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Đề thi học sinh giỏi Toán toàn quốc năm
1991
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Dịch sang tiếng
Anh
| A1. Find all
real-valued functions f(x) on the reals such that
f(xy)/2 + f(xz)/2 - f(x) f(yz) ≥ 1/4 for all x, y,
z. |
| A2. For each
positive integer n and odd k > 1, find the
largest number N such that 2N divides
kn - 1. |
| A3. The lines
L, M, N in space are mutually perpendicular. A
variable sphere passes through three fixed points
A on L, B on M, C on N and meets the lines again
at A', B', C'. Find the locus of the midpoint of
the line joining the centroids of ABC and A'B'C'.
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| B1. 1991
students sit in a circle. Starting from student A
and counting clockwise round the remaining
students, every second and third student is asked
to leave the circle until only one remains. (So if
the students clockwise from A are A, B, C, D, E,
F, ... , then B, C, E, F are the first students to
leave.) Where was the surviving student originally
sitting relative to A? |
| B2. The
triangle ABC has centroid G. The lines GA, GB, GC
meet the circumcircle again at D, E, F. Show that
3/R ≤ 1/GD + 1/GE + 1/GF ≤ √3 (1/AB + 1/BC +
1/CA), where R is the circumradius.
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| B3. Show that
x2y/z + y2z/x +
z2x/y ≥ x2 + y2 +
z2 for any non-negative reals x, y, z.
[This is false, (1,2,3), (1,1,1), (1,2,8) give
>, =, < . Does anyone know the correct
question?]
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