1) What factor allows one to know how many instantons of a set tori-sector-range needs to iterate in order to define when a first-ordered point particle of a superstring, of the described tori-sector-range, will be recycled from being converted with indistinguishable difference into a different form of differential geometry while then being recycled back with a similar tense of indistinguishable difference back into the same general format of differential geometry?
2) What are the two general differential geometry types?
3) Describe in general how norm-state-related first-ordered point particles of the substringular are recycled.
4) Describe in general how ground-state-related first-ordered point particles of the substringular are recycled.
5) When both limits of the Royal Arc are commuted through recycling, what is this shape?
6) What is this prior mentioned shape in reference to test statement "6" as integrated along one general main world-sheet?
7) Describe why there are, in-between the durations of each instanton, instanton-quaternionic-field-impulses.
8) Describe how tori-sector-ranges vary in flow.
9) Describe why a "steady-state" related superstring must constantly, in-between the duration of each instanton, travel along the whole orbit of the Continuum.
10) What fascillitates the binding of superstrings in the globally distinguishable?
11) Why must substringular travel be almost instantaneous in terms of our terrestrial time?
12) Why is dark phenomena essential in order for any phenomena to exist at all under our present conditions of time and space?
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