597
/www/nrich/html/content/98/09/six4/
1
2011-02-01T00:00:01
<?xml version="1.0" encoding="UTF-8"?>
<mdoxml version="1.0"><p>A rectangular field measuring 17.5 metres by 10 metres has two posts 7.5 metres apart with a ring on top of each post. The posts are approximately 7 metres from the nearest corners as shown in the diagram. You have two quarrelsome goats and plenty of ropes which you can tie to their collars and you want them to be able to graze the whole field between them. How can you secure them, using the
posts, so they can't fight each other, and how much rope is needed?</p>
<p><mdo:image alt="" src="goat1_small2_reverse.gif"></mdo:image> <mdo:image src="old_goats_final.gif"></mdo:image><mdo:image src="goat1_small3.gif"></mdo:image></p></mdoxml>
<?xml version="1.0" encoding="UTF-8"?>
<mdoxml version="1.0"><br></br>
<p class="editorial">This solution came from Helen of Madras
College who knew what to do with the goats:</p>
<p>The solution would be to get one piece of rope 15 metres long,
loop it through the rings and attach the goats to either end of the
rope. The goats could reach every corner of the field without
difficulty. The worst that could happen would be that their horns
are just touching. The rope slides through the rings at the top of
the posts so at some point one goat may have only 1 metre of space
whilst the other may have 14 metres. They will never be close
enough to fight though. <span class="editorial">(Helen means
circles of diameters 1 metre and 14 metres)</span></p>
<mdo:image width="50%" alt="Helen's drawing of the goats" src="goats_pic.gif"></mdo:image><br></br>
<mdo:image alt="Diagram of the field" src="goat_sol.gif"></mdo:image><br></br>
<p>With this arrangement the goats will be pulling on each other
which is enough to make even the gentlest old goat irritable! To
check that the goats really can reach the corners of the field,
using Pythagoras theorem you find the exact distance from the
centre of the post to the corner is 5$\sqrt 2$ m which is between
7m and 7.1m. Using a single rope 14.6m long which is threaded
through both the rings on the tops of the posts and tied to the
collars on the goats, each goat can reach the corner of the field
at his end but only when the other goat is right up against the
other post. The goats can graze overlapping circles of radius
7.1m.The nearest they can get to each other is along the centre
line when they are always at least 0.4 metres apart.</p>
<p>For the goats to be able to meet the rope would have to be at
least 15m long so if the rope is between 14.6 and 15 metres the
problem is solved.</p>
<br></br></mdoxml>
2
3
0
0
1
0
0
The Old Goats
A rectangular field has two posts with a ring on top of each post.
There are two quarrelsome goats and plenty of ropes which you can
tie to their collars. How can you secure them so they can't fight
each other but can reach every corner of the field?
2D Geometry, Shape and Space
Shape, space & measures - generally
2D Geometry, Shape and Space
Pythagoras' theorem
Using, Applying and Reasoning about Mathematics
Visualising
Sequences, Functions and Graphs
Loci
Secondary Mapping Document
Pythagoras’s Theorem
Secondary Mapping Document
Construction and Loci