Being as people were bored and someone asked for a puzzle....

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Bacchus replied

21 October 2014, 19:15
Originally posted by MyUserName View Post

You can assume that the goat is a particle.

Originally posted by BrilloPad View Post

Goat curry anyone?

There won't be enough to go round if it's a particle
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BrilloPad replied

21 October 2014, 18:32
Goat curry anyone?
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Bacchus replied

21 October 2014, 18:27
Originally posted by ASB View Post

The 4 relevant areas are 2 segments with a chord of length r2 (on circle1). An isoceles triangle with sides of r2 and an angle unknown. The final piece being a chord with length the base of the isoceles triangle (on circle2).

I think there are just two areas? If you draw a straight line between where the goat's arc of nibbling intersects with the edge of the garden (a chord) you will have two segments.

I can't remember the formula for the area of a segment, but you can be pretty sure it involves pi and the radius, the radius of the garden is fixed, and the radius of the goat's arc of nibbling is what we are trying to find.

If only I still smoked I could draw it on the back of a fag packet (c:
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Doggy Styles replied

21 October 2014, 13:41
Does this involve that funny old calculus stuff?
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xoggoth replied

21 October 2014, 11:08
Oh, inside edge! Didn't read it properly, thought it looked too easy.
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ASB replied

21 October 2014, 09:12
Originally posted by Contreras View Post

Yes, that is the question. Or is it?

Tether needs to be > radius of the field otherwise clearly it would reach less than half the field area. It needs to be < √2 or clearly the goat would reach more than half the field. So somewhere between 1.0 and 1.4ish.

However the maths seems so impossibly difficult that it must be a trick question. Is the tether fixed to a single point? I'm not sure that was stated. Anyway, off to google now...

Yes. I was looking at the ratio the wrong way round.

Root 2 looks like it might have been the right answer (it isn't).

The 4 relevant areas are 2 segments with a chord of length r2 (on circle1). An isoceles triangle with sides of r2 and an angle unknown. The final piece being a chord with length the base of the isoceles triangle (on circle2).

It will involve using a cosine and an arc sine.

Maybe I should have listened a bit more in my geometry and trig all those years ago when I was about 13.
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MyUserName replied

21 October 2014, 08:01
Originally posted by pjclarke View Post

So it is, and there is a formula for overlapping circles, that I CBA to look up but which involves a square root and at least one cosine. The intersecting arcs define an area consisting of two segments the triangular height of which can be derived from the radiuses.

At this point I hand over Bob to code up the solution.

He got back to me and said that the answer was "Helium" but when I tried running the program myself it threw an exception.
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pjclarke replied

21 October 2014, 07:55
Originally posted by ASB View Post

So, circle 1 in the field.

Given the mythical goat is tether at the inside edge then the length of the tether defines another circle.

However it is bounded by the first circle, so defines an arc.

So the question is

"What is radius of a circle which is centered on the edge of another circle where the overlapping arc is equal to half the entire area of the overlapped circle"

At least I think that is the question.

So it is, and there is a formula for overlapping circles, that I CBA to look up but which involves a square root and at least one cosine. The intersecting arcs define an area consisting of two segments the triangular height of which can be derived from the radiuses.

At this point I hand over Bob to code up the solution.
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MyUserName replied

21 October 2014, 06:14
Originally posted by Project Monkey View Post

Depends. Which part of the goat is attached to the inflexible chain, how big is the goat, how long is its neck etc. If it's a very small field that I supposed it's feasible.

You can assume that the goat is a particle.
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EternalOptimist replied

21 October 2014, 00:43
The answer is to give the goat a tether that will allow it to reach the far side of the circle.
i.e. = D

This obviously means that the goat can cover the whole field and therefore eat twice the amount specified in the opening question.

The resolution is to introduce a second goat on the other side with a tether that = D.

Each goat will scoff half the grass
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Contreras replied

20 October 2014, 23:23
Originally posted by ASB View Post

So, circle 1 in the field.

Given the mythical goat is tether at the inside edge then the length of the tether defines another circle.

However it is bounded by the first circle, so defines an arc.

So the question is

"What is radius of a circle which is centered on the edge of another circle where the overlapping arc is equal to half the entire area of the overlapped circle"

At least I think that is the question.

Yes, that is the question. Or is it?

Tether needs to be > radius of the field otherwise clearly it would reach less than half the field area. It needs to be < √2 or clearly the goat would reach more than half the field. So somewhere between 1.0 and 1.4ish.

However the maths seems so impossibly difficult that it must be a trick question. Is the tether fixed to a single point? I'm not sure that was stated. Anyway, off to google now...
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Doggy Styles replied

20 October 2014, 22:24
Originally posted by xoggoth View Post

0.7071 of radius?

If it was centred so the goat's circle was entirely within the field.

But it's centred in the edge of the field so you are looking at the area of overlap of the two circles.
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ASB replied

20 October 2014, 18:18
That was my initial thought. But having drawn it I couldn't be arrised to try and figure it out for sure.
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xoggoth replied

20 October 2014, 17:38
0.7071 of radius?
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ASB replied

20 October 2014, 17:07
So, circle 1 in the field.

Given the mythical goat is tether at the inside edge then the length of the tether defines another circle.

However it is bounded by the first circle, so defines an arc.

So the question is

"What is radius of a circle which is centered on the edge of another circle where the overlapping arc is equal to half the entire area of the overlapped circle"

At least I think that is the question.
Leave a comment: