metacogitans Posted April 30, 2018 Share Posted April 30, 2018 (∫∫∫∑Wavefront Surface Areaa - ∫∫∫∑Wavefront Surface Areab ) / ∫∫∫ Volume Designated This is a simple metric for wave density of a given volume for two given wave fronts within it, which can be used as a value for mass-energy and mass-volume. As the number of separate wave fronts can be infinite within a given volume, a method for describing wave density is useful, and can also be used to distinguish between the presence of different massive particles - the changing volumes between the surface areas of wave fronts indicates both particle type and number. Link to comment Share on other sites More sharing options...
studiot Posted April 30, 2018 Share Posted April 30, 2018 9 minutes ago, metacogitans said: (∫∫∫∑Wavefront Surface Areaa - ∫∫∫∑Wavefront Surface Areab ) / ∫∫∫ Volume Designated This is a simple metric for wave density of a given volume for two given wave fronts within it, which can be used as a value for mass-energy and mass-volume. As the number of separate wave fronts can be infinite within a given volume, a method for describing wave density is useful, and can also be used to distinguish between the presence of different massive particles - the changing volumes between the surface areas of wave fronts indicates both particle type and number. Would you like to elaborate in this, perhaps with a simple worked example? In particular I am interested in this part of the statement Quote As the number of separate wave fronts can be infinite within a given volume, What exactly do you mean by it and how does it fit with the idea that the wavelength = distance between adjacent wavefronts? Link to comment Share on other sites More sharing options...
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