\(\def \u#1{\,\mathrm{#1}}\) \(\def \abs#1{\left|#1\right|}\) \(\def \ast{*}\) \(\def \deg{^{\circ}}\) \(\def \tau{\uptau}\) \(\def \ten#1{\times 10^{#1}}\) \(\def \redcancel#1{{\color{red}\cancel{#1}}}\) \(\def \BLUE#1{{\color{blue} #1}}\) \(\def \RED#1{{\color{red} #1}}\) \(\def \PURPLE#1{{\color{purple} #1}}\) \(\def \th#1,#2{#1,\!#2}\) \(\def \lshift#1#2{\underset{\Leftarrow\atop{#2}}#1}}\) \(\def \rshift#1#2{\underset{\Rightarrow\atop{#2}}#1}}\) \(\def \dotspot{{\color{lightgray}{\circ}}}\) \(\def \ccw{\circlearrowleft}\) \(\def \cw{\circlearrowright}\)
Chapter 10: Waves
2.

Frequency

The frequency of a wave has a second meaning, if we imagine the medium made up of a series of oscillators. Watch the red dot in this animation, which represents one such oscillator. Every time a pulse passes through it, the oscillator undergoes one complete cycle. Thus the frequency of the wave is also the frequency of the oscillators that make up the wave.

Pulses and waves can have many different shapes, but the ones we will study are sinusoidal waves, and appear as sines or cosines.