Re: HSC 2013 4U Marathon
I worked out a rudimentary (and probably flawed) way of solving it, but it requires solving
, which I cannot do. So
.
Here is basically the way I was doing it:
http://i.imgur.com/voDXmVw.png
The dark blue is a semicircle. The green is the area swept out if the string is tangential to the circle, which I reasoned (possibly incorrectly, someone check me on this) is the furthest the goat can go and so forms the perimeter of the area. Reaching the grass on the left side of the goat is best done by going around the left, and similar with the right, so there is no need for the goat to go all the way around. This simplifies solving for the area because it prevents area overlap from affecting the answer. The light blue bit is the area within this perimeter that isn't found by solving the integral.
The problem is that you have to find the angle
that occurs when the goat is directly on the other side of the tank from where the rope is fixed. That requires solving the aforementioned equation, which I can't do. Thus
I give up. /flips table.
If you were to find
though, solving becomes simple. The semicircle is easy to find, the green area can be solved with an integral like Sy did, and the light blue area is just geometry (the area of a right-angle triangle minus the area of the sector, all multiplied by two).
But yes. Let's move on.
Let's just do Sy's question:
Edit: Ok, so, I worked out the formula
by working
backwards from the second part, which obviously you can't do in a proof. I'm really not quite sure how much proving I need to do in this kind of question: after I figure it out in my head using bastard backwards mathematics, can I just state it? Do I have to derive it from the recursive formula? And if I just state it, should I then prove it by induction? Not really sure on these points.
The second part is simple enough using a telescoping sum:
2^{n-1} + 2)
2^{n+1} + 2)
