normal curvature meaning in Hindi

Examples

1. is the normal curvature of the surface at a regular point for the unit tangent direction \ mathbf v.
2. These erosions alter the cornea's normal curvature, resulting in temporary vision problems, and expose the nerves that line the cornea, causing severe pain.
3. Then Doody and Ryan, using handles attached to the bar, rotated it 180 degrees in one smooth motion, pushing the chest up so that it formed a normal curvature.
4. The intersection of a normal plane and the surface will form a curve called a " normal section " and the curvature of this curve is the " normal curvature ".
5. These erosions : ( 1 ) Alter the cornea's normal curvature, resulting in temporary vision problems; and ( 2 ) Expose the nerves that line the cornea, causing severe pain.
6. The " Germain curvature " ( also called mean curvature ) is \ frac { k _ 1 + k _ 2 } { 2 }, when and are the maximum and minimum values of the normal curvature.
7. He had a standing height of 244 centimeters ( 8 feet 0 inches ) on October 14, 1959, but his height would have been 264 centimeters ( 8 feet 7?inches ), assuming normal curvature of the spine.
8. If north-south curvature on an ellipsoid is considered " meridional curvature " and east-west curvature, perpendicular to meridional curvature, is regarded as " normal curvature ", would any randomly angled curvature  i . e ., plane curve arc  properly be termed " oblique curvature "?
9. Quantum gravoelectrodynamics is the field of scientific study concerning the properties of electrodynamics and general relativity viewed through the tools of differential geometry . ?The origins of quantum gravoelectrodynamics can be found in the research of Friedrich Gauss [ 1 ] [ 2 ] and Bernhard Riemann [ 2 ] . ?Their vision was a search to find a theory based on analysis and calculations that explained nature . ?In their work they found many mathematical tools which can be used to understand electrostatics, geometry and spacetime . ?A more modern conceptualization can be found in John Wheeler s " Geometrodynamics . " ?The central idea here is that gravitation and electromagnetism can be described in terms of geometry itself [ 3 ] . ?Quantum gravoelectrodynamics starting point is the Minkowskian idea of spacetime [ 4 ] . ?For general relativity analysis occurs in spacetime and one takes derivatives to derive the matelectric field, the matmagnetic field, mass, velocity, matter waves, matter radiation and the other element of classical analysis . ?The manifold here is the traditional spacetime with units of distance . ?For electrodynamics analysis occurs in pospotential spacetime in which one takes derivatives to derive traditional concepts like the electric field, the magnetic field, charge waves ( fka electromagnetic waves ), charge radiation ( fka electromagnetic radiation ), current and charge . ?The manifold here has units of distance times the square root of Newtons divided by Amperes . ?Tools from differential geometry like the shape operator, the first fundamental form, the second fundamental form and the third fundamental form are used to find normal curvature, principal curvature, Gaussian curvature and mean curvatures.