Difference between revisions of "Universal gravitational constant G: Investigative report"
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| − | The Universal gravitational constant G has a unit dimesion of [G] = [1/(density)(time)(time)] = [1/(p)(T)(T)]. It is shown that G is not constant but has a mathematical formula that is atmospheric denisty and rotational period dependent.[[Category:Scientific Paper]] | + | The Universal gravitational constant G has a unit dimesion of [G] = [1/(density)(time)(time)] = [1/(p)(T)(T)]. It is shown that G is not constant but has a mathematical formula that is atmospheric denisty and rotational period dependent. |
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| + | [[Category:Scientific Paper|universal gravitational constant g investigative report]] | ||
[[Category:Gravity]] | [[Category:Gravity]] | ||
Revision as of 11:35, 1 January 2017
| Scientific Paper | |
|---|---|
| Title | Universal gravitational constant G: Investigative report |
| Read in full | Link to paper |
| Author(s) | Joe Alexander Nahhas |
| Keywords | Newton, Universal, Gravitational, Constant |
| Published | 1979 |
| Journal | None |
| No. of pages | 1 |
Read the full paper here
Abstract
The Universal gravitational constant G has a unit dimesion of [G] = [1/(density)(time)(time)] = [1/(p)(T)(T)]. It is shown that G is not constant but has a mathematical formula that is atmospheric denisty and rotational period dependent.
