A line is drawn from the point P(1,1,1)and perpendicular to a line with direction ratios, (1,1,1) to intersect the plane `x+2y+3z=4` at Q. The locus of point Q is

Three mutually perpendicular lines are drawn from the point (1,2,-1) . If one of the lines is perpendicular to the x-axis and the direction ratios of the second line are (1,2,-1) then which are the possible equation(s) of the third line

A variable line passing through the point P(0, 0, 2) always makes angle 60^(@) with z-axis, intersects the plane x+y+z=1 . Find the locus of point of intersection of the line and the plane.

The equation of the line passing through (1, 1, 1) and perpendicular to the line of intersection of the planes x+2y-4z=0 and 2x-y+2z=0 is

The equation of the line passing though the point (1,1,-1) and perpendicular to the plane x -2y - 3z =7 is :

The plane passing through the point (5,1,2) perpendicular to the line 2 (x-2) =y-4 =z-5 will meet the line in the point :

Find the perpendicular distance of the point (1, 1, 1) from the line (x-2)/(2)=(y+3)/(2)=(z)/(-1) .

If plane passes through the point (1, 1,1) and is perpendicular to the line, (x-1)/3=(y-1)/0=(z-1)/4 , then its perpendicular distance from the origin is

If plane passes through the point (1, 1,1) and is perpendicular to the line, (x-1)/3=(y-1)/0=(z-1)/4 , then its perpendicular distance from the origin is

A point Q at a distance 3 from the point P(1, 1, 1) lying on the line joining the points A(0, -1, 3) and P has the coordinates

Comprehension (Q.6 to 8) A line is drawn through the point P(-1,2) meets the hyperbola x y=c^2 at the points A and B (Points A and B lie on the same side of P) and Q is a point on the lien segment AB. If the point Q is choosen such that PQ, PQ and PB are inAP, then locus of point Q is x+y(1+2x) (b) x=y(1+x) 2x=y(1+2x) (d) 2x=y(1+x)