4
Part of 1994 IMO Shortlist
Problems(3)
Functions f(x)f(y) = y^a*f(x/2) + x^b*f(y/2)
Source: IMO Shortlist 1994, A4
8/10/2008
Let denote the set of all real numbers and \mathbb{R}^\plus{} the subset of all positive ones. Let and be given elements in not necessarily distinct. Find all functions f: \mathbb{R}^\plus{} \mapsto \mathbb{R} such that
f(x)f(y) \equal{} y^{\alpha} f \left( \frac{x}{2} \right) \plus{} x^{\beta} f \left( \frac{y}{2} \right) \forall x,y \in \mathbb{R}^\plus{}.
functionalgebrafunctional equationIMO Shortlist
Find the number of positive integers
Source: IMO Shortlist 1994, N4
10/22/2005
Define the sequences as follows. a_0 \equal{} k, b_0 \equal{} 4, c_0 \equal{} 1.
If is even then a_{n \plus{} 1} \equal{} \frac {a_n}{2}, b_{n \plus{} 1} \equal{} 2b_n, c_{n \plus{} 1} \equal{} c_n.
If is odd, then a_{n \plus{} 1} \equal{} a_n \minus{} \frac {b_n}{2} \minus{} c_n, b_{n \plus{} 1} \equal{} b_n, c_{n \plus{} 1} \equal{} b_n \plus{} c_n.
Find the number of positive integers such that some a_n \equal{} 0.
number theoryIMO ShortlistSequencerecurrence relation
Cards and algorithm
Source: IMO Shortlist 1994, C4
3/29/2005
There are n \plus{} 1 cells in a row labeled from to and n \plus{} 1 cards labeled from to . The cards are arbitrarily placed in the cells, one per cell. The objective is to get card into cell for each . The allowed move is to find the smallest such that cell has a card with a label , pick up that card, slide the cards in cells h \plus{} 1, h \plus{} 2, ... , one cell to the left and to place card in cell . Show that at most 2^n \minus{} 1 moves are required to get every card into the correct cell and that there is a unique starting position which requires 2^n \minus{} 1 moves. [For example, if n \equal{} 2 and the initial position is 210, then we get 102, then 012, a total of 2 moves.]
algorithminductionvectorcombinatoricsIMO Shortlist