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Friendship bracelet – easy stripe form Step-by-step diagram of basic knot associated with friendship bracelets. A friendship bracelet is a decorative bracelet given by one person to another as a symbol of friendship. Friendship bracelets are often handmade, usually of embroidery floss or thread and are a type of macramé.
This is one of the eleven basic knots of traditional Chinese knotting, [1] a craft which began in the Tang and Song dynasty (960–1279 AD) in China. The Chinese and Japanese names for this knot are based on the shape of the ideogram for the number ten, which is in the shape of a cross that appears on one face (and a square on the other face). [2]
Fisherman's knot – knot for joining two lines with a symmetrical structure consisting of two overhand knots, each tied around the standing part of the other; Fisherman's loop Flemish bend – knot for joining two ropes of roughly similar size; Flemish knot a.k.a. figure-eight knot, savoy knot – knot for joining two ropes of roughly similar size
The term true lover's knot, also called true love knot or simply love-knot amongst others, is used for many distinct knots. The association of knots with the symbolism of love , friendship and affection dates back to antiquity (although the term itself is attested from the late 1300s). [ 2 ]
Knots can be described in various ways. Using different description methods, there may be more than one description of the same knot. For example, a common method of describing a knot is a planar diagram called a knot diagram, in which any knot can be drawn in many different ways.
Knot patterns first appeared in the third and fourth centuries AD and can be seen in Roman floor mosaics of that time. Interesting developments in the artistic use of interlaced knot patterns are found in Byzantine architecture and book illumination , Coptic art , Celtic art, Islamic art , Kievan Rus' book illumination, Ethiopian art , and ...
A two lead, three bight Turk's head is also a trefoil knot if the ends are joined together. (2,n) alternating torus knots are (2,n) Turk's head knots. [3] ((p,q) = q times around a circle in the interior of the torus, and p times around its axis of rotational symmetry.) Turk's head knots are easy to edit though hard to tie.
First called "constrictor knot" in Clifford Ashley's 1944 work The Ashley Book of Knots, this knot likely dates back much further. [5] Although Ashley seemed to imply that he had invented the constrictor knot over 25 years before publishing The Ashley Book of Knots, [1] research indicates that he was not its only originator, but his Book of Knots does seem to be the source of subsequent ...