Prove that three lines drawn from origin with direction cosines proportional to `(1,-1,1),(2,-3,0),(1,0,3)` lie on one plane .

Prove that the three lines drown from origin with direction cosines (l_1,m_1,n_1),(l_2,m_2,n_2),(l_3,m_3,n_3) are coplanar if [[l_1,m_1,n_1],[l_2,m_2,n_2],[l_3,m_3,n_3]]=0.

Write the direction cosines of the line joining (1,2,3) and (1,1,2).

Find the direction cosines of the line (4-x)/2=y/2=(1-z)/3

Find the direction cosines of the line segment joining (1,-1,2) and (2,1,1).

Find the direction cosines of the line (x-4)/3=(y-2)/6=(z-1)/3 .

Find the direction cosines of the line segment joining (3,6,1) and (4,-1,5).

Write the direction cosines of the normal to the plane x-y+1=0 .

What are the direction cosines of the line (x-2)/(2)=(y+4)/(3)=(z-1)/6

The line passing through (0,0,0) and (1,2,3) has direction cosines (-1,-2,-3)