Right-hand rule: Difference between revisions

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imported>Paul Wormer
 
imported>Paul Wormer
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The direction of the unit vector '''e'''<sub>z</sub> given as the cross product of unit vectors along the ''x''- and ''y''-axis is given by the right-hand rule, see photograph.
The direction of the unit vector '''e'''<sub>z</sub> given as the cross product of unit vectors along the ''x''- and ''y''-axis is given by the right-hand rule, see photograph.
The case depicted here has a right (90° degree) angle &alpha; between the ''x''- and the ''y''-axis. However, the rule works for ''any'' angle &alpha; between ''x''- and ''y''-axis, as long as  0° < &alpha; &le; 180°. The ''z''-axis is always perpendicular to the plane containing the ''x''- and ''y''-axes.

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Right-hand rule. Move open palm of right hand from x  to y, then thumb is direction of z.

The right-hand rule is a rule that appears in the cross product,

The direction of the unit vector ez given as the cross product of unit vectors along the x- and y-axis is given by the right-hand rule, see photograph.

The case depicted here has a right (90° degree) angle α between the x- and the y-axis. However, the rule works for any angle α between x- and y-axis, as long as 0° < α ≤ 180°. The z-axis is always perpendicular to the plane containing the x- and y-axes.