Plane with normal vector a) If unit normal vector is ( a 1 </msub> ,

arbixerwoxottdrp1l

arbixerwoxottdrp1l

Answered question

2022-05-14

Plane with normal vector
a) If unit normal vector is ( a 1 , b 1 , c 1 ) , , then, how the point P 1 on the plane becomes ( D a 1 , D b 1 , D c 1 ) ? ?
b) If unit normal is ( 1 / 3 , 2 / 3 , 2 / 3 ) then P 1 becomes ( 2 / 3 , 4 / 3 , 4 / 3 ) Where D = 2. We know that normal vector began on the plane at point P 1 and ends at ( 1 / 3 , 2 / 3 , 2 / 3 ) . My questions is how unit normal vector coordinates value less than P 1 coordinates value, because unit normal vector pointing outside of the plane it should be greater coordinates value than P 1 ?

Answer & Explanation

Mathias Patrick

Mathias Patrick

Beginner2022-05-15Added 22 answers

Step 1
The coordinates of a point P are the coordinates of the vector O P , with O the origin. The coordinates of a vector A B are the coordinates of its end point B minus the coordinates of its starting point A:
A B = O B O A .
a) We are told that P 1 is at distance D of the origin O and its direction is given by the vector n 1 . In other words, O P 1 = α n 1 for some positive real number α . Since n 1 is a unit vector, we have
D = O P 1 = α n 1 = α ,
which implies O P 1 = D n 1 . Thus the coordinates of P 1 are ( D a 1 , D b 1 , D c 1 ) with ( a 1 , b 1 , c 1 ) the coordinates of n 1 .
b) If n 1 starts at P 1 and ends at a point Q 1 , i.e.
n 1 = P 1 Q 1 , then the coordinates of Q 1 are the sum of the coordinates of P 1 and n 1 , which gives ( ( D + 1 ) a 1 , ( D + 1 ) b 1 , ( D + 1 ) c 1 ) . If n 1 is ( 1 / 3 , 2 / 3 , 2 / 3 ) and D = 2 then P 1 has coordinates ( 2 / 3 , 4 / 3 , 4 / 3 ) and n 1 ends at Q 1 with coordinates ( 1 , 2 , 2 )

Do you have a similar question?

Recalculate according to your conditions!

New Questions in High school geometry

Ask your question.
Get an expert answer.

Let our experts help you. Answer in as fast as 15 minutes.

Didn't find what you were looking for?