Math Contests: High School, Vol. 4- School Years: 1996-97 through 2000-2001
Math Olympiad Contest Problems for Elementary and Middle Schools, Vol. 1
Math Contests, Grades 7 & 8, Vol. 1- School Years: 1977-78 Through 1981-82
Competition Math for Middle School
A1. Find all pair of natural numbers x, y such that: (2x + 1)(2x + 2)(2x + 3)(2x + 4) - 5y = 11879
(For 6th grade)
A2. Let n be a positive integer and let U(n) = {d1; d2;...dm} be the set of all positive divisors of n. Prove that
d12 + d22 + ...+ dm2 <
d12 + d22 + ...+ dm2 <
(For 7th grade)
A3. Prove that
where a, b, c are there positive numbers satisfying abc = 1.
A4. Solve the equation
A5. Let ABCD be a square, M is a point lying on CD (M≠C, M≠D). Through the point C draw
a line perpendicular to AM at H, BH meets AC at K. Prove that:
1) MK is always parallel to a fixed line when M moves on the side CD.
2) The circumcenter of the quadrilateral ADMK lies on a fixed line.
A6. Let a, b, c be positive real numbers such that abc = 1. Prove that
(For upper secondary schools)
A7. Conside all triangles ABC where A < B < C≤ 
Find the least value of the expression: M = cot2A + cot2B + cot2C + 2(cotA - cotB)(cotB - cotC)(cotC - cotA).
A8. Suppose that the tetrahedron ABCD statisfies the following conditions: All faces are acute triangles and BC is perpendicular to AD. Let ha, hd be respectively the lengths of the altitudes from A, D onto the opposite faces, and let 2α 
be the measure of the dihedral angle at edge BC, d is the distance between BC and AD. Prove the inequalityl:
be the measure of the dihedral angle at edge BC, d is the distance between BC and AD. Prove the inequalityl: 
Teachers attitudes towards mathematics
Math Olympiad Contest Problems for Elementary and Middle Schools, Vol. 1
Math Contests, Grades 7 & 8, Vol. 1- School Years: 1977-78 Through 1981-82
Math Olympiad Contest Problems for Elementary and Middle Schools, Vol. 1
Math Contests, Grades 7 & 8, Vol. 1- School Years: 1977-78 Through 1981-82
