Difference between revisions of "Energy Stored in a Gravitational Field"
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==Abstract== | ==Abstract== | ||
| − | It is well known that there is energy stored in any space penetrated by an electric, or a magnetic field. This paper, however, shows that there is, likewise, energy stored in any space penetrated by a gravitational field. By a non-relativistic method, we calculate the energy stored, wg, in a planetary gravitational field, per unit volume. Near the surface of Planet Earth, the result shows that wg is approximately 15.9 Megawatt-hour/cubic-meter. How much of this enormous amount of energy can be extracted is a difficult question to answer.[[Category:Scientific Paper]] | + | It is well known that there is energy stored in any space penetrated by an electric, or a magnetic field. This paper, however, shows that there is, likewise, energy stored in any space penetrated by a gravitational field. By a non-relativistic method, we calculate the energy stored, wg, in a planetary gravitational field, per unit volume. Near the surface of Planet Earth, the result shows that wg is approximately 15.9 Megawatt-hour/cubic-meter. How much of this enormous amount of energy can be extracted is a difficult question to answer. |
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| + | [[Category:Scientific Paper|energy stored gravitational field]] | ||
[[Category:Relativity]] | [[Category:Relativity]] | ||
Revision as of 10:22, 1 January 2017
| Scientific Paper | |
|---|---|
| Title | Energy Stored in a Gravitational Field |
| Author(s) | Mahmoud A Melehy |
| Keywords | {{{keywords}}} |
| Published | 2001 |
| Journal | None |
Abstract
It is well known that there is energy stored in any space penetrated by an electric, or a magnetic field. This paper, however, shows that there is, likewise, energy stored in any space penetrated by a gravitational field. By a non-relativistic method, we calculate the energy stored, wg, in a planetary gravitational field, per unit volume. Near the surface of Planet Earth, the result shows that wg is approximately 15.9 Megawatt-hour/cubic-meter. How much of this enormous amount of energy can be extracted is a difficult question to answer.
