If `l_1: (x-5)/3=(y-7)/(-16)=(z-3)/7 and l_2:(x-9)/3=(y-13)/8=(z-15)/(-5)` the (A) `l_1 and l_2` intersect (B) `l_1 and l_2` are skew (C) distance between `l_1 and l_2` is 14 (D) none of these

L_(1):(x+1)/(-3)=(y-3)/(2)=(z+2)/(1),L_(2):(x)/(1)=(y-7)/(-3)=(z+7)/(2) The lines L_(1) and L_(2) intersect at the point

L_(1):(x+1)/(-3)=(y-3)/(2)=(z+2)/(1),L_(2):(x)/(1)=(y-7)/(-3)=(z+7)/(2) The lines L_(1) and L_(2) are -

L_(1):(x+1)/(-3)=(y-3)/(2)=(z+2)/(1),L_(2):(x)/(1)=(y-7)/(-3)=(z+7)/(2) The lines L_(1) and L_(2) are -

The lines (x-3)/(1)=(y-2)/(2)=(z-3)/(-l) and (x-1)/(l)=(y-2)/(2)=(z-1)/(4) are coplanar if value of l is

Consider the lines l_1:(x-1)/2=(y-1)/-1=z/1 l_2:(x-2)/3=(y-1)/-5=(z+1)/1 Find The shortest distance between the lines l_1 and l_2

Consider the lines : L_1: (x-7)/3=(y-7)/2=(z-3)/1 and L_2: (x-1)/2=(y+1)/4=(z+1)/3 . If a line 'L' whose direction ratios are intersects the lines L_1 and L_2 at A and B respectively, then the distance of (AB)/2 is:

Let L_(1)=(x+3)/(-4)=(y-6)/(3)=(z)/(2) and L_(2)=(x-2)/(-4)=(y+1)/(1)=(z-6)/(1) Which of these are incorrect? (A) L_(1), L_(2) are coplanar. (B) L_(1),L_(2) are skew lines (C) Shortest distance between L_(1),L_(2) is 9 (D) (hat i-4hat j+8hat k) is a vector perpendicular to both L_(1),L_(2)

Let L_1 and L_2 be the lines whose equation are (x-3)/3=(y-8)/-1=(z-3)/1 and (x+3)/--3=(y+7)/2=(z-6)/4 and respectively. A and B are two points on L_1 and L_2 respectively such that AB is perpendicular both the lines L_1 and L_2. Find points A, B and hence find shortest distance between lines L_1 and L_2