Three planes fly in specific directions as shown below. Is there a possibility of a collision between two planes, and if there was a collision, create the collision point? Plane 1: x = 3 + 2t, ,y = -1+ 4t, ,z = 2- tı Plane 2: x = 1+ 4t2 ,y = 1+ 2t, ,z = -3+ 4t2 Plane 3: x = 3 + 2t3,y 2+ t3 ,Z = -2+2t3

Advanced Engineering Mathematics
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ISBN:9780470458365
Author:Erwin Kreyszig
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Three planes fly in specific directions as shown below. Is there a possibility of a
collision between two planes, and if there was a collision, create the collision
point?
Plane 1: x 3 + 2t, ,y = -1+ 4t, ,z = 2 - tı
Plane 2: x 1+ 4t2 ,y = 1+2t2 ,z = -3+ 4t2
Plane 3: x 3 + 2t3 ,y = 2 + tz ,z = -2 + 2t3
Transcribed Image Text:Three planes fly in specific directions as shown below. Is there a possibility of a collision between two planes, and if there was a collision, create the collision point? Plane 1: x 3 + 2t, ,y = -1+ 4t, ,z = 2 - tı Plane 2: x 1+ 4t2 ,y = 1+2t2 ,z = -3+ 4t2 Plane 3: x 3 + 2t3 ,y = 2 + tz ,z = -2 + 2t3
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