Other
Scientific paper
May 2002
adsabs.harvard.edu/cgi-bin/nph-data_query?bibcode=2002agusm.p52a..10b&link_type=abstract
American Geophysical Union, Spring Meeting 2002, abstract #P52A-10
Other
6040 Origin And Evolution, 6200 Planetology: Solar System Objects (New Field), 6207 Comparative Planetology
Scientific paper
There are many parallelisms, convergences and divergences in combination or singly in planetary and space science. Examples of parallelisms in planetary and space science are volcanoes on Mars, Earth and Io: polar caps on Mars and Earth, riverbeds on Mars and Earth, rings about Jupiter, Saturn,Uranus, rotation of all planets and the sun, black holes and galaxies and galactic groupings:Hadley cells on Venus (ultra-violet photo) and Earth. Examples of convergences are slowing of rotation rate of the earth compared to the rotation rate of the sun: slowing of the moons orbital speed compared with the orbital speed of Earth. Divergences are the increasing distances from the big bang of various galaxies as compared to each other. Examples of convergences in nature are the cone of an umbra, converging to a point beyond the earth itself in a lunar ecalipse, and a cone of divergence occurs with the penumbra. A parallelism can occur with two light rays reflecting back off of a flat icy planetary surface or craters showing parallel ejecta rays. The elementary mathematical theory of the laws of parallism, convergence and divergesnce are as follows: the amount of parallelism or degree of parallelism is the distance between two parallel lines each describing the phenomena so that if g(earth)=9.8m/s2 and g(Mars)= 3.4m/s2, the degree of parallelism = 6.4m/s2.and if g(Mars)= 3.4m/s2,and g(earth's moon)= 16m/s2 the degree of parallelism =1.8m/s2. Therefore, the greater parallelism or sameness is the lesser distance or value so that the g-parallelism between Mars and Earth's Moon is greater than the g-parallelism bewteen Earth and Mars. The divergence and convergence between two qualtities can be computed by calculating the angle at the vertex of the convergence or divergence by analytic geometry or be instrumentation. A solid angle for a cone of divergence or convergence can be used for quantification. Two parallel lines can constitute the basis for a cylinder of volume and the area of parallelism can also be used to quantify the parallelism say between the parallelisms of the spin rates of Jupiter and Mars. Many phenomena in nature can be found obeying the law of parallelisms, convergences and divergences from the macroworld to the microworld, from stars to atomic particles, from fields to masses and many can be quantified as stated above.
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