A line from the origin meets the lines `(x-2)/1=(y-1)/-2=(z+1)/1` and `(x-8/3)/2=(y+3)/-1=(z-1)/1` at `P` and `Q` respectively. If length `PQ = d`, then `d^2` is

A line from origin meets the lines (x-2)/(1)=(y-1)/(-2)=(z+1)/(1) and (x-(8)/(3))/(2)=(y+3)/(-1)=(z-1)/(1) at P and Q respectively. Find the square of the distance between P and Q.

The lines (x-2)/(1)=(y-3)/(2)=(z-4)/(3) and (x-1)/(-5)=(y-2)/(1)=(z-1)/(1) are

The lines (x-2)/(1)=(y-3)/(2)=(z-4)/(3)and(x-1)/(-5)=(y-2)/(1)=(z-1)/(1) are

Show that the lines (x-1)/2=(y-3)/-1=(z)/-1 and (x-4)/3=(y-1)/-2=(z+1)/-1 are coplanar.

The lines (x)/(1)=(y)/(2)=(z)/(3) and (x-1)/(-2)=(y-2)/(-4)=(3-z)/(6) are

The lines (x)/(1)=(y)/(2)=(z)/(3)and(x-1)/(-2)=(y-2)/(-4)=(z-3)/(-6) are

Find the S.D. between the lines : (x-1)/2=(y-2)/3=(z-3)/2 and (x+1)/3=(y-1)/2=(z-1)/5

A line with d.r.s (2,7,-5) is drawn to intersect the lines (x-5)/(3) = (y-7)/(-1) = (z +2)/(1) and ( x +3)/(-3) = (y-3)/(2) = (z-6)/(4) at P and Q respectively. Length of PQ is

Find the S.D. between the lines : x/2=y/-3=z/1 and (x-2)/3=(y-1)/-5=(z+2)/2