Find all values of the real parameter $a$, so that the equation $x^2+(a-2)x-(a-1)(2a-3)=0$ has two real roots, so that the one is the square of the other.

Determine all pairs of non-negative integers $(m, n)$ with m ≥n, such that $(m+n)^3$ divides $2n(3m^2+n^2)+8$

It is possible to place the $2014$ points in the plane so that we can construct $1006^2$ parralelograms with vertices among these points, so that the parralelograms have area 1?

Let $ABC$ be an acute triangle with $AB\le AC$ and let $c(O,R)$ be it's circumscribed circle (with center $O$ and radius $R$). The perpendicular from vertex $A$ on the tangent of the circle passing through point $C$, intersect it at point $D$. a) If the triangle $ABC$ is isosceles with $AB=AC$, prove that $CD=BC/2$. b) If $CD=BC/2$, prove that the triangle $ABC$ is isosceles.