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Đề thi học sinh giỏi Toán toàn quốc năm
1996
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Dịch sang tiếng
Anh
| A1. Find all
real x, y such that √(3x) (1 + 1/(x + y) ) = 2 and
√(7y) (1 - 1/(x + y) ) = 4√2. |
| A2. SABC is a
tetrahedron. DAB, EBC, FCA are triangles in the
plane of ABC congruent to SAB, SBC, SCA
respectively. O is the circumcenter of DEF. Let K
be the exsphere of SABC opposite O (which touches
the planes SAB, SBC, SCA, ABC, lies on the
opposite side of ABC to S, but on the same side of
SAB as C, the same side of SBC as A, and the same
side of SCA as B). Show that K touches the plane
ABC at O. |
| A3. Let n be
a positive integer and k a positive integer not
greater than n. Find the number of ordered
k-tuples (a1, a2, ... ,
an) such that: (1) all ai
are different, but all belong to {1, 2, ... , n};
(2) ar > as for some r
< s; (3) ar has the opposite parity
to r for some r. |
| B1. Find all
functions f(n) on the positive integers with
positive integer values, such that f(n) + f(n+1) =
f(n+2) f(n+3) - 1996 for all n. |
| B2. The
triangle ABC has BC = 1 and angle A = x. Let f(x)
be the shortest possible distance between its
incenter and its centroid. Find f(x). What is the
largest value of f(x) for 60o < x
< 180o? |
| B3. Let w, x,
y, z be non-negative reals such that 2(wx + wy +
wz + xy + xz + yz) + wxy + xyz + yzw + zwx = 16.
Show that 3(w + x + y + z) ≥ 2(wx + wy + wz + xy +
xz + yz).
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