**Energy of pair particle photon** is improtant to acommodate Rydberg formula of inverse square saquare gravity which is also electric force.

Force equation is given as follows

$ F = G_3 m_p^2 /r_p^4 = m_p r_p \omega^2 $

Energy equation is given as follows

$ E = m_p c^2 + h' \omega $

if Mercury is also very dense, $ m_p $ is also dependent on $ \omega $.

$ h' = k_1 (G_3 m_p^3/r_p)^{1/2} $

According to Photogravity, Mercury is most hot.

It should be compared with inverse square square Energy level difference.

$ E_{nk} = 1/3 ( G_3 Mm/ 2 r_0 ^3 ) (1/n^2 +1/k^2 ) (1/n^2 -1/k^2 ) $

## electric inverse square caseEdit

Force equation is given as follows

$ F = e_p^2 / 4\pi \epsilon_0 r_p^2 = m_p r_p \omega^2 $

Energy equation is given as follows

$ E = m_p c^2 + h" \omega $

$ h" = k_2 e_p m_p (r_p / \pi \epsilon )^{1/2} $

For Planck we go further to inverse cube forces.