So these giants have heads that are able to contain entire galaxies, and compress them to a size less than that of a human? Let's find the energy required to compress said galaxy to that size.
Using GBE. Using Milky Way as a reference for the galaxy since it's the galaxy that we live in.
- person height = 165.8px = 1.8m
- galaxy diameter = 90px = 0.978m (radius = 0.489m)
- Mass of Milky Way = 0.8 to 1.5 trillion solar masses
- solar mass/Mass of sun = 1.989e30 kg
- mass of Milky Way = (1.5912e42 kg) to (2.9835e42 kg) ->
GBE[]
- GBE = 3*(G)*(Mass^2)/(5*radius)
- GBE = 3*(6.67e-11)*((1.5912e42 kg)^2)/(5*0.489m)
- GBE = 2.071e74 Joules
Now for one more....[]
- Half a woman's body height = 53px = 0.85m (if she is 1.7m)
- Galaxy diameter = 36px = 0.5774m (radius = 0.2887m)
- mass of galaxy = 1.5912e42 kg
GBE[]
- GBE = 3*(G)*(Mass^2)/(5*radius)
- GBE = 3*(6.67e-11)*((1.5912e42 kg)^2)/(5*0.2887m)
- GBE = 3.51e74 Joules