how to find orthonormal vector with condition?

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Sara
Sara on 23 Sep 2025 at 8:44
Commented: Sara on 25 Sep 2025 at 10:50
Hello,
This should be simple, but I can't figure it out. I need to create an orthonormal vector whose x component is as close to 0 as possible. So far I know how to get the orthonormal basis of my vector but how can I find a vector within the basis that meets the condition of being as close to 0 as possible?
a = [x y z]; % my vector
n = null(a.'); % orthonormal basis
  2 Comments
Torsten
Torsten on 23 Sep 2025 at 10:28
Edited: Torsten on 23 Sep 2025 at 11:20
If y = 0, take [0, 1, 0]. If y ~= 0, take [0,-z,y]/sqrt(y^2+z^2).

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Answers (2)

Matt J
Matt J on 23 Sep 2025 at 13:03
n=[0,null([y,z])']
John D'Errico
John D'Errico on 23 Sep 2025 at 13:04
Edited: John D'Errico on 23 Sep 2025 at 14:03
Ran in:
Confusing question. Which probably means I'm misunderstanding your goal here, or that I am myself confused, which is not uncommon. But I'll take a shot.
Consider a vector v.
v = randn(1,4)
v = 1×4
0.5393 0.4693 0.4517 -1.3974
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I want to find a vector u orthogonal to v, but it must have the property that u(1)==0? That is simple.
U = null(v(2:end))
U = 3×2
-0.2930 0.9064 0.9342 0.2036 0.2036 0.3702
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The columns of U contain 2 vectors, such that in each case if I expand them by padding a zero element as the first element, the new vectors will be orthogonal to v, AND they themselves have unit norm.
u1 = [0;U(:,1)]
u1 = 4×1
0 -0.2930 0.9342 0.2036
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u2 = [0;U(:,2)]
u2 = 4×1
0 0.9064 0.2036 0.3702
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dot(v,u1)
ans = 1.3878e-16
dot(v,u2)
ans = -2.7756e-16
norm(u1)
ans = 1
norm(u2)
ans = 1.0000
And to within floating point trash, they satisfy the requirements. u2 and u2 are not unique of course. But u1 and u2 form an orthonormal set with first element zero, that are each normal to v.
It would have been a somewhat more interesting question if the requirement was to find an orthonormal set with the property that u(1) was some other given number, perhaps 1/2. (Its not too difficult to modify the scheme I used in that case.) But zero is pretty easy.

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