COSMOCOMP 1st Brochure

Part 20 In MATHEVERSUM

d) Now somewhere in MATHEVERSUM on some "red" CUBE-C^2 is pressing mathematical "pink" force of:

{[(KAZIUK – 1) * KAZIUK * (STRINGOR)] / [(SHORTEK * KAZIUK)^2 * SHORTEK]} * SPEED-C =

(KAZIUK – 1) * {{KAZIUK * (STRINGOR)] / [(SHORTEK * KAZIUK)^2 * SHORTEK]} * SPEED-C} =

= (KAZIUK – 1) * (C^2) =

= C^3 – C^2

And now the total mathematical force pressing jointly on HYPERCUBE-C^3 is:

"red" C^2 + "pink" (C^3 – C^2) =

= C^3

In this situation, the density in "green" HYPERCUBE-C^3 increases by:

KAZIUK times

and it is:

{[KAZIUK * KAZIUK * (STRINGOR)] / [(SHORTEK * KAZIUK)^2 * SHORTEK]} * SPEED-C =

= {[KAZIUK^2 * (STRINGOR)] / [(SHORTEK * KAZIUK)^2 * SHORTEK]} * SPEED-C

it's because:

{[KAZIUK^2 * (STRINGOR)] / [(SHORTEK * KAZIUK)^2 * SHORTEK]} * SPEED-C =

= C^3

When the density in HYPERCUBE-C^3 is greater by KAZIUK times, HYPERCUBE-C^3 is lowered in the fourth dimension by the same number of times.

And because:

KAZIUK * SHORTEK / KAZIUK =

= SHORTEK

there is no longer "green" HYPRCUBE-C^3, instead there is final "black" CUBE-C^3.

Pic.28

In the four-dimensionality of MATHEVERSUM, this final CUBE-C^3 lies on its side. Thus it's speed in some direction of the three-dimensionality of MATHEVERSUM is 100%c.