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- Xref: sparky sci.math:12837 sci.physics:16097
- Path: sparky!uunet!mcsun!uknet!comlab.ox.ac.uk!nnhost!pcl
- From: pcl@oxford.ac.uk (Paul Leyland)
- Newsgroups: sci.math,sci.physics
- Subject: Re: How do you draw a straight line?
- Message-ID: <PCL.92Oct7090415@black.oxford.ac.uk>
- Date: 7 Oct 92 08:04:15 GMT
- References: <stephen.718357265@mont> <1992Oct6.142703.20829@b11.b11.ingr.com>
- <1ass0lINNhc2@agate.berkeley.edu>
- <1992Oct6.232636.20173@linus.mitre.org>
- Organization: Oxford University Computing Service, 13 Banbury Rd, Oxford, OX2
- 6NN
- Lines: 23
- In-reply-to: bs@gauss.mitre.org's message of 6 Oct 92 23:26:36 GMT
-
- In article <1992Oct6.232636.20173@linus.mitre.org> bs@gauss.mitre.org (Robert D. Silverman) writes:
- In article <1ass0lINNhc2@agate.berkeley.edu> chrisman@wheatena.berkeley.edu (chrisman) writes:
- stuff deleted....
- >a straight line, how about a laser? For the physicist (not the
- >mathematician), I suppose that the path followed by a beam o
- >light is the closest thing to a definition of a straight line.
- >
- It still bends under gravity, unless you assume the Earth is a perfect
- sphere and point it in a direction normal to the surface. Even then,
- there is the Sun's gravity...........
-
- I've known people who *define* "straight line" to be equivalent to
- "geodesic", on the grounds that "a straight line is the shortest
- distance between two points".
-
- Paul
-
-
- --
- Paul Leyland <pcl@oxford.ac.uk> | Hanging on in quiet desperation is
- Oxford University Computing Service | the English way.
- 13 Banbury Road, Oxford, OX2 6NN, UK | The time is come, the song is over.
- Tel: +44-865-273200 Fax: +44-865-273275 | Thought I'd something more to say.
-
