| Re: 0.999...=1
Infinite series are good and useful as far as they are proven to be convergence and laid the foundation for the mathematics of infinitesimal calculus: differential and integral. But the fact is there are more divergence series than there are convergence. That is why the theory of limits is only applicable to an uncountable real domain of applicability. It's applicability to the complex imaginary domain is questionable since infinity is defined in complex analysis as the largest complex imaginary number at the north pole of Riemann complex sphere.
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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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