← 2016 Paper 1

UPSC 2016 Maths Optional Paper 1 Q1e — Step-by-Step Solution

10 marks · Section A

Shortest distance between two skew lines · Analytic Geometry · asked 4× in 13 yrs · Read the full method →

Question

Find the shortest distance between the lines x12=y24=z3\dfrac{x-1}{2}=\dfrac{y-2}{4}=z-3 and ymx=z=0y-mx=z=0. For what value of mm will the two lines intersect?

Technique

Skew-line shortest distance =(P2P1)(d1×d2)d1×d2=\dfrac{|(\mathbf{P_2}-\mathbf{P_1})\cdot(\mathbf d_1\times\mathbf d_2)|}{\|\mathbf d_1\times\mathbf d_2\|}; intersection     \iff numerator =0=0.

Solution

Step 1 — Identify points and direction vectors

Line L1L_1: through P1=(1,2,3)P_1=(1,2,3) with direction d1=(2,4,1)\mathbf d_1=(2,4,1). Line L2L_2: z=0z=0 and y=mxy=mx, i.e. through P2=(0,0,0)P_2=(0,0,0) with direction d2=(1,m,0)\mathbf d_2=(1,m,0).

Step 2 — Common perpendicular direction

d1×d2=ijk2411m0=(401m, 1120, 2m4)=(m, 1, 2m4).\mathbf d_1\times\mathbf d_2=\begin{vmatrix}\mathbf i&\mathbf j&\mathbf k\\2&4&1\\1&m&0\end{vmatrix}=(4\cdot0-1\cdot m,\ 1\cdot1-2\cdot0,\ 2m-4)=(-m,\ 1,\ 2m-4).

Step 3 — Shortest distance formula

With w=P2P1=(1,2,3)\mathbf w=P_2-P_1=(-1,-2,-3),

S.D.=w(d1×d2)d1×d2.\text{S.D.}=\frac{|\,\mathbf w\cdot(\mathbf d_1\times\mathbf d_2)\,|}{\|\mathbf d_1\times\mathbf d_2\|}.

Numerator: w(m,1,2m4)=(1)(m)+(2)(1)+(3)(2m4)=m26m+12=105m.\mathbf w\cdot(-m,1,2m-4)=(-1)(-m)+(-2)(1)+(-3)(2m-4)=m-2-6m+12=10-5m. Denominator: m2+1+(2m4)2=5m216m+17.\sqrt{m^2+1+(2m-4)^2}=\sqrt{5m^2-16m+17}.

Answer

  S.D.=105m5m216m+17=52m5m216m+17.  \boxed{\;\text{S.D.}=\frac{|10-5m|}{\sqrt{5m^2-16m+17}}=\frac{5\,|2-m|}{\sqrt{5m^2-16m+17}}.\;}
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