Question

The shortest distance between the lines
$\frac{x-3}{3}=\frac{y-8}{-1}=\frac{z-3}{1}$ and
$\frac{x-3}{-3}=\frac{y-7}{2}=\frac{z-6}{4}$

• A. $\sqrt{10}$
• B. $2\sqrt{20}$
• C. $3\sqrt{30}$
• D. $4\sqrt{40}$

Answer 1

The correct option is C $3\sqrt{30}$

Given lines are $\frac{x-3}{3}=\frac{y-8}{-1}=\frac{z-3}{1}=r_1$ (say) & $\frac{x+3}{-3}=\frac{y+7}{2}=\frac{z-6}{4}=r_2$
Any point on first line is $P(3r_1+3,8-r_1,r_1+3)$ and on second line is $Q(-3-3r_2,2r_2-7,4r_2+6).$ If PQ is the shortest distance, then direction ratios of $PQ=(3r_1+3-(-3-3r_2),8-r_1-(2r_2-7),r_1+3-(4r_2+6\left)\right).$
$=(3r_1+3r_2+6,-r_2-2r_2+15,r_1-4r_2-3).$
As PQ is perpendicular to first line and second line -
$3(3r_1+3r_2+6)+(-1)(-r_1-2r_2+15)+1(r_1-4r_2-3)=0$
Or $11r_1+7r_2=\mathrm{0.....}\left(2\right)$
$-3(3r_1+3r_2+6)+\left(2\right)(-r_1-2r_2+15)+4(r_1-4r_2-3)=0$
Or $7r_1+11r_2=\mathrm{0.....}\left(2\right)$
On solving equation 1 & 2 we get,
$r_1=r_2=0$
So, point $P(3,8,3)$ and $Q(-3,-7,6)$
And length of shortest distance PQ =
$\sqrt{\left\{\right(-3-3{)}^2+(-7-8{)}^2+(6-3{)}^2\}}$
$=3\sqrt{30}$