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UPSC 2024 Maths Optional Paper 1 Q2c — Step-by-Step Solution 20 marks · Section A
Plane · Analytic Geometry · asked 5× in 13 yrs · Read the full method →
Question
Find the image of the line x = 3 − 6 t , y = 2 t , z = 3 + 2 t x=3-6t,\;y=2t,\;z=3+2t x = 3 − 6 t , y = 2 t , z = 3 + 2 t in the plane 3 x + 4 y − 5 z + 26 = 0 3x+4y-5z+26=0 3 x + 4 y − 5 z + 26 = 0 .
Technique
Find where the line meets the plane (this point is its own reflection); reflect the direction vector in the plane; write the image line through that point with the reflected direction.
Solution
Step 1 — Identify line and plane.
Direction of line: d ⃗ = ( − 6 , 2 , 2 ) \vec d=(-6,2,2) d = ( − 6 , 2 , 2 ) (or simplified ( − 3 , 1 , 1 ) (-3,1,1) ( − 3 , 1 , 1 ) ). A point on the line: P 0 = ( 3 , 0 , 3 ) P_0=(3,0,3) P 0 = ( 3 , 0 , 3 ) at t = 0 t=0 t = 0 .
Plane normal: n ⃗ = ( 3 , 4 , − 5 ) \vec n=(3,4,-5) n = ( 3 , 4 , − 5 ) , ∣ n ⃗ ∣ 2 = 50 |\vec n|^2=50 ∣ n ∣ 2 = 50 .
Step 2 — Intersection of the line with the plane.
Substitute the line into 3 x + 4 y − 5 z + 26 = 0 3x+4y-5z+26=0 3 x + 4 y − 5 z + 26 = 0 :
3 ( 3 − 6 t ) + 4 ( 2 t ) − 5 ( 3 + 2 t ) + 26 = 9 − 18 t + 8 t − 15 − 10 t + 26 = 20 − 20 t = 0 ⇒ t = 1. 3(3-6t)+4(2t)-5(3+2t)+26=9-18t+8t-15-10t+26=20-20t=0\;\Rightarrow\;t=1. 3 ( 3 − 6 t ) + 4 ( 2 t ) − 5 ( 3 + 2 t ) + 26 = 9 − 18 t + 8 t − 15 − 10 t + 26 = 20 − 20 t = 0 ⇒ t = 1.
The intersection point P 1 = ( − 3 , 2 , 5 ) P_1=(-3,2,5) P 1 = ( − 3 , 2 , 5 ) lies on the plane and is its own image.
Step 3 — Reflect the direction d ⃗ \vec d d in the plane.
d ⃗ ′ = d ⃗ − 2 d ⃗ ⋅ n ⃗ ∣ n ⃗ ∣ 2 n ⃗ , d ⃗ ⋅ n ⃗ = ( − 3 ) ( 3 ) + ( 1 ) ( 4 ) + ( 1 ) ( − 5 ) = − 10. \vec d'=\vec d-2\frac{\vec d\cdot\vec n}{|\vec n|^2}\vec n,\qquad \vec d\cdot\vec n=(-3)(3)+(1)(4)+(1)(-5)=-10. d ′ = d − 2 ∣ n ∣ 2 d ⋅ n n , d ⋅ n = ( − 3 ) ( 3 ) + ( 1 ) ( 4 ) + ( 1 ) ( − 5 ) = − 10.
d ⃗ ′ = ( − 3 , 1 , 1 ) − 2 ⋅ − 10 50 ( 3 , 4 , − 5 ) = ( − 3 , 1 , 1 ) + 2 5 ( 3 , 4 , − 5 ) = ( − 9 5 , 13 5 , − 1 ) . \vec d'=(-3,1,1)-2\cdot\frac{-10}{50}(3,4,-5)=(-3,1,1)+\tfrac{2}{5}(3,4,-5)=\Bigl(-\tfrac{9}{5},\tfrac{13}{5},-1\Bigr). d ′ = ( − 3 , 1 , 1 ) − 2 ⋅ 50 − 10 ( 3 , 4 , − 5 ) = ( − 3 , 1 , 1 ) + 5 2 ( 3 , 4 , − 5 ) = ( − 5 9 , 5 13 , − 1 ) .
Multiply by 5 5 5 : d ⃗ ′ = ( − 9 , 13 , − 5 ) \vec d'=(-9,13,-5) d ′ = ( − 9 , 13 , − 5 ) .
Step 4 — Image line.
Through P 1 = ( − 3 , 2 , 5 ) P_1=(-3,2,5) P 1 = ( − 3 , 2 , 5 ) with direction ( − 9 , 13 , − 5 ) (-9,13,-5) ( − 9 , 13 , − 5 ) :
Answer
x + 3 − 9 = y − 2 13 = z − 5 − 5 . \boxed{\;\frac{x+3}{-9}=\frac{y-2}{13}=\frac{z-5}{-5}.\;} − 9 x + 3 = 13 y − 2 = − 5 z − 5 .