Abstract
Abstract
The oscillations of one mass m suspended between two different springs, assuming a friction force proportional to the velocity
(
x
˙
)
, have been studied. For this purpose, an assembly for this system has been made. The movement of the mass is recorded with a smartphone and analysed with Tracker. It is obtained that the graph of the position of the mass m in function of the time is similar to that of an underdamped harmonic oscillator. The registered data with Tracker are exported to Excel and fit to a nonlinear model through the expression
x
(
t
)
=
A
e
−
λ
t
sin
(
ω
t
+
α
)
. The nonlinear equation of motion is numerically solved with the free Octave package. This solution es very sensitive to the mass of the particle and the stretching of the springs.
Subject
General Physics and Astronomy,Education