User:Asf

Revision as of 18:02, 7 July 2011 by Asf (talk | contribs)

This page is a collection of problems (without solutions from me yet) from a math circle because I don't know where else to put them.

January 27, 2011

1. Place 4 points on the plane in such a way that every triangle with vertices at these 4 points is isosceles. Could you do the same with 5 points? More than 5 points?

2. Plot 2 points A and B a distance 2 units apart (choose your own unit length).

(a) Place 6 points in such a way that for every point $P$ of these 6 points, \[AP-BP=0,\] i.e. the difference between the distances from P to the two points B is exactly 0.

(b) Place 6 points in such a way that for every point $P$ of these 6 points either \[AP-BP=1\text{ or }BP-AP=1,\] i.e. the positive difference between the distances from P to the two points A and B is exactly 1.

February 3, 2011

1. A hungry caterpillar climbs up a tree that is 14 meters tall. During the day, she goes up 6 meters, and during the night, she drops 4 meters. In how many days will she reach the top of the tree?

2. Two boys can eat two cookies in two minutes. How many cookies can six boys eat in six minutes?

3. (a) Does there exist a triangle with sides of lengths 1, 2, and 3?

(b) Does there exist a triangle with heights of lengths 1, 2, and 3?

February 10, 2011