I would like to include this comic in an early algebra book for parents. How do I contact your permissions department? ;-)
Yesterday, we played with the idea with my daughter. This is such a cool way to introduce it. “And three ducks can never escape a plane, wherever they fly.” I wonder if it should be “n-hyporow” – which isn’t even a word, though.
can you make some joke with ducks( or whatever in a row) for a well ordered sets , and to do sometihing with that ,that would allude to the axiom of choice :))
But what happens when you cross two rows of ducks?
Love!
Corollary?
If you have three ducks, you are in a plane
http://img79.imageshack.us/img79/540/df5e9zk.jpg
I would like to include this comic in an early algebra book for parents. How do I contact your permissions department? ;-)
Yesterday, we played with the idea with my daughter. This is such a cool way to introduce it. “And three ducks can never escape a plane, wherever they fly.” I wonder if it should be “n-hyporow” – which isn’t even a word, though.
can you make some joke with ducks( or whatever in a row) for a well ordered sets , and to do sometihing with that ,that would allude to the axiom of choice :))
Corollary:
If you have any three snakes, they’re in a plane.
i thought in general n ducks would be in a (n-1)-hyperrow
Can this be proved by n-duck-tion?
@dolphinling Not if you have two on the floor and one on an inclined surface