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Index
23a. The Centrifugal Force 23b. Loop-the-Loop 24a.The Rotating Earth 24b. Rotating Frames The Sun S-1. Sunlight & Earth S-1A. Weather S-1B. Global Climate S-2.Solar Layers S-3.The Magnetic Sun S-3A. Interplanetary Magnetic Fields S-4. Colors of Sunlight S-4A.Color Expts. S-5.Waves & Photons |
WeightlessnessAn astronaut in low Earth orbit moves in (approximately) a big circle extending around the Earth. The acceleration required for such motion is provided by gravity mg(RE/r)2= mv2/r where the astronaut's weight mg on the Earth's surface at r = RE is adjusted on the left side for the greater distance. That is of course the same equation as the one used to demonstrate Newton's study of gravity. However, it can also be written mg (r/RE)2 – mv2/r = 0 That can be interpreted as stating that in the astronaut's frame of reference, all bodies are subject to two forces, gravity and the centrifugal force, and the two are in perfect balance, adding up to zero. It is sometimes claimed that astronauts in space are in a "zero gravity" environment, but actually they are still very much under the influence of the Earth's gravity. True, the astronaut observes no tendency at all to fall towards Earth, but the reason is different and can be stated in one of two ways: |
Weightlessness Simulation in an AirplaneWhat if the spaceship's orbit is not circular but (say) elliptic? It makes no difference. If the force of gravity at distance r is
Then the equation of motion of an object subject to F alone is
The acceleration a is what a spacecraft in orbit experiences, viewed from the fixed frame of the Earth. In a circular orbit of radius r it equals v2/r, while in an elliptic orbit it may have a different magnitude and different direction, which could also be calculated. The important thing to note here is that an astronaut inside that spacecraft is subject to the same gravity and therefore undergoes the same acceleration as the spacecraft itself. Viewing the astronaut's motion in the frame of the moving spacecraft, the astronaut is not pulled towards the floor of the cabin or in any other direction, and therefore has the impression that gravity has been eliminated. Suppose that instead, the astronaut rode inside a freely falling cabin, near the surface of the Earth. There, too
but since r is very close to 1 RE, we may set that ratio equal to 1 and get simply
The cabin falls with acceleration g, but the passenger also falls with the same acceleration, so again, no force exists that pushes the passenger towards the floor of the cabin. Acting on cues from the surrounding cabin, the passenger will again get the illusion that gravity did not exist. It makes no difference if the cabin started with a constant velocity--e.g. tossed upwards with an initial velocity u and with an initial horizontal velocity w--because neither of these affects the forces and accelerations. Both cabin and passenger would still be accelerating downwards at a=g, creating an illusion of zero gravity. If this experiment were actually conducted, that illusion and also the cabin would all too soon be shattered by contact with the hard ground below. Furthermore, air resistance would soon reduce the cabin's acceleration below g. The passenger inside, still subject to a=g, would then overtake the cabin, a process which would appear in the frame of the cabin like a partial return of gravity. However, the same experiment can be safely performed aboard a high-flying aircraft, which could match any air resistance by the thrust of its engines. By following a programmed parabolic path similar to that of a projectile subject to gravity alone, such an aircraft can create--for a limited time--a zero-gravity environment inside its cabin. NASA has done so with a KC-135 aircraft (reported to be now retired), a 4-engine jet nicknamed "The Vomit Comet" because its sudden transition to zero-g made some passengers quite airsick. The airplane could produce a temporary zero-g environment in its cabin, and was used for training astronauts and for short experiments on zero-gravity phenomena. The cargo space inside it was completely covered with padding, and a "zero gravity" illusion could be maintained for about 20-30 seconds.
The science-fiction film "2001: A Space Odyssey" featured spinning space station, whose rotation provided the crew with "artificial gravity." It was a wheel-shaped structure, with hollow spokes connecting the wheel to a cabin in the center (drawing). The cabin in the middle was where transfers between the station and visiting spacecraft took place. Click here for more on that design. Given such a rotation, something like gravity would indeed be produced, with "down" being towards the outside (Larry Niven expanded that notion into the fanciful science-fiction novel "Ringworld" and its sequels). When calculating this effect it is simplest to use the station's frame of reference and add a centrifugal force to all other forces there. However, when one moves in this rotating environment, especially motion up and down the spokes, an additional force is encountered, named for the Frenchman Gaspard Gustave de Coriolis (1792-1843). Imagine an astronaut moving along one of the spokes, say from point A in the drawing to point B--most likely, climbing a ladder, since such motion goes against the station's "artificial gravity." At any point, as viewed in the frame of the outside world, the astronaut is also rotating around the station's axis. At both point A and B, the rotation is in the same direction, but at B it is slower, because that point is nearer to the axis of rotation and therefore describes a smaller circle. What happens at B to the extra speed the astronaut had at A? According to Newton's first law, loosely applied, the astronaut would tend to keep that extra speed and would therefore be pushed agains the side of the spoke (direction of the arrows). That push is the Coriolis force. When the motion is in the opposite direction, from B to A, the direction of the force is. . . the same or reversed? Work it out yourself! Swirling Water in a Bathroom SinkFrom time to time the claim is made that water draining from bathroom sinks swirls in opposite directions north and south of the equator. The physical principle is sound, but the actual effect is so microscopic that it is unlikely to be observed in the draining of bathroom sinks. On the other hand, the same effect is very important in large-scale swirling of the atmosphere, in hurricanes and typhoons as well as in ordinary weather patterns. |
An entire gallery of hurricanes viewed from space--all swirling in their proper directions!
Next Stop: Your Choice!
#25 The Principle of the Rocket continues to the story of spaceflight.
The Sun: Introduction opens a group of sections studying our Sun, from many different angles (spaceflight comes later).
Timeline Glossary Back to the Master List
Author and Curator: Dr. David P. Stern
Mail to Dr.Stern: stargaze("at" symbol)phy6.org .
Last updated: 9-22-2004
Reformatted 25 March 2006