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SymmetrySymmetry is a characteristic of geometrical shapes, equations and other objects; we say that such an object is symmetric with respect to a given operation if this operation, when applied to the object, leaves the object unchanged. Symmetry occurs in geometry, mathematics, physics, biology, art, literature (palindromes), etc.
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The most familiar example is the left-right or mirror image symmetry exhibited for instance by the letter T: when this letter is reflected along a vertical axis, it remains the same. An equilateral triangle exhibits such a reflection symmetry along three axes, and in addition it shows rotational symmetry: if rotated by 120 or 240 degrees, it remains unchanged. An instance of a shape which exhibits only rotational but no reflectional symmetry is the swastika.
The German geometer Felix Klein enunciated a very influential Erlangen programme in 1872, suggesting symmetry as unifying and organising principle in geometry (at a time when that was read 'geometries'). This is a broad rather than deep principle. Initially it led to interest in the groups attached to geometries, and the slogan transformation geometry[?] (an aspect of the New Math[?], but hardly controversial in modern mathematical practice). By now it has been applied in numerous forms, as kind of standard attack on problems.
An example of a mathematical expression exhibiting symmetry is a2c + 3ab + b2c. If a and b are exchanged, the expression remains unchanged due to the commutativity of addition and multiplication.
In mathematics, one studies the symmetry of a given object by collecting all the operations that leave the object unchanged. These operations form a group. For a geometrical object, this is known as its symmetry group; for an algebraic object, one uses the term automorphism group. The whole subject of Galois theory deals with well-hidden symmetries of fields.
The generalisation of symmetry in physics to mean invariance under any kind of transformation has become one of the most powerful tools of theoretical physics. See Noether's theorem for more details. This has led to group theory being one of the areas of mathematics most studied by physicists.
See also: chirality, Bilateral symmetry
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by that sovereign, and respected by all; and if you do not
of it, and to espouse you before all these princes; let them be
marriage was concluded that very day in the castle, where they
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excellent in their kinds; and, to complete their pleasure,
plentifully, took with them the rest of the provisions, and set
days, encamping in the pleasantest places they could find, and
drunk all their wine, being under no longer concern to make it
said "Princes, I have too long concealed from you who I am.
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discovering it sooner, I might have prevented some disagreeable
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brother was increased. They met together at night, whilst
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devoured by the black, agreed among themselves to murder him.
moment our father.html">father shall come to understand that this stranger of
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leaving him for dead in the arms of the princess of Deryabar,
arrived the next day.
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