The line `(x-2)/(3)=(y+1)/(2)=(z-1)/(-1)` intersects the curve `xy=c^2, z=0,` if c is equal to

If the lines : (x-1)/2 =(y+1)/3 =(z-1)/4 and (x-3)/1=(y-k)/2 =z/1 intersect , then k is equal to :

Given the line L=(x-1)/3 =(y+1)/2 =(z-3)/(-1) and the plane pi:x-2y-z=0 , of the following assertions, the only one that is always true is:

If the straight lines: (x-1)/k=(y-2)/2=(z-3)/3 and (x-2)/3 =(y-3)/k =(z-1)/2 intersect at a point, then the integer k is equal to :

The image of the line (x-1)/3=(y-3)/1=(z-4)/(-5) in the plane : 2x-y+z+3=0 is the line :

The angle between the line (x-2)/3 = (y+1)/1 = (z-2)/(-1) and the plane 3x-4y+z = 3 is

Lines (x-1)/2=(y+1)/3 =(z-1)/4 and (x-3)/1=(y-k)/1=z/1 intersects , then k equals :

Let the line (x-2)/3=(y-1)/(-5)=(z+2)/2 lie in the plane x+3y-alpha z+beta =0 . Then (alpha,beta) equals :

The distance of the point (1,0,2) from the point of intersection of the line (x-2)/(3)=(y+1)/(4)=(z-2)/(12) and the plane x-y+z=16 is