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pendules

Pendules is the French term for pendulums, which are devices consisting of a weight (the bob) suspended from a pivot so it can swing freely under gravity. In science and engineering, the simplest and most studied form is the simple pendulum, where a point mass is attached to a lightweight string or rod. The motion is governed by gravity and the geometry of the setup, and can be analyzed as a rotating system around the pivot.

The idealized equation of motion shows that for small angular displacements, the pendulum behaves like a simple

Beyond the simple pendulum, there are physical or compound pendulums, where the swinging body has extended

Applications include timekeeping in pendulum clocks, seismology and gravity studies, and demonstrations of Earth’s rotation, notably

harmonic
oscillator
with
period
T
≈
2π√(L/g),
where
L
is
the
length
of
the
string
and
g
is
the
local
gravitational
acceleration.
Real
pendulums
experience
damping
and
may
be
driven
by
external
forces,
leading
to
a
decaying
amplitude
or
a
steady
oscillation
under
forcing.
The
general
equation
is
θ''
+
(b/mL^2)θ'
+
(g/L)sinθ
=
0,
highlighting
how
angle,
length,
and
friction
influence
behavior.
mass.
In
a
physical
pendulum,
the
period
is
T
=
2π√(I/(m
g
d)),
with
I
the
moment
of
inertia
about
the
pivot
and
d
the
distance
from
the
pivot
to
the
center
of
mass.
These
forms
explain
a
wide
range
of
real-world
devices
and
experiments.
the
Foucault
pendulum.
Historically,
pendulums
contributed
to
ideas
about
isochronism
and
gravity,
with
notable
early
work
by
Galileo
and
Christiaan
Huygens.
The
term
pendules
is
the
French
plural
for
pendulum.