NavList:
A Community Devoted to the Preservation and Practice of Celestial Navigation and Other Methods of Traditional Wayfinding
Re: BBC Puzzle for today
From: Stan K
Date: 2017 Dec 4, 18:41 -0500
From: Stan K
Date: 2017 Dec 4, 18:41 -0500
Frank,
Are you mixing degrees and radians with 10+5/pi? Shouldn't the pi be 180?
Yes, this is cute.
Stan
-----Original Message-----
From: Frank Reed <NoReply_FrankReed@fer3.com>
To: slk1000 <slk1000@aol.com>
Sent: Mon, Dec 4, 2017 12:25 pm
Subject: [NavList] Re: BBC Puzzle for today
From: Frank Reed <NoReply_FrankReed@fer3.com>
To: slk1000 <slk1000@aol.com>
Sent: Mon, Dec 4, 2017 12:25 pm
Subject: [NavList] Re: BBC Puzzle for today
Andrew Nikitin, you wrote:
"Let's say, Santa has a vacation property (which is not in the North pole, or even in the Arctic) with the same property: go 10 miles south, 10 east and 10 north, end up where you started. Where is it?"
"Let's say, Santa has a vacation property (which is not in the North pole, or even in the Arctic) with the same property: go 10 miles south, 10 east and 10 north, end up where you started. Where is it?"
Hmm... I suppose Professor Claus could be at some location near the south pole. In fact, an infinite number of locations? If Santa starts at 10+5/pi miles from the south pole and then walks south for ten miles followed by east for ten miles, he ends up doing one perfect circular lap around the south pole. So when he walks north ten miles, he's right back where he started. And then it's obvious that I can replace 5/pi by 5/pi/N where N is any counting number, and Santa makes N laps around the pole before heading back to his starting point.
Fun! I have never heard this one before. Thank you for bringing it up. ...er... this is what you meant, right??
Frank Reed
