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In mathematics, on the region between two well-behaved spheres
mathematics, the annulus theorem (formerly called the annulus conjecture) states roughly that the region between two well-behaved spheres is an annulus. It is closely
Annulus_theorem
Region between two concentric circles
shaped like a ring or a hardware washer. The word "annulus" is borrowed from the Latin word anulus or annulus meaning 'little ring'. The adjectival form is
Annulus_(mathematics)
Mathematical space
cobound a properly embedded annulus. This should not be confused with the high dimensional theorem of the same name. The torus theorem is as follows: Let M be
3-manifold
Mathematical construct in engineering
{bh^{3}}{12}}+{\frac {hb^{3}}{12}}={\frac {bh}{12}}\left(b^{2}+h^{2}\right)} Consider an annulus whose center is at the origin, outside radius is r 2 {\displaystyle r_{2}}
Second_moment_of_area
Mathematical theorem
multiplication by constants so the annulus { z : 1 < | z | < 2 } {\displaystyle \{z:1<|z|<2\}} is not conformally equivalent to the annulus { z : 1 < | z | < 4 } {\displaystyle
Riemann_mapping_theorem
Theorem in group theory
Mat., Novosibirsk, 1997 G. P. Scott, and G. A. Swarup. An algebraic annulus theorem. Archived 2007-07-15 at the Wayback Machine Pacific Journal of Mathematics
Stallings theorem about ends of groups
Stallings_theorem_about_ends_of_groups
Result in dynamical systems
area-preserving mappings of an annulus," Nachr. Akad. Wiss. Göttingen Math.-Phys. Kl. II 1962 (1962), 1–20. V. I. Arnold, "Proof of a theorem of A. N. Kolmogorov
Kolmogorov–Arnold–Moser theorem
Kolmogorov–Arnold–Moser_theorem
Describes the fundamental group in terms of a cover by two open path-connected subspaces
Seifert–Van Kampen theorem of algebraic topology (named after Herbert Seifert and Egbert van Kampen), sometimes just called Van Kampen's theorem, expresses the
Seifert–Van_Kampen_theorem
Power series with negative powers
z ) {\displaystyle f(z)} will then be valid anywhere inside the annulus. The annulus is shown in red in the figure on the right, along with an example
Laurent_series
Results on the surface areas and volumes of surfaces and solids of revolution
Pappus's centroid theorem (also known as the Guldinus theorem, Pappus–Guldinus theorem or Pappus's theorem) is either of two related theorems dealing with
Pappus's_centroid_theorem
Statement on the gravitational attraction of spherical bodies
shell theorem gives gravitational simplifications that can be applied to objects inside or outside a spherically symmetric body. This theorem has particular
Shell_theorem
Theorem in symplectic topology
homeomorphism of an annulus that rotates the two boundaries in opposite directions has at least two fixed points. The Poincaré–Birkhoff theorem was discovered
Poincaré–Birkhoff_theorem
Part of the mathematical subject of group theory
1142/S021819670500213X. S2CID 6912598. Scott, G. P. and Swarup, G. A. An algebraic annulus theorem. Pacific Journal of Mathematics, vol. 196 (2000), no. 2, pp. 461–506
Bass–Serre_theory
Theorem in complex analysis
three-line theorem can be used to prove the Hadamard three-circle theorem for a bounded continuous function g ( z ) {\displaystyle g(z)} on an annulus { z :
Hadamard_three-lines_theorem
Theorem in quantum mechanics
quantum mechanics, the Byers–Yang theorem states that all physical properties of a doubly connected system (an annulus) enclosing a magnetic flux Φ {\displaystyle
Byers–Yang_theorem
Extends the Jordan curve theorem to characterize the inner and outer regions
outside a small annulus near 0, the integral curves starting at points of the smooth curve will all reach smaller circle bounding the annulus at the same
Schoenflies_problem
Two tame knots with homeomorphic complements are the same or mirror images
In mathematics, the Gordon–Luecke theorem on knot complements states that if the complements of two tame knots are homeomorphic, then the knots are equivalent
Gordon–Luecke_theorem
Theorem in complex analysis
theorem: Let f ( z ) {\displaystyle f(z)} be a holomorphic function on the annulus r 1 ≤ | z | ≤ r 3 {\displaystyle r_{1}\leq \left|z\right|\leq r_{3}} .
Hadamard_three-circle_theorem
Simple curve of Euclidean geometry
has helped inspire the development of geometry, astronomy and calculus. Annulus: a ring-shaped object, the region bounded by two concentric circles. Arc:
Circle
Geometrical concept relating area and volume
remaining ring is a plane annulus, whose area is the difference between the areas of two circles. By the Pythagorean theorem, the area of one of the two
Cavalieri's_principle
Combinatorial and geometric result used in measure theory of Euclidean spaces
contained in the open annulus Ωn of points x such that n < |x| < n+1. A somewhat related covering theorem is the Besicovitch covering theorem. To each point
Vitali_covering_lemma
Mathematics glossary
is in fact a homotopy inverse. Analysis Situs Analysis Situs. annulus The annulus theorem. approximate fibration 1. An approximate fibration, a generalization
Glossary of algebraic topology
Glossary_of_algebraic_topology
Functions in mathematics
principle; a theorem of removal of singularities as well as a Liouville theorem holds for them in analogy to the corresponding theorems in complex functions
Harmonic_function
Second-order partial differential equation
{\displaystyle u} is harmonic in D {\displaystyle D} , then the divergence theorem implies the compatibility condition ∫ ∂ D ∂ u ∂ ν d S = 0. {\displaystyle
Laplace's_equation
Chinese-American mathematician
in the 1960s to the proof of the annulus theorem (previously known as the annulus conjecture). The annulus theorem is important in the theory of triangulation
Wu-Chung_Hsiang
One-dimensional complex manifold
parabolic. With two punctures, it is the punctured plane or alternatively annulus or cylinder, which is parabolic. With three or more punctures, it is hyperbolic
Riemann_surface
American mathematician (born 1946)
mathematical field of 4-manifolds, including a proof of the 4-dimensional annulus theorem. In surgery theory, he made several important contributions: the invention
Frank_Quinn_(mathematician)
Term in geometric topology
\left(e^{i\left(\theta +2\pi t\right)},t\right)} of the annulus, through the homeomorphisms of the annulus to an open cylinder to the neighborhood of γ a {\displaystyle
Dehn_twist
Visual mathematical proofs
applying it to a well-known geometry problem: find the area of a ring (annulus), given the length of a chord tangent to the inner circumference. Perhaps
Visual_calculus
Components of the Fatou set
connected Fatou component (an annulus) on which f(z) is analytically conjugate to a Euclidean rotation of a round annulus, again by an irrational rotation
Classification of Fatou components
Classification_of_Fatou_components
Mathematical approximation of a function
function, which become generally more accurate as n increases. Taylor's theorem gives quantitative estimates on the error introduced by the use of such
Taylor_series
Way to divide polygon into smaller parts
tiling T {\displaystyle T} of a ring R {\displaystyle R} (i.e., a closed annulus) gives two invariants, M sup ( R , T ) {\displaystyle M_{\sup }(R,T)} and
Finite_subdivision_rule
American mathematician
torus theorem." Inventiones Mathematicae, vol. 140 (2000), no. 3, pp. 605–637 G. Peter Scott, and Gadde A. Swarup. An algebraic annulus theorem. Archived
John_R._Stallings
Concept in mathematics
Theorem 6.4. Farb & Margalit 2012, Theorem 6.15 and Theorem 6.12. Farb & Margalit 2012, Theorem 6.11. Ivanov 1992, Theorem 4. Ivanov 1992, Theorem 1
Mapping class group of a surface
Mapping_class_group_of_a_surface
extension E for a neighbourhood of a closed annulus, since a collar around the boundary is diffeomorphic to an annulus I × T with I a closed interval in T. Taking
Sobolev spaces for planar domains
Sobolev_spaces_for_planar_domains
Theorem in complex analysis
the spherical annulus appearing in the proof. Furthermore, by the same principle, there is a number λ such that for all x in the annulus, the matrix [aij(x)]
Maximum_principle
Geometry problem about finding touching circles
concentric. Under this inversion, the solution circles must fall within the annulus between the two concentric circles. Therefore, they belong to two one-parameter
Problem_of_Apollonius
Surface of revolution with a hole in the middle
centroid theorem generalizes the formulas here to arbitrary surfaces of revolution. Toroidal inductors and transformers Toroidal propeller Annulus Solenoid
Toroid
the residue at infinity is a residue of a holomorphic function on an annulus having an infinite external radius. The infinity ∞ {\displaystyle \infty
Residue_at_infinity
Bijective holomorphic function with a holomorphic inverse
complex plane is biholomorphic to the unit disc (this is the Riemann mapping theorem). The situation is very different in higher dimensions. For example, open
Biholomorphism
Ratio of inertial to viscous forces acting on a liquid
diameter can be shown algebraically to reduce to D H,annulus = D o − D i , {\displaystyle D_{\text{H,annulus}}=D_{\text{o}}-D_{\text{i}},} where Do is the inside
Reynolds_number
d y . {\displaystyle I_{y}=\iint _{A}x^{2}\,dx\,dy.} The parallel axis theorem can be used to determine the second moment of area of a rigid body about
List of second moments of area
List_of_second_moments_of_area
Type of mathematical functions
every plane, also this integrated series is uniformly convergent in the annulus r ν ′ < | z | < R ν ′ {\displaystyle r'_{\nu }<|z|<R'_{\nu }} , where r
Function of several complex variables
Function_of_several_complex_variables
characteristic 2-disk Sphere Real projective plane Zero Euler characteristic Annulus Möbius strip Torus Klein bottle Negative Euler characteristic The boundary
List of geometric topology topics
List_of_geometric_topology_topics
Historical development of geometry
Pythagorean theorem about 1500 years before Pythagoras and the Indian Sulba Sutras around 800 BC contained the first statements of the theorem; the Egyptians
History_of_geometry
Type of differential operator
Lu to be well-defined in the classical sense. The elliptic regularity theorem guarantees that, provided f is square-integrable, u will in fact have 2k
Elliptic_operator
Root-finding algorithm for polynomials
outside of it. Any annulus of this characteristic can be transformed, by translation and scaling of the polynomial, into the annulus between the radii
Splitting_circle_method
words, we have an annulus, and we glue inner and outer edges. But the annulus does not correspond to the circle minus a point: the annulus is the set of complex
Tate_curve
Non-orientable surface with one edge
twists, however, one obtains a different topological surface, called the annulus. The Möbius strip can be continuously transformed into its centerline,
Möbius_strip
Topological space that is connected
spaces (that is, spaces which are not connected) include the plane with an annulus removed, as well as the union of two disjoint closed disks, where all examples
Connected_space
Doughnut-shaped surface of revolution
in the OEIS). Mathematics portal 3-torus Algebraic torus Angenent torus Annulus (geometry) Clifford torus Complex torus Dupin cyclide Elliptic curve Irrational
Torus
Motion of a curve based on its curvature
curves with nonzero measure instead immediately evolve into a topological annulus with nonzero area and smooth boundaries. The topologist's sine curve is
Curve-shortening_flow
Overview of and topical guide to geometry
points segments proof Mrs. Miniver's problem Isoperimetric theorem Annulus Ptolemaios' theorem Steiner chain Eccentricity Ellipse Semi-major axis Hyperbola
Outline_of_geometry
Moment of inertia of diff geometric shapes
additive function and exploit the parallel axis and the perpendicular axis theorems. This article considers mainly symmetric mass distributions, with constant
List_of_moments_of_inertia
French mathematician, physicist and engineer (1854–1912)
the columns of B. Poincaré–Birkhoff theorem: every area-preserving, orientation-preserving homeomorphism of an annulus that rotates the two boundaries in
Henri_Poincaré
Unsolved problem about inscribing a square in a Jordan curve
problem is solved for generic curves. If a Jordan curve is inscribed in an annulus whose outer radius is at most 1 + 2 {\displaystyle 1+{\sqrt {2}}} times
Inscribed_square_problem
Geometric objects with a common centre
circumsphere. The region of the plane between two concentric circles is an annulus, and analogously the region of space between two concentric spheres is
Concentric_objects
Award of the American Mathematical Society
work on the generalized Schoenflies theorem." 1971 Robion Kirby, for his paper "Stable homeomorphisms and the annulus conjecture". 1971 Dennis Sullivan
Oswald Veblen Prize in Geometry
Oswald_Veblen_Prize_in_Geometry
German-American mathematician (1928–1999)
Moser, J. (1962). "On invariant curves of area-preserving mappings of an annulus". Nachrichten der Akademie der Wissenschaften zu Göttingen. II.
Jürgen_Moser
does not refer literally to the geometric shape. Circle Circle anatomy Annulus (mathematics) – Region between two concentric circles Area of a disk –
List_of_circle_topics
Non-orientable mathematical surface
then it is in homology class (2,0); if it cuts the Klein bottle into an annulus, then it is in homology class (0,1); and if bounds a disk, then it is in
Klein_bottle
Topics referred to by the same term
functions defined on an annulus in the complex plane; closely related to the three-lines theorem; Hadamard factorization theorem, a specific factorization
Hadamard_(disambiguation)
Orientable surface whose boundary is a knot or link
V={\begin{pmatrix}1&-1\\0&1\end{pmatrix}}.} It is a theorem that any link always has an associated Seifert surface. This theorem was first published by Frankl and Pontryagin
Seifert_surface
Typically linear operator defined in terms of differentiation of functions
Fundamental solution Atiyah–Singer index theorem (section on symbol of operator) Malgrange–Ehrenpreis theorem Hypoelliptic operator Hörmander 1983, p. 151
Differential_operator
Differential operator in mathematics
{d}{dr}}\left(r^{N-1}F'(r)\right).} Thus every radial harmonic function on an annulus in R N {\displaystyle \mathbf {R} ^{N}} has the form F ( r ) = { A + B
Laplace_operator
Plane figure, bounded by circle
_{q\to \infty }b(q)=q+{\tfrac {1}{8q}}.} Unit disk, a disk with radius one Annulus (mathematics), the region between two concentric circles Ball (mathematics)
Disk_(mathematics)
Infinite sum
an annulus rather than a disc, and possibly some boundary points. The series converges uniformly on compact subsets of the interior of the annulus of
Series_(mathematics)
Swedish mathematician (1852–1923)
With Soichi Kakeya, he is known for the Eneström-Kakeya theorem which determines an annulus containing the roots of a real polynomial. Specifically,
Gustaf_Eneström
Group whose operation is a composition of braids
represented as the closure of certain braids (a result known as Alexander's theorem); in mathematical physics where Artin's canonical presentation of the braid
Braid_group
Partial differential equation
diffeomorphism F of an annulus r ≤ |z| ≤ 1 onto the closure of Ω, such that after a conformal change the induced metric on the annulus can be continued smoothly
Beltrami_equation
Parametrizes complex structures on a surface
contains exactly two points. A slightly more involved example is the open annulus, for which the Teichmüller space is the interval [ 0 , 1 ) {\displaystyle
Teichmüller_space
Branch of mathematics
Poincaré–Birkhoff theorem, conjectured by Henri Poincaré and then proved by G.D. Birkhoff in 1912. It claims that if an area preserving map of an annulus twists
Differential_geometry
sometimes known as Leibniz's test, Leibniz's rule, or the Leibniz criterion. annulus A ring-shaped object, a region bounded by two concentric circles. antiderivative
Glossary_of_calculus
Collection of knots that do not intersect, but may be linked
A Hopf link spanned by a twisted annulus.
Link_(knot_theory)
144–145 O'Rourke, Joseph (1987), "Chapter 5: Holes" (PDF), Art Gallery Theorems and Algorithms, International Series of Monographs on Computer Science
Polygon_with_holes
Problem in geometry
solve this type of problem, originally applied to finding the area of an annulus, given only its chord length String girdling Earth, another problem where
Napkin_ring_problem
Set of circles related by tangency
circles of the Steiner chain have the same size and can "roll" around in the annulus between the circles similar to ball bearings. This standard configuration
Steiner_chain
z_{2})|<\infty } In the 1D case this is represented by an annulus, and the 2D representation of an annulus is known as the Reinhardt domain. From this one can
2D_Z-transform
Iterative method in conformal mapping
separately, provided their intersection was topologically a disk or an annulus. From 1870 onwards Carl Neumann also contributed to this theory. In the
Schwarz_alternating_method
Branch of mathematics
the action of f on U is conjugate to an irrational rotation of an open annulus. (Note that the "backward orbit" of a point z in U, the set of points in
Complex_dynamics
Points on a common circle
concyclic, with different circles; see Nine-point circle and Lester's theorem. The radius of the circle on which lie a set of points is, by definition
Concyclic_points
Theory in algebraic topology
{\displaystyle {\check {H}}^{1}(X,\mathbb {R} )\cong \mathbb {R} } by Leray's theorem. We may also compute the coherent sheaf cohomology of Ω 1 {\displaystyle
Čech_cohomology
piece. This is either an octagon that separates pairs of vertices, or an annulus that connects two triangles and/or quadrilaterals by a tube. The concept
Normal_surface
Israeli mathematician
Cardy, John (2002), "Crossing formulae for critical percolation in an annulus", J. Phys. A: Math. Gen., 35 (41): L565–L572, arXiv:math-ph/0208019, Bibcode:2002math
Oded_Schramm
Subset of n-space defined by a finite sequence of polynomial equations and inequalities
again semialgebraic. Finally, and most importantly, the Tarski–Seidenberg theorem says that they are also closed under the projection operation: in other
Semialgebraic_set
Opening in the surface of an object
handheld hole punch, used to make holes in paper and similar materials. Annulus (mathematics) Depression (geology) Law of holes Sinus Tunnel Watering hole
Hole
Equiangular and equilateral polygon
distance from the center to any side). This is a generalization of Viviani's theorem for the n = 3 case. The circumradius R from the center of a regular polygon
Regular_polygon
Torus-shaped vortex in a fluid
implied that the process of vortex ring formation can influence mitral annulus dynamics. Releasing air underwater forms bubble rings, which are vortex
Vortex_ring
Conformal structure admits a Hodge dual of 1-forms without even specifying a metric
the inverse function theorem, there is a tubular neighbourhood of the image of γ, i.e. a smooth diffeomorphism Γ(t, s) of the annulus S1 × (−1, 1) into X
Differential forms on a Riemann surface
Differential_forms_on_a_Riemann_surface
Singular perturbation problem dealing with confinement of Brownian particles
where d > 1 is the ratio of the radii. Finally, when the domain is an annulus, the escape time to a small opening located on the inner circle involves
Narrow_escape_problem
Generalized notion of counting curve intersections
Ω {\displaystyle \Omega } be a small strip around c in the shape of an annulus. Name the left and right parts of Ω ∖ c {\displaystyle \Omega \setminus
Intersection_number
Generalized manifold
\mathbb {Z} )} on the upper half-plane: a version of the Riemann–Roch theorem holds after the quotient is compactified by the addition of two orbifold
Orbifold
Sub-class of turbomachinery
collector's purpose is to gather the flow from the diffuser discharge annulus and deliver this flow downstream into whatever component the application
Centrifugal_compressor
since they have no nontrivial compressing disks by the Jordan-Schoenflies theorem, and 3-manifolds have abundant embedded 2-spheres. Sometimes one alters
Incompressible_surface
In mathematics, a partition of a manifold into submanifolds
Z \ ([−1, 1] × R) are called the 2-dimensional Reeb foliation (of the annulus) resp. the 2-dimensional nonorientable Reeb foliation (of the Möbius band)
Foliation
American mathematician
Rațiu, T. (1993). "A Schur-Horn-Kostant convexity theorem for the diffeomorphism group of the annulus". Inventiones Mathematicae. 113 (1): 511–529. Bibcode:1993InMat
Anthony_M._Bloch
Polish–American mathematician (1901–1983)
but no ripping or glueing) allow us to distinguish a polygon from an annulus (ring with a hole in the centre), but do not allow us to distinguish two
Alfred_Tarski
Canadian mathematician
rotational symmetry, Fraser and Schoen carefully analyzed the case of an annulus, showing that the metric optimizing the above eigenvalue-length product
Ailana_Fraser
Root-finding algorithm
them placed concentrically and the remaining ones evenly spread over the annulus yet to be covered. From this set, using the test again, disks containing
Lehmer–Schur_algorithm
Type of continuous map in topology
{\displaystyle X} . A universal covering does not always exist. The following theorem guarantees its existence for a certain class of base spaces. Let X {\displaystyle
Covering_space
ANNULUS THEOREM
ANNULUS THEOREM
Boy/Male
Hindu
Eternal, Unsurpassed
Surname or Lastname
English
English : nickname from Latin angelus dei, Old French angele ‘angel’ + Dieu ‘God’.
Male
Portuguese
Galician-Portuguese form of Latin Angelus, ANXO means "angel, messenger."
Surname or Lastname
English
English : from Middle English angel ‘angel’ (from Latin angelus), probably applied as a nickname for someone of angelic temperament or appearance or for someone who played the part of an angel in a pageant. As a North American surname it may also be an Americanized form of a cognate European surname, as for example Italian Angelo, Rumanian Anghel, Czech Anděl, or Hungarian Angyal.German : ethnic name for a member of a Germanic people on the Jutland peninsula; members of this tribe invaded eastern and northern Britain in the 5th–6th centuries and gave their name to England. See Engel.Slovenian (eastern Slovenia) : from the Latin personal name Angelus.
Boy/Male
Irish
feidhil “â€beautyâ€â€ or “â€ever good.â€â€ Three kings of Munster bore the name. Feidhelm Mac Crimthainn was both a king of Munster and a Bishop of Cashel. He contested the sovereignty of Ireland with the O’Neill kings. He was unsuccessful in the ensuing battle and in 842 AD the annals record… “â€The crosier of devout Feidhelm was abandoned in the blackthorns. Neill, mighty in combat, took it by right of victory.â€â€
Surname or Lastname
English and Irish (of Norman origin)
English and Irish (of Norman origin) : topographic name from Middle English and Old French angle ‘angle’, ‘corner’ (Latin angulus). As an Irish surname, it can also be habitational, from a place in Pembrokeshire, South Wales, named with this word.Americanized spelling of German Angel or Engel.
Female
English
Feminine form of Latin Angelus, ANGELA means "angel, messenger."
Boy/Male
Irish
feidhil “â€beautyâ€â€ or “â€ever good.â€â€ Three kings of Munster bore the name. Feidhelm Mac Crimthainn was both a king of Munster and a Bishop of Cashel. He contested the sovereignty of Ireland with the O’Neill kings. He was unsuccessful in the ensuing battle and in 842 AD the annals record… “â€The crosier of devout Feidhelm was abandoned in the blackthorns. Neill, mighty in combat, took it by right of victory.â€â€
Girl/Female
Australian, Danish, German, Swedish
Grace; Favor
Female
English
English unisex name derived from Latin Angelus, ANGEL means "angel, messenger."Â Originally a male name, it is now almost strictly female.
Boy/Male
Tamil
Eternal, Unsurpassed
Boy/Male
Irish
feidhil “â€beautyâ€â€ or “â€ever good.â€â€ Three kings of Munster bore the name. Feidhelm Mac Crimthainn was both a king of Munster and a Bishop of Cashel. He contested the sovereignty of Ireland with the O’Neill kings. He was unsuccessful in the ensuing battle and in 842 AD the annals record… “â€The crosier of devout Feidhelm was abandoned in the blackthorns. Neill, mighty in combat, took it by right of victory.â€â€
Male
English
English unisex name derived from Latin Angelus, ANGEL means "angel, messenger." Once used as a man's name in England. It is now almost strictly a feminine name.
Female
French
French feminine form of Latin Angelus, ANGÈLE means "angel, messenger."
Boy/Male
Australian, French, German, Swedish
Messenger of God; Angel
Female
Spanish
Spanish feminine form of Latin Angelus, ANGÉLICA means "angel, messenger."
Female
Spanish
Spanish feminine form of Latin Angelus, ÃNGELA means "angel, messenger."
Male
Italian
Florentine Italian form of Latin Angelus, ANGIOLO means "angel, messenger."
Male
Italian
Italian form of Latin Angelus, ANGELO means "angel, messenger."
ANNULUS THEOREM
ANNULUS THEOREM
Girl/Female
Indian, Punjabi, Sikh
Commander
Surname or Lastname
North German and Dutch
North German and Dutch : variant of Otto.English : variant of Hood 1.
Boy/Male
Afghan, African, American, Arabic, Gujarati, Hindu, Indian, Kannada, Muslim
Honest; Great; Increase; Growth; Great Abundance; Prosperity
Girl/Female
American, British, English, Greek, Irish
Christian; Follower of the Christ; Anointed One
Boy/Male
American, Danish, French, German, Gujarati, Hawaiian, Hebrew, Hindu, Indian, Kannada, Malayalam, Marathi, Punjabi, Sikh, Sindhi, Swedish, Telugu
Swan; God is Gracious
Boy/Male
Arabic
Degrees; Dignities
Male
Welsh
Derived from Welsh Grippiud, GRUFFUDD means "(?) chief/lord."
Girl/Female
Tamil
Sthuthibhi | ஸà¯à®¤à¯à®¤à¯€à®ªà¯€
With prayers
Surname or Lastname
English
English : variant of Stevenson.
Boy/Male
Indian
Happy
ANNULUS THEOREM
ANNULUS THEOREM
ANNULUS THEOREM
ANNULUS THEOREM
ANNULUS THEOREM
n.
One of the Annulosa.
a.
Pertaining to, or having the form of, a ring; forming a ring; ringed; ring-shaped; as, annular fibers.
n.
A ring; a ringlike part or space.
n.
The solid formed by a circle revolving around a line which is the plane of the circle but does not cut it.
n.
A little circle borne as a charge.
adv.
In an annular manner.
n.
A space contained between the circumferences of two circles, one within the other.
n. pl.
A periodic publication, containing records of discoveries, transactions of societies, etc.; as "Annals of Science."
pl.
of Annulus
n.
A genus of copepod Crustacea, parasitic of fishes; a fish louse. See Branchiura.
n.
One who annuls.
n.
A narrow circle of some distinct color on a surface or round an organ.
a.
Angulous.
a.
Of or pertaining to the Annulosa.
a.
Furnished with, or composed of, rings or ringlike segments; ringed.
n.
Ring-shaped structures or markings, found in, or upon, various animals.
n.
The angel fish (Squatina angelus).
n. pl.
A division of the Invertebrata, nearly equivalent to the Articulata. It includes the Arthoropoda and Anarthropoda. By some zoologists it is applied to the former only.
n.
The Angelus bell.
n.
See Annals.