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Spherecal symmetric objects are those that are that look the same in all directions. They continue to remain the same under rotation.
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What is the adverb for sphere?
The related adverb is spherically. It is formed from the adjective spherical (in the shape of a sphere).
Is the moon a circle or a sphere?
it is spherically symmetrical
What does spherically shaped mean?
This word means shaped spherical; round; globeular;(e.g. ball)
Why can have an isolated atom not have a permanent electric dipole moment?
An isolated atom cannot have a permanent electric dipole moment because its charge distribution is spherically symmetric, meaning the positive and negative charges are evenly distributed. A dipole moment requires separation of positive and negative charges, which is not present in a spherically symmetric distribution.
Photons travel outward from a light bulb in?
Photons travel outward from a light bulb in all directions
What term describe bacteria that are round or spherically shaped?
gram negetive coccus
Why does the energy of a sound decrease over time?
Sound travels spherically from where it was made. If energy is to be conserved a sphere of an earlier point will have a higher flux density than one from a later point.
Why does the energy of the sound wave decrease over time?
Sound travels spherically from where it was made. If energy is to be conserved a sphere of an earlier point will have a higher flux density than one from a later point.
What has the author Ian M Binns written?
Ian M. Binns has written: 'Temperatures and thermo-elastic stress in spherically symmetric fuel elements with varying material properties' -- subject(s): Nuclear fuel elements, Thermal stresses
What are sphere shaped bacteria called?
Spherically shaped bacteria are called coccus, or cocci (pl). An example would be Streptococcus.
How is the Schwarzschild solution derived in the context of general relativity?
The Schwarzschild solution in general relativity is derived by solving the Einstein field equations for a spherically symmetric, non-rotating mass. This solution describes the spacetime around a non-rotating black hole.
What is the expression for the l2 operator in spherical coordinates and how does it affect the quantum state of a particle in a spherically symmetric potential?
The expression for the (l2) operator in spherical coordinates is ( -hbar2 left( frac1sintheta fracpartialpartialtheta left( sintheta fracpartialpartialtheta right) frac1sin2theta fracpartial2partialphi2 right) ). This operator measures the square of the angular momentum of a particle in a spherically symmetric potential. It quantifies the total angular momentum of the particle and its projection along a specific axis. The eigenvalues of the (l2) operator correspond to the possible values of the total angular momentum quantum number (l), which in turn affects the quantum state of the particle in the potential.
