An update on duo curve analytics possessed by parabola curves of antiquity. Give credit to ancestral intellect observation that captive g-field motive energy can only move in G-field parameters on a parabola curve (up and down in predetermined constant increments, same meter up and same meter down).
Copyright original geometry by the Sandbox;
ALΣXANDΣR; CEO SAND BOX GEOMETRY LLC
February 11, 2019
To honor my mother’s birthday (February 18, 1920), I post an update about duo curve analytics of natural orbit energy curves possessed by using parabola meter. One analytics will use differential calculus and the other needs only Thales observation of right triangle relativity with spin diameters.
go to hyperlink, enter GeoGebra official site, to left click on group, click on ‘my group’, find ‘duo curvature of a parabola’ and click to follow.
https://www.geogebra.org/group/stream/id/V7GAkC4GS
(Differential Geometry; ≅450 years) Let (q) be osculating radius of curvature of vector u head following (A). When event (A) is at (2, 0) curve (q) CoC (G) is at (E; -2, -4). If we move (q) event CoC (E) to (A), we can demonstrate dynamic RoC (GA), using fixed CoC (A) for osculating (Doppelganger p).
Construct osculating curve (q) at (A) using calculus to find RoC @ (-2, -4) = (4√2).
ALΣXANDΣR; CEO SAND BOX GEOMETRY LLC
a sandboxgeometry original philosophical thinkin
