle is (1,2,4), then find the equation of the plane.

If a plane meets the coordinate axes at A, B, C such that the centroid of the triangle ABC is the point (1,r,r^(2)) , then show that the equation of the plane is r^(2)x+ry+z=3r^(2) .

A plane meets the co-ordinate axes at the points A, B, C respectively in such a way that the centroid of Delta ABC is (1, r, r^(2)) for some real r. If the plane passes through the point (5, 5, -12) then r =

The coordinates of P of the DeltaPQR are (-1, -1), if the centroid of the triangle be (2,4/3) , then find the mid-point of QR.

P is the variable point on the circle with center at C. C A and C B are perpendiculars from C on the x- and the y-axis, respectively. Show that the locus of the centroid of triangle P A B is a circle with center at the centroid of triangle C A B and radius equal to the one-third of the radius of the given circle.

A straight line passing through P(3,1) meets the coordinate axes at Aa n dB . It is given that the distance of this straight line from the origin O is maximum. The area of triangle O A B is equal to