Orthogonal line needed
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D
Deleted member 4993
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Looks like you have given co-ordinates of 3 points a, b & c. You are asking:
.......line (there is exactly one) that is orthogonal to all three
Orthogonal to what ? - points, position vectors, the plane with those three points or something else?
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These are vectors from (0,0,0).
6.a. Fond all vectors that are orthogonal to E1=(1,0,0).
b. Find all vectors that are orthogonal to both E1 and E2=(0,1,0).
c. Find all vectors that are orthogonal to E1, E2, and E3=(0,0,1). (There is exactly one.)
I think the answer, which I needed, to c. is the zero vector (0,0,0). Thanks.
6.a. Fond all vectors that are orthogonal to E1=(1,0,0).
b. Find all vectors that are orthogonal to both E1 and E2=(0,1,0).
c. Find all vectors that are orthogonal to E1, E2, and E3=(0,0,1). (There is exactly one.)
I think the answer, which I needed, to c. is the zero vector (0,0,0). Thanks.
D
Deleted member 4993
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I just drew an x,y,z diagram and looked at all the unit vectors that were orthogonal to each "E" vector. They would be lines perpendicular in any axis (and no extensions of the lines btw). However, I didn't realize the zero vector, like I stated above, works as orthogonal to all three of "E".
Dr.Peterson
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In your question, you asked for an orthogonal line. Do you see how that completely changed the question?
Dr.Peterson
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Right. A line absolutely is not the same thing as a vector.
And, specifically, there is no line whose direction is given by the zero vector.