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Mathworld -
Quintic Equation – more
details on
methods for
solving Quintics.
Solving Solvable Quintics – a
method for
solving solvable quintics due to David...
- In mathematics, a
quintic threefold is a 3-dimensional
hypersurface of
degree 5 in 4-dimensional
projective space P 4 {\displaystyle \mathbb {P} ^{4}}...
- In
algebraic geometry, the Barth–Nieto
quintic is a
quintic 3-fold in 4 (or
sometimes 5)
dimensional projective space studied by Wolf
Barth and Isidro...
- can be
expressed with two
nested square roots. See also
Quintic function § Other
solvable quintics for
various other examples in
degree 5. Évariste Galois...
- In mathematics, an
affine algebraic plane curve is the zero set of a
polynomial in two variables. A
projective algebraic plane curve is the zero set in...
-
fields of
algebraic geometry and
arithmetic geometry, the Consani–Scholten
quintic is an
algebraic hypersurface (the set of
solutions to a
single polynomial...
- In mathematics, a
Fermat quintic threefold is a
special quintic threefold, in
other words a
degree 5,
dimension 3
hypersurface in 4-dimensional complex...
-
conclusive proof. The
first person who
conjectured that the
problem of
solving quintics by
radicals might be
impossible to
solve was Carl
Friedrich Gauss, who...
-
Quintic Mandelbulb...
- the
hands of Weierstr****, Kronecker, and Méray. The
search for
roots of
quintic and
higher degree equations was an
important development, the Abel–Ruffini...