Wikipedia:Sandbox/Archive
| File:Godfrey Harold Hardy.jpgG. H. Hardy A mathematician, like a painter or a poet, is a maker of patterns. If his patterns are more permanent than theirs, it is because they are made with ideas. | |
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| File:Rubik float.pngRubik's Cube The structural properties of these objects are investigated in the study of groups, rings, fields and other abstract systems, which are themselves such objects. This is the field of abstract algebra.An important concept here is that of vectors, generalized to vector spaces, and studied in linear algebra. | |
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 Group theoryThe structural properties of these objects are investigated in the study of groups, rings, fields and other abstract systems, which are themselves such objects. This is the field of abstract algebra. | |
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 LatticeAn important concept here is that of vectors, generalized to vector spaces, and studied in linear algebra. | |
Structure
Image:Elliptic curve simple.png|Many mathematical objects, such as sets of numbers and functions, exhibit internal structure. Image:Rubik float.png|The structural properties of these objects are investigated in the study of groups, rings, fields and other abstract systems, which are themselves such objects. This is the field of abstract algebra. Image:Group diagdram D6.svg|Group theory Image:Lattice of the divisibility of 60.svg|An important concept here is that of vectors, generalized to vector spaces, and studied in linear algebra.
Image:Elliptic curve simple.png|Many mathematical objects, such as sets of numbers and functions, exhibit internal structure. Image:Rubik float.png|The structural properties of these objects are investigated in the study of groups, rings, fields and other abstract systems, which are themselves such objects. This is the field of abstract algebra. Image:Group diagdram D6.svg|Group theory Image:Lattice of the divisibility of 60.svg|An important concept here is that of vectors, generalized to vector spaces, and studied in linear algebra.
Space
Image:Elliptic curve simple.png|Many mathematical objects, such as sets of numbers and functions, exhibit internal structure. Image:Rubik float.png|The structural properties of these objects are investigated in the study of groups, rings, fields and other abstract systems, which are themselves such objects. This is the field of abstract algebra. Image:Group diagdram D6.svg|Group theory Image:Lattice of the divisibility of 60.svg|An important concept here is that of vectors, generalized to vector spaces, and studied in linear algebra.
Image:Elliptic curve simple.png|Many mathematical objects, such as sets of numbers and functions, exhibit internal structure. Image:Rubik float.png|The structural properties of these objects are investigated in the study of groups, rings, fields and other abstract systems, which are themselves such objects. This is the field of abstract algebra. Image:Group diagdram D6.svg|Group theory Image:Lattice of the divisibility of 60.svg|An important concept here is that of vectors, generalized to vector spaces, and studied in linear algebra.