2007 Cyprus MO/Lyceum/Problems
Contents
Problem 1
If , then the value of the expression is
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Problem 2
Given the formula , then equals to
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Problem 3
A cyclist drives form town A to town B with velocity and comes back with velocity . The mean velocity in for the total distance is
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Problem 4
We define the operation , .
The value of is
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Problem 5
If the remainder of the division of with is , then the remainder of the division of with is
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Problem 6
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is a square of side length 2 and is an arc of the circle with centre the midpoint of the side and radius 2. The length of the segments is
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Problem 7
If a diagonal of a rectangle forms a angle with one of its sides, then the area of the recangle is
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E. None of these
Problem 8
If we substract from 2 the inverse number of , we get the inverse of . Then the number equals to
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Problem 9
We consider the sequence of real numbers such that , and , . The value of the term is
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Problem 10
The volume of an orthogonal parallelepiped is and its dimensions are integer numbres. The minimum sum of the dimensions is
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E. None of these
Problem 11
If and , which of the following is correct?
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Problem 12
The function has the properties and , where is a constant. The value of is
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Problem 13
If are the roots of the equation and are the roots of the equation , then the expression equals to
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Problem 14
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Problem 15
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