| Re: missing mass -
11-07-2007, 12:59 PM
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Originally Posted by dleviwing Take the MBR wavelength as the diameter of a sphere. Use Planck’s constant to calculate Planck mass. Divide the MBR sphere volume into the volume between galaxies and then multiply that by the Planck mass | The average wavelength of MBR is half a meter which gives the MBR sphere 1 tenth cubic meter. The Planck mass is given as 2.2 of 100-millionth kilogram. Typical distance between galaxies is a million light-years or 10-billion trillions meters gives a volume between galaxies as 4.2 of 10-thousand quadrillion quadrillion quadrillion quadrillion cubic meters, divided into the Planck mass gives a density of half quadrillionth quadrillionth quadrillionth quadrillionth quadrillionth quadrillionth quadrillionth quadrillionth quadrillionth quadrillionth quadrillionth quadrillionth quadrillionth quadrillionth quadrillionth kilogram per cubic meter. This is for all practical purposes, NOTHING! What is missing? The answer is everything which can only mean that the universe is empty.
Time independence: [∂E(g)]²=[∂F(a)×∂r(a)]·[∂F(b)×∂r(b)] and Mass independence: ¶a(t)·¶r(t)=c²
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