A1. Find all positive integers n < 1000 such that the cube of the sum of the digits of n equals n2.
A2. Given two circles C and C' we say that C bisects C' if their common chord is a diameter of C'. Show that for any two circles which are not concentric, there are infinitely many circles which bisect them both. Find the locus of the centers of the bisecting circles.
A3. Given points P1, P2, ... , Pn on a line we construct a circle on diameter PiPj for each pair i, j and we color the circle with one of k colors. For each k, find all n for which we can always find two circles of the same color with a common external tangent.
B1. Show that any integer greater than 10 whose digits are all members of {1, 3, 7, 9} has a prime factor ≥ 11.
B2. O is the circumcenter of the acute-angled triangle ABC. The altitudes are AD, BE and CF. The line EF cuts the circumcircle at P and Q. Show that OA is perpendicular to PQ. If M is the midpoint of BC, show that AP2 = 2 AD·OM.
B3. Given two points A and B, take C on the perpendicular bisector of AB. Define the sequence C1, C2, C3, ... as follows. C1 = C. If Cn is not on AB, then Cn+1 is the circumcenter of the triangle ABCn. If Cn lies on AB, then Cn+1 is not defined and the sequence terminates. Find all points C such that the sequence is periodic from some point on.
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Iberoamerican Mathematical Olympiad
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