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The White Lotus Union

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White Planetary Mirror. White Mirror is your Conscious Self - who you are and who you are becoming.

White Planetary Mirror

White Mirror represents the Hall of Mirrors, where you can face your own reflection and see the truth about yourself. As a mirror, White Mirror merely reflects what is, whether truth, beauty or illusion. Here you can face unfinished business, the dissonance of difficulties, or charged issues that would keep you from the full expression of your Divinity. Become aware of any illusions or distortions within yourself; your clarity of perception will transform them. Take a moment to see yourself as you actually are, shadow and all, freed from the maze of mental illusion. Sometimes you may find yourself reacting rather than freely responding to a situation or person.

The New Jerusalem and Eternal State. Rev 21:9 And there came unto me one of the seven angels which had the seven vials full of the seven last plagues, and talked with me, saying, Come hither, I will shew thee the bride, the Lamb's wife.

The New Jerusalem and Eternal State

The Feminine Aspect of God. Refraction. An image of the Golden Gate Bridge is refracted and bent by many differing three-dimensional drops of water.

Refraction

Refraction is the change in direction of a wave due to a change in its transmission medium. Refraction is essentially a surface phenomenon. The phenomenon is mainly in governance to the law of conservation of energy and momentum. Due to change of medium, the phase velocity of the wave is changed but its frequency remains constant. This is most commonly observed when a wave passes from one medium to another at any angle other than 90° or 0°. Explanation[edit] Refraction of light at the interface between two media of different refractive indices, with n2 > n1. An object (in this case a pencil) part immersed in water looks bent due to refraction: the light waves from X change direction and so seem to originate at Y.

Refraction can be seen when looking into a bowl of water. Hawking radiation. Hawking radiation is black body radiation that is predicted to be released by black holes, due to quantum effects near the event horizon.

Hawking radiation

It is named after the physicist Stephen Hawking, who provided a theoretical argument for its existence in 1974,[1] and sometimes also after Jacob Bekenstein, who predicted that black holes should have a finite, non-zero temperature and entropy.[2] Hawking's work followed his visit to Moscow in 1973 where the Soviet scientists Yakov Zeldovich and Alexei Starobinsky showed him that according to the quantum mechanical uncertainty principle, rotating black holes should create and emit particles.[3] Hawking radiation reduces the mass and the energy of the black hole and is therefore also known as black hole evaporation.

Because of this, black holes that lose more mass than they gain through other means are expected to shrink and ultimately vanish. Overview[edit] Trans-Planckian problem[edit] Emission process[edit] A Schwarzschild black hole has a metric . And . Cymatics. Fractal. Figure 1a.

Fractal

The Mandelbrot set illustrates self-similarity. As the image is enlarged, the same pattern re-appears so that it is virtually impossible to determine the scale being examined. Figure 1b. The same fractal magnified six times. Figure 1c. Figure 1d. Fractals are distinguished from regular geometric figures by their fractal dimensional scaling. As mathematical equations, fractals are usually nowhere differentiable.[2][5][8] An infinite fractal curve can be conceived of as winding through space differently from an ordinary line, still being a 1-dimensional line yet having a fractal dimension indicating it also resembles a surface.[7]:48[2]:15. Kepler's laws of planetary motion. In astronomy, Kepler's laws of planetary motion are three scientific laws describing the motion of planets around the Sun.

Kepler's laws of planetary motion

Kepler's laws are now traditionally enumerated in this way: Figure 1: Illustration of Kepler's three laws with two planetary orbits. (1) The orbits are ellipses, with focal points ƒ1 and ƒ2 for the first planet and ƒ1 and ƒ3 for the second planet. The Sun is placed in focal point ƒ1. (2) The two shaded sectors A1 and A2 have the same surface area and the time for planet 1 to cover segment A1 is equal to the time to cover segment A2. (3) The total orbit times for planet 1 and planet 2 have a ratio a13/2 : a23/2.

Most planetary orbits are almost circles, so it is not apparent that they are actually ellipses. Isaac Newton showed in 1687 that relationships like Kepler's would apply in the solar system to a good approximation, as consequences of his own laws of motion and law of universal gravitation. White hole. In general relativity, a white hole is a hypothetical region of spacetime which cannot be entered from the outside, although matter and light can escape from it.

White hole

In this sense, it is the reverse of a black hole, which can only be entered from the outside, but from which nothing, including light, can escape. White holes appear in the theory of eternal black holes. In addition to a black hole region in the future, such a solution of the Einstein field equations has a white hole region in its past.[1] However, this region does not exist for black holes that have formed through gravitational collapse, nor are there any known physical processes through which a white hole could be formed.

Like black holes, white holes have properties like mass, charge, and angular momentum. The R. Buckminster Fuller FAQ: Introduction. Next Previous Contents Buckminster Fuller (1895-1983) is the renowned inventor of the geodesic dome, the world game, and a new system of mathematics called synergetics. He was a polymath whose writings and lectures touched upon every aspect of the human condition. He was a ``new-former'' pointing out, exploring and prototyping designs in numerous, previously uncharted areas of science and humanity. His greatest writings were Critical Path, Synergetics (2 volumes), and posthumously Cosmography. Since his physical death a class of recently discovered allotropes of carbon, the fullerenes, have been named in his honor.

Quantum entanglement.