L1:−3x−2=2y−6=4z−7
Point C on L1: (−3λ1+2,2λ1+6,4λ1+7)
L2:2x−4=1y−3=3z−5
Point D on L2: (2λ2+4,λ2+3,3λ2+5)
Dr's of line L3 :
L3:−32λ2+3λ1+2=5λ2−2λ1−3=163λ2−4λ1−2
λ1=−3,λ2=2
C(11,0,−5)
D(8,5,11)
∣CD∣2=32+52+162=290
Let the line L1 be parallel to the vector −3i^+2j^+4k^ and pass through the point (2,6,7), and the line L2 be parallel to the vector 2i^+j^+3k^ and pass through the point (4,3,5). If the line L3 is parallel to the vector −3i^+5j^+16k^ and intersects the lines L1 and L2 at the points C and D, respectively, then ∣CD∣2 is equal to :
Held on 21 Jan 2026 · Verified 6 Jul 2026.
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312
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290
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Work through every JEE Main Vectors & 3D Geometry PYQ, year by year.