Standing Wave Summation1970-01-01T00:00:00+00:00Animation showing how the standing wave is formed by the addition of a wave (green) and its reflection (red). The resulting (purple) wave is formed by the sum of these two waves. Notice how at fixed points the standing wave has no amplitude. These poin...PT2Shttps://d3e1m60ptf1oym.cloudfront.net/1a7eaa93-c9d9-40e9-b961-6668c7598739/Standing-wave-summation-perspective-FHD-Russell-Kightley_xlarge.jpghttps://d3e1m60ptf1oym.cloudfront.net/1a7eaa93-c9d9-40e9-b961-6668c7598739/Standing-wave-summation-perspective-FHD-Russell-Kightley_mp4_hd_video.mp4https://www.scientific.pictures/-/galleries/waves/-/medias/1a7eaa93-c9d9-40e9-b961-6668c7598739/pricehttps://www.scientific.pictures/-/galleries/waves/-/medias/1a7eaa93-c9d9-40e9-b961-6668c7598739/price
Standing Wave Summation
Animation showing how the standing wave is formed by the addition of a wave (green) and its reflection (red). The resulting (purple) wave is formed by the sum of these two waves. Notice how at fixed points the standing wave has no amplitude. These points are called nodes and their positions are shown by fine grey vertical lines. Standing waves like these are set up in musical instruments and there are various harmonic frequencies that can form these standing waves inside a given resonator.
Animation ID: STANDING-WAVE-Russell-Kightley-FHD
Duration: 00:04
copyright Russell Kightley
Animation resolution: 1920x1080 pixels @ 30.0 fps, ~27.5 Mbits/s
Animation keywords: addition, amplitude, crest, frequency, harmonic, instrument, interference, light, music, musical, nodal, node, nodes, oscillate, oscillating, oscillation, pattern, phase, physics, point, propagate, propagated, propagation, pulse, pulses, resonance, resonator, ripple, sinuoidal, standing, standing wave, sum, superposition, superpositioning, transverse, travelling, trough, undulate, undulation, vibrating, vibration, wave, waveform, wavelength, waves
Standing Wave Summation2020-08-13T01:34:14ZAnimation showing how the standing wave is formed by the addition of a wave (green) and its reflection (red). The resulting (purple) wave is formed by the sum of these two waves. Notice how at fixed points the standing wave has no amplitude. These poin...PT4Shttps://d3e1m60ptf1oym.cloudfront.net/e5f969bd-5bf7-44ea-975e-8f04aab7f149/STANDING-WAVE-Russell-Kightley-FHD_xlarge.jpghttps://d3e1m60ptf1oym.cloudfront.net/e5f969bd-5bf7-44ea-975e-8f04aab7f149/STANDING-WAVE-Russell-Kightley-FHD_mp4_hd_video.mp4https://www.scientific.pictures/-/galleries/waves/-/medias/e5f969bd-5bf7-44ea-975e-8f04aab7f149/pricehttps://www.scientific.pictures/-/galleries/waves/-/medias/e5f969bd-5bf7-44ea-975e-8f04aab7f149/price
Sine wave and cosine wave animation1970-01-01T00:00:00+00:00Animation of a sine wave or sinusoidal wave (sine curve or sine function) and its corresponding cosine wave
SINE WAVES (y = sin x) are ubiquitous. They represent the behaviour of a simple oscillator. This animation illustrates the relationship betwe...PT33Shttps://d38zjy0x98992m.cloudfront.net/2199e3f9-e2c4-42b7-831f-fb3d58b4f310/SINE_COSINE_UHD_265_xlarge.jpghttps://d38zjy0x98992m.cloudfront.net/2199e3f9-e2c4-42b7-831f-fb3d58b4f310/SINE_COSINE_UHD_265_mp4_hd_video.mp4https://www.scientific.pictures/-/galleries/waves/-/medias/2199e3f9-e2c4-42b7-831f-fb3d58b4f310/pricehttps://www.scientific.pictures/-/galleries/waves/-/medias/2199e3f9-e2c4-42b7-831f-fb3d58b4f310/price