09 January 2012
and 
and let 
. If
and let . If 
, then find the side length of the square.
2. In the attached figure as below, given are 
in a circle in this order and suppose the angle of the tangent at 
and the line 
is 
, and that of the tangent at 
and the line 
is 
. If 
and they are located across the center of the circle, then find 
.
in a circle in this order and suppose the angle of the tangent at and the line is , and that of the tangent at and the line is . If and they are located across the center of the circle, then find . 
4. Let 
be a positive integer which is a multiple of 3, but isn't a multiple of 9. If adding the product of each digit of to gives a multiple of 9, then find the possible minimum value of .
be a positive integer which is a multiple of 3, but isn't a multiple of 9. If adding the product of each digit of to gives a multiple of 9, then find the possible minimum value of . 
6. Given a grid 
, each grid square is colored either red or blue, in such a way that :
, each grid square is colored either red or blue, in such a way that :
There exists at least one grid square colored red, and at least one colored blue. All grid squares colored red are connected, and so are all grid squares colored blue.How many possibilities are there for such colorings?
Note that two distinct grid squares are considered to be connected when they share an edge.
8. How many methods to write down the array of the positive integers such that :
Write down 
in the first place, in the last 
.
in the first place, in the last .Note : The next to 
is written a positive number which is less than 
.
is written a positive number which is less than . 9. and wrote two positive integers respectively in a black board. The product of the numbers written by was twice as the sum of the numbers written by and the product of the numbers written by was twice as the sum of the numbers written by and the sum of the numbers written by is more than or equal to that of . Find all possible sum written by .
and wrote two positive integers respectively in a black board. The product of the numbers written by was twice as the sum of the numbers written by and the product of the numbers written by was twice as the sum of the numbers written by and the sum of the numbers written by is more than or equal to that of . Find all possible sum written by .Note: Four numbers written are not always distinct.
10. How many positive integers are there such that
are there such that
that :
if a given square is colored, then the other squares that share only a single vertex (i.e., not a whole edge) with that square aren't colored.
How many possibilities are there coloring in such a way?
Note that two colorings are considered to be distinct if they differ by a rotation or reflection of the square.
12. In a plane given are a cube 
with sidelength and a plane, the common part of the cubic and the plane form 6-polygon 
such that
with sidelength and a plane, the common part of the cubic and the plane form 6-polygon such that 
.If
,then find the value of
.
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