| T.R | Title | User | Personal
Name | Date | Lines |
|---|
| 1432.1 | | BUSY::SLAB | Candy'O, I need you ... | Tue Feb 04 1997 14:39 | 7 |
|
Can the string be cut?
And is it longer than the perimeter of the original field?
And can we use any/all tools in the solution?
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| 1432.2 | How long is a piece of string? | CHEFS::STRANGEWAYS | Andy Strangeways@REO DTN 830-3216 | Wed Feb 05 1997 04:15 | 14 |
| Sell the piece of string and use the proceeds to hire a lawyer to
dispute the boundary with your neighbours. Better hope it was a very
long piece of string!
It is not always possible to locate the field without further
information. For instance, if the four posts are themselves at the
corners of a square, then they could have been at the mid-points of the
four boundary lines of a field _/2 times as wide, or they could each
have been, say, 6 inches to the left of one of the corners of the
original square, or anywhere in between.
Other cases will take some more thought ...
Andy.
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| 1432.3 | Some clarification... but not a lot | IOSG::CARLIN | Dick Carlin IOSG, Reading, England | Wed Feb 05 1997 04:28 | 14 |
| Some background. I got this from a newspaper and there it was given as
a pencil and paper exercise. I reworded it to make it more of an
open-ended practical exercise.
I can think of a way to do it with a long piece of string that you may
need to cut, or a shorter length of string and an assistant. But I
don't want to make it any more precise, which might stifle lateral
thinking on your part. Let's say the winner is the person who does it
with the least "equipment".
You have a handful of pegs, and you must end up with one staked in each
corner of your field.
Dick
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| 1432.4 | | IOSG::CARLIN | Dick Carlin IOSG, Reading, England | Wed Feb 05 1997 04:32 | 7 |
| Andy
Sorry, I replied without reading your reply. Consider that case as an
opportunity as Lawyer/Mathematician to get an even bigger field than
was intended.
Dick
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| 1432.5 | | CSC32::MACGREGOR | Colorado: the TRUE mid-west | Wed Feb 05 1997 15:51 | 13 |
|
Not positive about this, but wouldn't the string connecting the four
gateposts into a four sided object be exactly half of the size of the
perimeter of your property. Thus establishing the size of the property
and each side. Then it would be a simple case of geometric proofs to
determine the exact location of the property. At least I think so...
Hmm, on second thought it isn't half the size. Put I'll bet there is a
sqrt 2 involved.
Marc
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| 1432.6 | | BUSY::SLAB | Being weird isn't enough | Thu Feb 06 1997 11:11 | 6 |
|
The length of string required to encircle all 4 posts is not cons-
istent. It depends on the location of the post.
The only reason I know is that I tried it yesterday.
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| 1432.7 | some algebra | 22603::BUCHANAN | the rolling stone catches the worm | Mon Feb 10 1997 00:24 | 28 |
| Andy (in .2) suggests that the problem may not be well-defined.
This is true for one special case, but usually the answer is
well-defined.
All I've got is some algebra, I'm afraid. I'm not very gifted in
the geometric construction space.
Our four posts are ABCD. They form a convex quadrilateral. Join A
to C, and B to D [using string, if you will :-)]. The two lines do
meet, at X. Say the angles these two lines meet at are k+pi/2 and
-k+pi/2, where k lies in [0,pi/2). We can draw two lines through X, one
parallel to each of the undetermined walls of the field. These make
angles p and q with AC and BD, where p and q are =< pi/4. Then:
|AC|cos(p) = |BD|cos(q) [= l, the side length of the square field.]
Now |p-q| = k, so we can rearrange the above as:
tan(q) = cot(k) - (|BD|/|AC|)cosec(k)
which gives us a unique solution for q. Now, Andy's special case is
where AC & BD are perpendicular, and the same length, and the cos
equation does not give us any information.
Good luck with the geometry.
Thanks,
Andrew.
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| 1432.8 | No calculators, sorry. | IOSG::CARLIN | Dick Carlin IOSG, Reading, England | Mon Feb 10 1997 07:53 | 12 |
| Actually the geometrical construction is very simple and lends itself
to a string-only method.
Things you can do with string:
1. Bisect a line.
2. Construct a perpendicular from a point to a line.
...
There, I've given you a clue.
Dick
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| 1432.9 | a solution I think | 22603::BUCHANAN | the rolling stone catches the worm | Mon Feb 17 1997 00:17 | 9 |
| 1. Bisect AC at E
2. Drop a perpendicular from E to BD at F
3. Extend EF so that E is the mid-point of a line GH of length BD
4. AG is a boundary of the field, so is CH.
To prove this, use vectors. Perhaps someone can check for me?
Thanks,
Andrew.
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| 1432.10 | yet another solution | NETCAD::ROLKE | The FDDI Genome Project | Mon Feb 17 1997 11:05 | 42 |
| I had a go at this problem, too. My solution involved realizing that
where AC intersects BD isn't important. Obviously the shortest AC or
BD can get is the length of a side of the square; and the longest is
the length of a diagonal. So if I have a square like this (break out
your monospaced fonts!)
+--B-------+
A |
| C
| |
X |
| Y
+----D-----+
then line AC should give the same answer if it was replaced by
line XY. (Intuitively this disproves the answer in .-1. If I slide
line AC toward line XY then line AG would change and this shouldn't
happen. Or, if AC is perpendicular to BD then where is point E?)
My solution involves translating line AC "up and to the right" so
that point A is coincident with point B. Now I have a trianglular
figure with point AB on one corner and points C and D on opposite
sides of the square. I solve for this congruent square and then
translate "down and to the left" to get the actual answer.
To solve for the square:
BA----------+
| C
| |
S |
| |
| |
+-D--------+
Construct a perpendicular to BD from point C of length BD. The
left endpoint of this line, point S, is on the left side of the square.
Join point S to point (AB). Now construct a perpendicular from S(AB) to
point C. This line is the length of a side of the square and parallel
to to two of them. Constructing the square from here is straight forward.
Regards,
Chuck
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| 1432.11 | | CSC32::MACGREGOR | Colorado: the TRUE mid-west | Mon Feb 17 1997 12:05 | 9 |
|
I've been thinking about this and it is more difficult than I first
thought. For example, none of the "proofs" in here that I've seen can
handle the following: ABCD (the four points on the sides) make a
perfect square themselves. Now there is TWO solutions. Either they
are the midpoints (bisects) of each side, or they are the corners.
Marc
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| 1432.12 | why doesn't .10 work? | NETCAD::ROLKE | The FDDI Genome Project | Mon Feb 17 1997 12:28 | 20 |
| > I've been thinking about this and it is more difficult than I first
> thought. For example, none of the "proofs" in here that I've seen can
> handle the following: ABCD (the four points on the sides) make a
> perfect square themselves. Now there is TWO solutions. Either they
> are the midpoints (bisects) of each side, or they are the corners.
Marc,
Sorry. My answer in .10 isn't a proof at all, it is a construction.
Give me any four points and I'll construct a square which passes through
them using only pegs and a string. Why doesn't it work?
For the degenerate case where ABCD form a square as given, please reread
.2. There are more than two solutions: any square with a side length from AB
to AC can be an answer. I believe that my construction in .10 will give
you the short-side answer where the resulting square has sides with
length AB.
Regards,
Chuck
|
| 1432.13 | how about this one? | NETCAD::ROLKE | The FDDI Genome Project | Mon Feb 17 1997 12:59 | 8 |
| 1. From point C draw a line CS perpendicular to BD of length BD.
2. Point S and point A are on one side of the square.
3. The distance from point C to line CS is the length of sides of the square.
My original soluton (.10) had that translation business but that isn't
really needed.
Chuck
|
| 1432.14 | Oh, for a picture | NETCAD::ROLKE | The FDDI Genome Project | Mon Feb 17 1997 14:14 | 7 |
| Andrew,
I re-read .9 and I believe that you are correct. In Step 2 you wanted
a perpendicular to line BD and not AC as I had thought. Indeed AG
and CH are the desired sides.
Chuck
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| 1432.15 | | CSC32::MACGREGOR | Colorado: the TRUE mid-west | Mon Feb 17 1997 19:14 | 12 |
|
Maybe I'm missing something here Chuck. Explain to me how finding "A
square" that fits the 4 posts tells you exactly where the property
boundaries are located. As far as I can tell it can't be done and .2
(as you pointed out) has the only relevant piece of information in
here. We need a bare minimum of one other piece of information in
order to solve the puzzle in the base note.
I don't think we are disagreeing.
Marc
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| 1432.16 | summary from my perspective | 22603::BUCHANAN | the rolling stone catches the worm | Wed Feb 19 1997 22:38 | 35 |
| Re -.1
Andy Strangeways in .2 suggested that the problem was flawed, by
presenting a case where there was no unique answer.
In a later reply, I showed that in most cases, there *is* a unique
answer. The problem is ill-defined only in the case where the two
diagonals meet at right-angles. Note that this is a superset of the
original observation, that there was a problem if the four points form
a square.
In a further reply, I gave a constructive solution, without proof.
Of course, this constructive solution does not work in the pathological
case. It gives one more confidence in the solution to see that it
breaks down at this point.
However, there is a hole in my construction. It will not work in
the special case where the two diagonals bisect one another. I don't see any
obvious way to patch the construction to cover this case. This is a
different issue from the pathology in the original problem statement.
I have not yet studied the alternative construction proposed in
the earlier notes, but it seems plausible to me that such an approach
might work. It would not suffer from the minor defect present in my
construction, since it takes a different approach.
It's actually very common in geometry problems for the basic
argument to break down in certain special cases. Often, the problem
statement excludes such possibilities, e.g. by specifying that "the
points are all in general position". I think it's valuable to approach
this problem in that spirit and not get hung up on the pathological
case of orthogonal diagonals.
Cheers,
Andrew.
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| 1432.17 | Simplicity itself | 22603::BUCHANAN | the rolling stone catches the worm | Wed Feb 19 1997 23:31 | 13 |
| Gosh, I was so slow. It's really very simple:
Let E lie on BD such that AE is orthogonal to BD.
Let F lie on AE such that |AF| = |BD| (& such that E is *between* A&F)
Then CF lies on a boundary line of the field.
Once the first boundary line is established, it's easy to get the others,
and figure the size of the field. Note that the only way this algorithm fails
is if C&F are the same, ie, if AC & BD are orthogonal. Exactly as it should
be. This illustrates the proverb: "The exception proves the rule".
Cheers,
Andrew.
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| 1432.18 | Case closed | IOSG::CARLIN | Dick Carlin IOSG, Reading, England | Tue Feb 25 1997 05:20 | 10 |
| Sorry I haven't revisited this for a while, but you have cleaned up
nicely, Andrew, in <.17>. That is basically the solution I was looking for.
For accuracy's sake you would drop the perpendicular from whichever of
A or C was further from BD. I think we all realise how to drop the
perpendicular with string only.
Congrats
Dick
|