Direction Cosine

In analytic geometry, the direction cosines (or directional cosines) of a vector are the cosines of the angles between the vector and the three positive coordinate axes. Equivalently, they are the contributions of each component of the basis to a unit vector in that direction.

Three-dimensional Cartesian coordinates

If v is a Euclidean vector in three-dimensional Euclidean space, R³,

:$\mathbf v = v_x \mathbf e_x + v_y \mathbf e_y + v_z \mathbf e_z,$

where e_''x'', e_''y'', e_''z'' are the standard basis in Cartesian notation, then the direction cosines are

:$\begin \alpha &= \cos a = \frac &&= \frac,\\ \beta &= \cos b = \frac &&= \frac,\\ \gamma &= \cos c = \frac &&= \frac. \end$

It follows that by squaring each equation and adding the results

:$\cos^2 a + \cos^2 b + \cos^2 c = \alpha^ + \beta^ + \gamma^ = 1.$

Here ''α'', ''β'' and ''γ'' are the direction cosines and the Cartesian coordinates of the unit vector v/, v, , and ''a'', ''b'' and ''c'' are the direction angles of the vector v.

The direction angles ''a'', ''b'' and ''c'' are acute or obtuse angles, i.e., 0 ≤ ''a'' ≤ π, 0 ≤ ''b'' ≤ ''π'' and 0 ≤ ''c'' ≤ ''π'', and they denote the angles formed between v and the unit basis vectors, e_''x'', e_''y'' and e_''z''.

General meaning

More generally, direction cosine refers to the cosine of the angle between any two vectors. They are useful for forming direction cosine matrices that express one set of orthonormal basis vectors in terms of another set, or for expressing a known vector in a different basis.

See also

* Cartesian tensor

References

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*{{MathWorld, title=Direction Cosine, urlname=DirectionCosine, url=http://mathworld.wolfram.com/DirectionCosine.html

Algebraic geometry
Vectors (mathematics and physics)