4. Let P and Q be on segment of an acute triangle ABC such that ∠PAB = ∠BCA
and ∠CAQ = ∠ ABC. Let M and N be the points on AP and AQ, respectively,
such that P is the midpoint of AM and Q is the midpoint of AN. Prove that
the intersection of BM and CN is on the circumference of triangle ABC.
5. For every positive integer n, Cape Town Bank issues some coins that has
1/n value. Let a collection of such finite coins(coins does not necessarity
have different values) which ssum of their value is less than 99 + 1/2.
Prove that we can devide the collection into at most 100 groups such that
sum of all coins' value does not exceed 1.
6. A set of lines in the plane is in general position if no two are paralled
and no three pass through the same point. A set of lines in general
position cuts the plane into regions, some of which have finite area; we
call these its finite regions. Prove that for all sufficient large n, in
any set of n lines in general position it is possible to colour at least
√n lines blye in such a way that none of its finite regions has a
completely blue boundry.
Note: Results with √n replaced by c√n will be awarded points depending on
the value of the constant c.