Exceptions are Solar and Lunar eclipses for example. So you have to invent things like the Flat Earth Perspective, which does not work as needed either.īut if you assume light bending as shown in my model, it can really produce the images that we observe to a certain extent, if you don't look too close into it. Sun, Moon and Stars on the Dome never go physically below the horizon. Of course applying the known physical laws of light propagation, on the Flat Earth we would see a completely different imgage of reality than we can observe. Note that although the Dome itself may be 3D, it only represents a 2D surface. What if we project 3D space with Sun, Moon, Planets and Stars onto the Flat Earth Dome in the same manner? What is the relation between the bodies on the dome and observers on the flat earth? How have I to bend the light from the objects on the dome to the observer to match observations? The basic idea behind the model is: The Flat Earth is a projection of the 3D Globe onto a flat plane. Further the model shows that the observations can only be explained by strong light bending. With the Flat Earth Dome Model I intended to show, that the geometric and physical aspects of celestial events and observations, in contrast to cyclic time events, can only be derived from the Heliocentric model. Get App State Get App Url Set App State Clear Purpose of the Model
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