Lissajousfigurák

Lissajousfigurák, also known as Lissajous curves, are a set of parametric curves discovered by Nathaniel Bowditch in 1815 and later studied by Jules Antoine Lissajous in 1857. These figures are generated by the composition of two perpendicular simple harmonic motions with arbitrary frequencies and initial phase differences. The general form of the parametric equations for a Lissajous figure is given by x(t) = A sin(at + δ) and y(t) = B sin(bt), where A and B represent the amplitudes, a and b represent the frequencies, and δ is the phase difference between the two oscillations.

The shape of a Lissajous figure is highly dependent on the ratio of the frequencies a/b and

Lissajous figures have found applications in various fields, including experimental physics, where they can be used