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Key details consistent with a microphone-centric event: * The necklace snaps at the chain links directly below the microphone. The visible clasp allows the semi-rigid square-link necklace to form a clean right-angle bend as it passes over the head. * The trajectories of the microphone shrapnel (PCB board and...

58,022 views • 2 months ago •via X (Twitter)

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Using the standardized formula of penetration depth of shaped charges with the density of human flesh we have determined the exact charge needed to penetrate the sternum and reach the C7 vertebrae. With around 2 grams of PETN copper and lead fragmentation could reach the C7 vertebrae matching the reports from the medical examination. This also matches the energetic release mapped with the modified pixel flow analysis which pinpointed the epicenter in the attached video. Additionally, for this shaped charge to have maximum performance a standoff distance of 2cm would be needed. This could be accomplish by a preliminary charge to blow open the case of the wireless microphone to create some distance between it and the target. This preliminary charge can be seen in the subtitle movement of the magnetic clasp across his chest before the shaped charge is detonated which causes the main wound channel. The slight movement of the shirt collar preceded the shaped charge force which blew the necklace up and over his head from the expansive gas escaping from the shaped charge as it detonated. The wound from this shaped charge would have stopped his heart in under 2 seconds which also explains the bleeding patterns we witnessed from the neck wound. (More on this later) To calculate the explosive charge needed to penetrate 14 cm of a material with a density of 1060 kg/m³, we use the same hydrodynamic theory from *Fundamentals of Shaped Charges* as in the previous calculation. The penetration depth \( P \) for a conical shaped charge is given by: \[ P = k \cdot D \] where: - \( P \) is the penetration depth (in cm), - \( D \) is the cone diameter (liner base diameter, in cm), - \( k \) is the penetration efficiency factor. Result: The required explosive charge mass to penetrate 14 cm of a material with a density of 1060 kg/m³ is approximately **2.16 grams**.

Jon Bray

133,285 views • 8 months ago