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• Siacci's_theorem abstract "In dynamics, the acceleration of a particle moving along a curve in space is the time derivative of its velocity. In most applications, the acceleration vector is expressed as the sum of its normal and tangential components, which are orthogonal to each other. Siacci’s theorem, formulated by the Italian mathematician Francesco Siacci (1839–1907), is the kinematical decomposition of the acceleration vector into its radial and tangential components. In general, the radial and tangential components are not orthogonal to each other. Siacci’s theorem is particularly useful in motions where the angular momentum is constant.".
• Siacci's_theorem thumbnail SiacciTheorem.gif?width=300.
• Siacci's_theorem wikiPageExternalLink s11012-010-9296-x.
• Siacci's_theorem wikiPageID "28628021".
• Siacci's_theorem wikiPageRevisionID "548372297".
• Siacci's_theorem hasPhotoCollection Siacci's_theorem.
• Siacci's_theorem subject Category:Dynamics.
• Siacci's_theorem comment "In dynamics, the acceleration of a particle moving along a curve in space is the time derivative of its velocity. In most applications, the acceleration vector is expressed as the sum of its normal and tangential components, which are orthogonal to each other. Siacci’s theorem, formulated by the Italian mathematician Francesco Siacci (1839–1907), is the kinematical decomposition of the acceleration vector into its radial and tangential components.".
• Siacci's_theorem label "Siacci's theorem".
• Siacci's_theorem sameAs m.0czcgzr.
• Siacci's_theorem sameAs Q7506515.
• Siacci's_theorem sameAs Q7506515.
• Siacci's_theorem wasDerivedFrom Siacci's_theorem?oldid=548372297.
• Siacci's_theorem depiction SiacciTheorem.gif.
• Siacci's_theorem isPrimaryTopicOf Siacci's_theorem.