A plane `2x+3y+5z=1` has a point P which is at minimum distance from line joining `A(1, 0, -3), B(1, -5, 7),` then distance AP is equal to

Find the ratio in which 2x+3y+5z=1 divides the line joining the points (1, 0, -3) and (1, -5, 7).

Find the equation of the set of the points P such that its distance from the points A(3, 4, -5) and B(-2, 1, 4) are equal.

The length of projection of the line segmet joining the points (1, 0, -1) and (-1, 2, 2) on the plane x+3y-5z=6 is equal to

In which ratio line x+y=4 divides line segment joining points (-1,1) and (5,7) ?

The locus of point which moves in such a way that its distance from the line (x)/(1)=(y)/(1)=(z)/(-1) is twice the distance from the plane x+y+z=0 is

Statement 1: A plane passes through the point A(2,1,-3)dot If distance of this plane from origin is maximum, then its equation is 2x+y-3z=14. Statement 2: If the plane passing through the point A( vec a) is at maximum distance from origin, then normal to the plane is vector vec adot

The line which contains all points (x, y, z) which are of the form (x, y, z)=(2, -2, 5)+lambda(1, -3, 2) intersects the plane 2x-3y+4z=163 at P and intersects the YZ-plane at Q. If the distance PQ is asqrt(b) , where a,binN and agt3 , then (a+b) is equalto

Find distance from point (3, 5) to the line 2x + 3y = 14 and the distance to the line parallel to x - 2y = 1.

Find perpendicular distance from point (3,-1) to the line 12 x -5y-7=0 .