Introducing a Duodecimal Diagram that uses Base Twelve Math (otherwise known as The Dozenal System) скачать в хорошем качестве

Introducing a Duodecimal Diagram that uses Base Twelve Math (otherwise known as The Dozenal System)

This is another video in a series where I am introducing and explaining to the viewer the inner workings of base twelve math and base twelve geometry. My intent is to share the fact that the only way to construct a diagram that generates the division of the circle into 360 degrees is by using base twelve geometry. In this video I am introducing the viewer to the diagram which does just that. I see this as continuing the process of easing the viewer into the world of base twelve geometry and base twelve math by giving some examples of simple comparisons between the bases with regard to the degrees, as well as comparing what it looks like to count in groups of 24 - in base twelve. I am also introducing the base twelve version of the formula for calculating the interior angles of a polygon: (n-2) x 130 / n This will be a formula we use for each ring of the diagram as we progress through the rings - eventually reaching a circle with 720 points equally spaced throughout its circumference. Also within this diagram is the geometry that contains the base twelve version of Pi. You will be able to find the entire series of videos on my youtube channel under the playlist: Explaining base Twelve Pi.