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

The cartesian equation of a line are 6x - 2 = 3y + 1 = 2z - 2. Find its vector equation.

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 (x+3)/(2)=(y-5)/(4)=(z+6)/(2) Find the vector equation for the line.

The cartesian equation of a line is (x-5)/(3)=(y+4)/(7)=(z-6)/(2) .Write its vector form.

The cartesian equations of a line are 3x + 1 = 6y - 2 = 1 - z. Find the fixed point through which it passes, its direction ratios and also its vector equation.

If the cartesian equation of the line (2-x)/(4)=(y-3)/(-2),z+4=0 then its vector equation is ….....

The direction ratios of the line x-y+z-5=0=x-3y-6 are

If a line has direction cosines 2/3,-1/3,-2/3, then find its direction.

A line segment has length 63 and direction ratios are 3, -2, 6. The components of the line vector are

Find the direction cosines of the line (x-2)/(2)=(2y-5)/(-3),z=-1 . Also find the vector equation of the line.