1. A wave packet, also called wave group, can be described in terms of a superposition of plane waves of different wavelengths. The phase velocity, i.e., the rate at which the wave propagates, is given by vp =w/k where w and k denote the angular frequency and wave number, respectively. The wave group has a velocity different from the phase velocities of the waves that make it up, which is called the group velocity given by vg = dw/dk. For the de Broglie wave of a particle with relativistic momentum p = ymv and relativistic energy E = ymc²: a) Calculate vp and vg. b) Show that (i) the de Broglie group velocity is the speed of the particle and (ii) the de Broglie phase velocity is greater than c.

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1. A wave packet, also called wave group, can be described in terms of a superposition of plane waves of different wavelengths. The phase velocity, i.e., the rate at which the wave propagates, is given by v, = w/k where w and k denote the angular frequency and wave number, respectively. The wave group has a velocity different from the phase velocities of the waves that make it up, which is called the group velocity given by vg = dw/dk. For the de Broglie wave of a particle with relativistic momentum p = ymv and relativistic energy E = ymc?: a) Calculate v, and vg. b) Show that (i) the de Broglie group velocity is the speed of the particle and (ii) the de Broglie phase velocity is greater than c.