| 1. | Basically as the Earth is a spherical system, it has spherical symmetry.
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| 2. | Rotational spherical symmetry has all the discrete chiral 3D point groups as subgroups.
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| 3. | If your whole universe has spherical symmetry then global polar coordinates make sense.
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| 4. | For example, systems with spherical symmetry are simplified when expressed with spherical coordinates.
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| 5. | Organisms which show approximate spherical symmetry include the freshwater green alga " Volvox ".
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| 6. | The sphere is said to exhibit spherical symmetry.
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| 7. | This happens, for instance, when the function has spherical symmetry in the neighborhood of " p ".
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| 8. | The latter two choices are more convenient for solving problems which possess cylindrical or spherical symmetry respectively.
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| 9. | The Rayleigh� Plesset equation is derived from the Navier� Stokes equations under the assumption of spherical symmetry.
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| 10. | Common examples of symmetries which lend themselves to Gauss's law include cylindrical symmetry, planar symmetry, and spherical symmetry.
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