-This probably won't make much sense without reading the previous chapters and some blog posts.-If we extend a spacetime curl to loop again and again, we get a helix.
Although, think about yourself, about where you would be in a helix like one of these.
What would your perspective be, if you were looking out from (one of the momentary distributions that made up a short section of the helix's line,) the helical line? This is similar to the view from a roller coaster while riding it, versus the view of seeing that same roller coaster off to the side, on the ground, not riding it.
Either way, you would not be in the straight centerline of the helix, would you?
But you could look out "to the side" from your position "on the roller coaster" to see more of the helix. Another (probably better) example is to imagine being on a spiral staircase, while trying to see up or down it.
This (weird) perspective, from on the helix itself, means that any "looking out to the side" or "up or down the staircase" would not show a perfectly even spiral, but it could allow for a conical path of the helix. (Even any helix that is artificially outbound from any point on the main helix.) This is a special type of conical helix, when the curl has a constant change of radius. It looks like a cone. See if you can notice the cone's shape in the images before I point it out:
Look at the previous spiral staircase examples.
From your point of view on the spiral itself, when you look up or down the staircase, what sort of shape is made by the rest of the staircase? The lines of each staircase's floor or layer or loop of the helix, all point towards a center. (Or out from the center, if the helix gets wider and wider in some situations).
Why a conical helix or cone? When we add depth, depth specifically measured from your current "base-loop" position (the loop of the spiral or floor of the helix that you are currently on) to the lines in the pictures above, we get the following shape. Compare the models below with the pictures above.
Are you starting to see the cone? With depth perception, this view is like looking down the inside of a cone. Or outside from above, like this conical party hat.
From some position on the curling spiral or helix, the cone's tip may look off-centered. But still, the 5D curl appears to take a conical path when imagining a sheathe around the spiral. Imagine the following cone having a spiral going around it helically. The curl spirals out from, or into, the tip of the cone.
That is the view when looking through a traffic cone. It looks kinda similar to the spiral staircases, doesn't it? And the center tip is offset from the middle too. What about the wider end of the cone? The following helps to explain why both ends of the cone can look off-centered.
Imagine you are either looking from the top "half" or bottom "half" of the cone above, with the plane intersecting the two "halves". When your visual field is angled, like the angled plane that is cutting the two regions of the cone (pictured above), then you see either an off-centered sharper tip or you see an off-centered wide base of the cone, in the visual field.
This is the next rotation.
Directions of the cones themselves.
If a cone - the sheath that would fit over a constantly growing or shrinking helix - is turned to face another direction, then it has been what I called "reeled" which is a 6D rotation.
(A shiny cone)
I call it a conic blast. Why blast? It is an artificial curl rate. The baseline curl is the more default curl rate of the helical spiral. It has been pulsed or pulsated to blast in some other conical direction than the baseline curl rate or starting curl rate. If the pulse or pulsations stop, then the energy would probably align back with the baseline curl rate, instead of going in another conical direction. This is a type of 6D rotation. Think of it as sort of like a cone that branches out from another cone. Perhaps by using a pulse or pulsations in the new branching direction.
Another type of 5D-6D rotation is called Kaleidoscoping. The action is similar to a kaleidoscope, and is fairly simple to imagine. Take the cone, and instead of choosing a different direction for a conic blast - keep the cone facing the same conic direction, but spin the cone in a drilling (or unscrewing) motion. This is not the same as changing the conic direction, but it involves movement of the whole cone, so it's somewhere between - a 5D and a 6D rotation.
Now, you can Pitch, Yaw, Roll, Swivel(-arc), Curl, Whip, Reel, and Kaleidoscope.
But how can consciousness (and mental effort or focus) actually use any of these new directions? Read on to find more.
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