Total Relativistic Energy At Low Speeds Must Include Rotational and Vibrational as Well As Linear Kinetic Energies

All masses will have no motion, linear, rotational and or vibrational kinetic energy. In an earlier paper it was found that the total energy a low speeds is ${E_{total}= m_0c^2 + 1/2m_0v^2 + 1/2I\omega^2 + 1/2kx^2}$. Since, according to Einstein, ${K =(m - m_0)c^2}$, the total kinetic energy of a mass at low speeds must therefore be ${K = 1/2m_0v^2 + 1/2I\omega^2 + 1/2kx^2}$.