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The two-dimensional one-sided curved surface existing in the three-dimensional world is the famous Mobius ring.\u003c\/span\u003e\u003cbr data-mce-fragment=\"1\"\u003e\u003cbr data-mce-fragment=\"1\"\u003e\u003cspan data-mce-fragment=\"1\"\u003eMobius ring is not only a classical model carrying the concept of infinity, but also looks like the symbol of infinity.\u003c\/span\u003e\u003cbr data-mce-fragment=\"1\"\u003e\u003cbr data-mce-fragment=\"1\"\u003e\u003cspan data-mce-fragment=\"1\"\u003eThe Mobius ring is drawn on the back of the card in a minimalist way, twisting, rotating, reciprocating, cycling, interleaving, endless and infinite. Design details hide the designer's thinking and pursuit of time, space and cardistry effect.\u003c\/span\u003e\u003c\/p\u003e"}

MOBIUS Green Playing Cards by TCC Presents

Product Description

Level of difficulty: No skill required

Mathematicians use the sign 8 to express infinity, which is derived from the Latin infinitas, which means "no boundary".

In 1858, the German mathematician Mobius discovered that the paper tape loop made by twisting a piece of paper 180° and then bonding the two ends together has magical properties. The two-dimensional one-sided curved surface existing in the three-dimensional world is the famous Mobius ring.

Mobius ring is not only a classical model carrying the concept of infinity, but also looks like the symbol of infinity.

The Mobius ring is drawn on the back of the card in a minimalist way, twisting, rotating, reciprocating, cycling, interleaving, endless and infinite. Design details hide the designer's thinking and pursuit of time, space and cardistry effect.

Sku: M4P/MMS-69112
Vendor: TCC Presents
$35.84
Maximum quantity available reached.

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