If the plane `x/2+y/3+z/4=1` cuts the coordinate axes in `A, B,C,` then the area of triangle `ABC` is

A variable plane which remains at a constant distance 3p from the origin cuts the coordinate axes at A,B,C. Show that locus of the O centroid of the triangle ABC is (1)/(x^(2))+(1)/(y^(2))+(1)/(z^(2))=(1)/(p^(2)) .

A plane meets the coordinate axes in A ,B ,C such that the centroid of triangle A B C is the point (p ,q ,r)dot Show that the equation of the plane is x/p+y/q+z/r=3.

A variable plane which remains at a constant distance 3p from the origin cuts the coordinate axes at A,B,C. show that the locus of the centroid of the triangle ABC is x^-2+y^-2+z^-2=p^-2 .

A plane meets the coordinate axes in points A,B,C and the centroid of the triangle ABC is (alpha,beta,gamma) , find the equation of the plane.

Find the equation of the plane, which meets the axes in A,B,C given that centroid of the triangle ABC is the point (alpha, beta, gamma) .

A variable plane which remains at a constant distance p from the origin cuts the co-ordinate axes at A, B, C. Through A,B,C planes are drawn parallel to the co-ordinate planes. Show that locus of the point of intersection is : x^(-2)+y^(-2)+z^(-2)=p^-2

The circle x^2 + y^2 -2x - 4y+1=0 with centre C meets the y axis at points A and B. Find the area of the triangle ABC.

A point P moves on a plane (x)/(a)+(y)/(b)+(z)/(c)=1. A plane through P and perpendicular to OP meets the coordinate axes at A, B and C.If the parallel to the planes x=0,y=0 and z=0, respectively, intersect at Q, find the locus of Q.

Find the intercepts of the plane 2x-3y+4z-24=0 on the cooridnate axes.

Through the point P(h, k, l) a plane is drawn at right angles to OP to meet co-ordinate axes at A, B and C. If OP=p, A_xy is area of projetion of triangle(ABC) on xy-plane. A_zy is area of projection of triangle(ABC) on yz-plane, then