1. Find the integral solutions of the equation 
$7(x+y) = 3(x^2-xy+y^2)$.
2. The function $f(x,y)$, defined on the set of all non-negative integers, satisfies
(i) 
$f(0,y)=y+1$(ii)
$f(x+1,0)$=$f(x,1)$(iii)
$f(x+1, y+1)= f(x, f(x+1, y))$Find $f(3,2005)$, $f(4,2005)$.
3. In triangle $ABC$, the altitude, angle bisector and median from $C$ divide the angle $C$ into four equal angles. Find angle $B$.
4. Let $x,y,z$ be positive real numbers such that 
$x+y+z=1$.
For positive integer $n$, define 
$S_n =x^{n}+y^{n}+z^{n}$.
$S_n =x^{n}+y^{n}+z^{n}$.Furthermore, let 
$P = S_{2}S_{2}005$ and 
$Q = S_{3}S_{2}004$.
$P = S_{2}S_{2}005$ and $Q = S_{3}S_{2}004$. (a) Find the smallest possible value of $Q$.
$x,y,z$ are pairwise distinct, determine whether $P$ or $Q$ is larger. 5. Given finitely many points in a plane, it is known that the area of the triangle formed by any three points of the set is less than $1$. Show that all points of the set lie inside or on boundary of a triangle with area less than $4$.
6. Find 
$2^{2006}$ positive integers satisfying the following conditions.
$2^{2006}$ positive integers satisfying the following conditions. (i) Each positive integer has 
$2^{2005}$digits.
$2^{2005}$digits. (ii) Each positive integer only has $7$ or $8$ in its digits.
(iii) Among any two chosen integers, at most half of their corresponding digits are the same.
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