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×v×B

The expression v × B denotes the cross product of velocity v and magnetic field B in three-dimensional space. The resulting vector is perpendicular to both v and B, with magnitude |v||B|sinθ, where θ is the angle between them. The direction is given by the right-hand rule: if the fingers sweep from v toward B, the thumb points in the direction of v × B.

In physics, the cross product v × B appears in the magnetic part of the Lorentz force

Mathematically, in Cartesian coordinates, v × B = (v_y B_z − v_z B_y, v_z B_x − v_x B_z, v_x

law,
F
=
q(E
+
v
×
B).
Here
q
is
the
electric
charge
and
E
is
the
electric
field.
The
magnetic
force
q(v
×
B)
is
always
perpendicular
to
the
particle’s
velocity,
so
it
does
no
work
on
the
particle
and
changes
only
the
direction
of
motion,
not
its
speed.
In
a
uniform
magnetic
field,
a
particle
with
velocity
perpendicular
to
B
moves
in
a
circle
with
cyclotron
frequency
ωc
=
qB/m
and
radius
r
=
mv/(qB);
if
there
is
a
velocity
component
parallel
to
B,
the
motion
is
helical.
B_y
−
v_y
B_x).
The
cross
product
is
bilinear
and
antisymmetric:
a
×
b
=
−(b
×
a)
and
a
×
(b
+
c)
=
a
×
b
+
a
×
c.
It
is
a
fundamental
operation
in
electromagnetism,
with
applications
ranging
from
particle
dynamics
in
magnetic
fields
to
the
design
of
electric
motors
and
magnetic
confinement
systems.