Tài liệu Toán học, Olympic toán toàn quốc - Việt nam 1999 pptx
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Đề thi:Toán học, Olympic toán toàn quốc - Việt nam 1999
Bài từ Tủ sách Khoa học VLOS A1. Find all real solutions to (1 + 42x-y)(5y-2x+1) =
22x-y+1 + 1, y3 + 4x + ln(y2 + 2x) + 1 = 0.
A2. ABC is a triangle. A' is the midpoint of the arc BC of the circumcircle not containing
A. B' and C' are defined similarly. The segments A'B', B'C', C'A' intersect the sides of the
triangle in six points, two on each side. These points divide each side of the triangle into
three parts. Show that the three middle parts are equal iff ABC is equilateral.
A3. The sequence a1, a2, a3, is defined by a1 = 1, a2 = 2, an+2 = 3an+1 - an. The
sequence b1, b2, b3, is defined by b1 = 1, b2 = 4, bn+2 = 3bn+1 - bn. Show that the
positive integers a, b satisfy 5a2 - b2 = 4 iff a = an, b = bn for some n.
B1. Find the maximum value of 2/(x2 + 1) - 2/(y2 + 1) + 3/(z2 + 1) for positive reals x, y,
z which satisfy xyz + x + z = y.
B2. OA, OB, OC, OD are 4 rays in space such that the angle between any two is the
same. Show that for a variable ray OX, the sum of the cosines of the angles XOA, XOB,
XOC, XOD is constant and the sum of the squares of the cosines is also constant.
B3. Find all functions f(n) defined on the non-negative integers with values in the set {0,
1, 2, , 2000} such that: (1) f(n) = n for 0 d" n d" 2000; and (2) f( f(m) + f(n) ) = f(m +
n) for all m,n
