All is a Reflection of Spirit thru the Lens of Source into The Soul(s) of Matter
As Above, So Below.... and may be, Inside Out
With Infinite destinations and outcomes.

Have fun with this.....Intuit :) ....I  just wanted to reference an observation.   all with love, annie

Mobious Strip II
http://www.youtube.com/watch?v=pGy-WxLaKl8

I just saw this May Crop Circle in Germany, and it reminded me of the the layers and "Leaves" in the Macedonia Circle....
the leaves made me think of the action of Mobious Strip Transformation. (you can Google it)
Could this be a Hint as to How the Dimensional, Frequential, Vibrational Transformations may Occur
during this period of Galactic Alignment with the Central Sun from 1999 and beyond???

From Wikipedia, the free encyclopedia

A Möbius strip made with a piece of paper and tape. If an ant were to crawl along the length of this strip, it would return to its starting point having traversed the entire length of the strip (on both sides of the original paper) without ever crossing an edge.

The Möbius strip or Möbius band (UK /ˈmɜrbiəs/ or US /ˈmoʊbiəs/; German: [ˈmøːbi̯ʊs]), also Mobius or Moebius, is a surface with only one side and only one boundary component. The Möbius strip has the mathematical property of being non-orientable. It can be realized as a ruled surface. It was discovered independently by the German mathematicians August Ferdinand Möbius and Johann Benedict Listing in 1858.[1][2][3]
A model can easily be created by taking a paper strip and giving it a half-twist, and then joining the ends of the strip together to form a loop. In Euclidean space there are two types of Möbius strips depending on the direction of the half-twist: clockwise and counterclockwise. That is to say, it is a chiral object with "handedness" (right-handed or left-handed).

http://www.cut-the-knot.org/do_you_know/moebius.shtml
Copyright © 1996-2012 Alexander Bogomolny
CITE THIS PAGE AS:
A. Bogomolny, Moebius Strip from Interactive Mathematics Miscellany and Puzzles
http://www.cut-the-knot.org/do_you_know/moebius.shtml, Accessed 11 July 2012
 

Möbius Strip
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Sphere has two sides. A bug may be trapped inside a spherical shape or crawl freely on its visible surface. A thin sheet of paper lying on a desk also has two sides. Pages in a book are usually numbered two per a sheet of paper. The first one-sided surface was discovered by A. F. Möbius (1790-1868) and bears his name: Möbius strip. Sometimes it's alternatively called a Möbius band. (In truth, the surface was described independently and earlier by two months by another German mathematician J. B. Listing.) The strip was immortalized by M. C. Escher (1898-1972).
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To obtain a Möbius strip, start with a strip of paper. Twist one end 180o (half turn) and glue the ends together (the avi file takes 267264 bytes). For comparison, if you glue the ends without twisting the result would look like a cylinder or a ring depending on the width of the strip. Try cutting the strip along the middle line. People unacquainted with Topology seldom guess correctly what would be the outcome. It's also interesting to cut the strip 1/3 of the way to one edge. Try it.
I have put together a short (155648 bytes) avi movie of a twisting Möbius strip. (When you get to the movie page click on the frame to start the movie.)
Now once you know the trick, surely you would like to find other one-sided surfaces. Before gluing the ends together you can twist the strip twice or even three times. Do you get one-sided or two-sided surface?

Wewelsburg, Nr Paderborn. Reported 28th May.
 

Updated

10/07/2012

Büsingen (German Enclave), Schaffhausen. Switzerland. Reported 8th July.

Updated

11/07/2012

  http://www.cropcircleconnector.com/inter2012/germany/Wewelsburg2012a.html

Wewelsburg, Nr Paderborn. Reported 28th May.

Map Ref: HERE
This Page has been accessed

Updated Tuesday 10th  July 2012

Images Bernd Otto  Copyright 2012

Location of the Crop Circle: Wewelsburg, Germany - next city: Paderborn

OS Map Reference:            map follows via email

Type of Crop:                Tritikalis

Description:                 images follow via email

Date of Discovery:           28-May-2012

Name:                        Bernd Otto

Address:                     Ridlerstr. 29d, D-80339 Munich

Country:                     Germany

Wewelsburg, Nr Paderborn. Reported 28th May.
 

Updated

10/07/2012

Büsingen (German Enclave), Schaffhausen. Switzerland. Reported 8th July.

Updated

11/07/2012

Macedonia:    http://www.cropcircleconnector.com/inter2012/Macedonia/Karbinci%202012a.html
Karbinci, nr Shtip. Reported 1st July.

Images Artylad Artylad Copyright 2012

Diagram Bertold Zugelder Copyright 2012