The equation of a line are `(4-x)/(2)=(y+3)/(2)=(z+2)/(1)`. Find the direction cosines of a line parallel to the above line.

If the cartesian equation of a line AB is (x-1)/(2)=(2y-1)/(12)=(z+5)/(3) , then the direction cosines of a line parallel to AB are -

The cartesian equation of a line AB is (3-x)/(1)=(y+2)/(-2)=(z-5)/(4) . Find the direction ratios of a line parallel to AB.

The cartesian equation of a line AB is (3-x)/1=(y+2)/-2=(z-5)/4 . Find the direction ratios of a line parallel to AB.

The Cartesian equation of a line is (x-3)/2=(y+1)/(-2)=(z-3)/5 . Find the vector equation of the line.

The cartesian equation of a line is (2x-5)/(3)=(6-3y)/(2)=(z+1)/(6) . Find the direction ratios of the given line.

The cartesian equation of a line is (x+3)/(2)=(y-5)/(4)=(z+6)/(2) . the vector equation for the line.

If the equation of a straight line is 6x-2=3y+1=2z-2 , then direction cosines of the line are -

The direction cosines of the line (x+3)/(2)=(2y-3)/(-3)=(z-1)/(0) are -

The Cartesian equations of a line are 6x-2=3y+1=2z-2. Find its direction ratios and also find a vector equation of the line.

Write the direction cosines of the line 6x-2=3y+1=2z-4 .