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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 2x−1=4y−2=z−3 and y−mx=z=0. For what value of m will the two lines intersect?
Technique
Skew-line shortest distance =∥d1×d2∥∣(P2−P1)⋅(d1×d2)∣; intersection ⟺ numerator =0.
Solution
Step 1 — Identify points and direction vectors
Line L1: through P1=(1,2,3) with direction d1=(2,4,1).
Line L2: z=0 and y=mx, i.e. through P2=(0,0,0) with direction d2=(1,m,0).
Step 2 — Common perpendicular direction
d1×d2=i21j4mk10=(4⋅0−1⋅m, 1⋅1−2⋅0, 2m−4)=(−m, 1, 2m−4).
With w=P2−P1=(−1,−2,−3),
S.D.=∥d1×d2∥∣w⋅(d1×d2)∣.
Numerator: w⋅(−m,1,2m−4)=(−1)(−m)+(−2)(1)+(−3)(2m−4)=m−2−6m+12=10−5m.
Denominator: m2+1+(2m−4)2=5m2−16m+17.
Answer
S.D.=5m2−16m+17∣10−5m∣=5m2−16m+175∣2−m∣.