azimuthal$6352$ - significado y definición. Qué es azimuthal$6352$
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Qué (quién) es azimuthal$6352$ - definición

MAP PROJECTION
Lambert azimuthal projection; Azimuthal equal-area projection; Lambert net; Schmidt plot; Lambert asimuthal projection; LEAA projection; Lambert Azimuthal Equal Area; Lambert azimuthal equal area; Azimuthal equal area; Laea; Lambert azimuthal map projection
  • The Lambert azimuthal equal-area projection with [[Tissot's indicatrix]] of deformation.
  • Animation of a Lambert projection. Each grid cell maintains its area throughout the transformation. In this animation, points on the equator remain always on the <math>z=0</math> plane.
  • In this animated Lambert projection, the south pole is held fixed.
  • Lambert azimuthal equal-area projection of the world. The center is 0° N 0° E. The antipode is 0° N 180° E, near [[Kiribati]] in the [[Pacific Ocean]]. That point is represented by the entire circular boundary of the map, and the ocean around that point appears along the entire boundary.
  • cross section]]al view of the sphere and a plane tangent to it at ''S''. Each point on the sphere (except the antipode) is projected to the plane along a circular arc centered at the point of tangency between the sphere and plane.

Lambert azimuthal equal-area projection         
The Lambert azimuthal equal-area projection is a particular mapping from a sphere to a disk. It accurately represents area in all regions of the sphere, but it does not accurately represent angles.
Azimuthal quantum number         
  • The [[atomic orbital]] wavefunctions of a [[hydrogen atom]]. The [[principal quantum number]] (''n'') is at the right of each row and the azimuthal quantum number (''ℓ'') is denoted by letter at top of each column.
  • "Vector cones" of total angular momentum '''J''' (purple), orbital '''L''' (blue), and spin '''S''' (green). The cones arise due to [[quantum uncertainty]] between measuring angular momentum components (see [[vector model of the atom]]).
  • Illustration of quantum mechanical orbital angular momentum.
QUANTUM NUMBER FOR AN ATOMIC ORBITAL THAT DETERMINES ITS ORBITAL ANGULAR MOMENTUM AND DESCRIBES THE SHAPE OF THE ORBITAL, AND IS SYMBOLIZED AS ℓ
Angular quantum number; Angular momentum quantum number; Orbital quantum number; Azimuthal Quantum Number; Az muthal quantum number; Orbital Quantum Number
The azimuthal quantum number is a quantum number for an atomic orbital that determines its orbital angular momentum and describes the shape of the orbital. The [quantum number is the second of a set of quantum numbers that describe the unique quantum state] of an electron (the others being the [[principal quantum number, the magnetic quantum number, and the spin quantum number).
Stereographic map projection         
  • The stereographic projection with [[Tissot's indicatrix]] of deformation.
TYPE OF CONFORMAL MAP PROJECTION
Oblique stereographic projection; Stereographic projection in cartography
The stereographic projection, also known as the planisphere projection or the azimuthal conformal projection, is a conformal map projection whose use dates back to antiquity. Like the orthographic projection and gnomonic projection, the stereographic projection is an azimuthal projection, and when on a sphere, also a perspective projection.

Wikipedia

Lambert azimuthal equal-area projection

The Lambert azimuthal equal-area projection is a particular mapping from a sphere to a disk. It accurately represents area in all regions of the sphere, but it does not accurately represent angles. It is named for the Swiss mathematician Johann Heinrich Lambert, who announced it in 1772. "Zenithal" being synonymous with "azimuthal", the projection is also known as the Lambert zenithal equal-area projection.

The Lambert azimuthal projection is used as a map projection in cartography. For example, the National Atlas of the US uses a Lambert azimuthal equal-area projection to display information in the online Map Maker application, and the European Environment Agency recommends its usage for European mapping for statistical analysis and display. It is also used in scientific disciplines such as geology for plotting the orientations of lines in three-dimensional space. This plotting is aided by a special kind of graph paper called a Schmidt net.