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Size: 3329
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| Lens machined from PMMA (a.k.a. Lucite, Plexiglass, Perspex, etc; n=1.495) as per calculations in C. Darwin, "The Gravity Field of a Particle", Proc. Roy. Soc. A '''249''', 180 (1959), especially section 8, culminating in equation 29, which gives the deviation of the ray as a function of perihelion distance; see J. Higbie, "Gravitational Lens", Am. J. Phys '''49''', 652 (1981) for practical details. | Lens made in 2007 by Sara Yaeger of the UW Physics Instrument Shop from PMMA (a.k.a. Lucite, Plexiglass, Perspex, etc; n=1.495), as per calculations done by Jim Reardon, based on C. Darwin, "The Gravity Field of a Particle", Proc. Roy. Soc. A '''249''', 180 (1959), especially section 8, culminating in equation 29, which gives the deviation of the ray as a function of perihelion distance; see J. Higbie, "Gravitational Lens", Am. J. Phys '''49''', 652 (1981) for practical details. |
Gravitational Lens, 8C20.40
Topic and Concept:
- General Relativity
Location:
Cabinet: Optics (OP)
Bay: (A1)
Shelf: #1
Abstract:
Lens made in 2007 by Sara Yaeger of the UW Physics Instrument Shop from PMMA (a.k.a. Lucite, Plexiglass, Perspex, etc; n=1.495), as per calculations done by Jim Reardon, based on C. Darwin, "The Gravity Field of a Particle", Proc. Roy. Soc. A 249, 180 (1959), especially section 8, culminating in equation 29, which gives the deviation of the ray as a function of perihelion distance; see J. Higbie, "Gravitational Lens", Am. J. Phys 49, 652 (1981) for practical details.
Looking through the lens from a viewpoint on the lens axis with the flat side facing the viewer, the lens causes incoming light rays to deviate by same amount as would be caused by a black hole with mass m=2.595 x 10^24 kg (a little less than half the mass of the Earth).
This mass was chosen in order that light with an impact parameter of 1 cm would be captured into the "light ring".
The radius of the light ring would be 0.5774 cm.
The event horizon of such a black hole would have a radius of 0.3849 cm.
Lens made by Sara Yaeger of the UW Physics Dept. Instrument Shop in 2007 using a lathe (from a profile calculated by Jim Reardon based on the above papers).
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apparatus |
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light source |
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Setup and Procedure:
The lens can be used to engage and excite an audience, to gain intuition about how gravity affects light, or to observe Einstein Rings (see photo below).
Of note is that partial Einstein rings may be observed even if the observer, lens and source are only very roughly coaxial--alignment does not need to be perfect.
Discussion:
The best current example of an actual Einstein ring is that caused by the luminous red galaxy LRG 3-757 (Hubble Space Telescope photo courtesy of NASA):
The flat spot in the center of the lens profile is set by the thickness of the original piece of Perspex, and has no physical significance.
Videos:
References:
C. Darwin, "The Gravity Field of a Particle", Proc. Roy. Soc. A 249, 180 (1959), especially section 8, culminating in equation 29, which gives the deviation of the ray as a function of perihelion distance;
J. Higbie, "Gravitational Lens", Am. J. Phys 49, 652 (1981)