Olympiad problems

VI Soros Olympiad 1999 - 2000 (Russia), 9.2

Solve the equation $[x]\{x\} = 1999x$, where $[x]$ denotes the largest integer less than or equal to $x$, and $\{x\} = x -[x] $

2019 Ramnicean Hope, 3

Tags: algebra , inequalities , equalities , fractional part

For this exercise, $ \{\} $ denotes the fractional part. [b]a)[/b] Let be a natural number $ n. $ Compare $ \left\{ \sqrt{n+1} -\sqrt{n} \right\} $ with $ \left\{ \sqrt{n} -\sqrt{n-1} \right\} . $ [b]b)[/b] Show that there are two distinct natural numbers $ a,b, $ such that $ \left\{ \sqrt{a} -\sqrt{b} \right\} =\left\{ \sqrt{b} -\sqrt{a} \right\} . $ [i]Traian Preda[/i]

2024 CIIM, 6

Tags: series , fractional part , convergence , ana , real analysis

Given a real number $x$, define the series \[ S(x) = \sum_{n=1}^{\infty} \{n! \cdot x\}, \] where $\{s\} = s - \lfloor s \rfloor$ is the fractional part of the number $s$. Determine if there exists an irrational number $x$ for which the series $S(x)$ converges.

2023 Ukraine National Mathematical Olympiad, 9.4

Tags: algebra , fractional part

Find the smallest real number $C$, such that for any positive integers $x \neq y$ holds the following: $$\min(\{\sqrt{x^2 + 2y}\}, \{\sqrt{y^2 + 2x}\})<C$$ Here $\{x\}$ denotes the fractional part of $x$. For example, $\{3.14\} = 0.14$. [i]Proposed by Anton Trygub[/i]

2001 Tuymaada Olympiad, 7

Tags: algebra , fractional part , integer

Several rational numbers were written on the blackboard. Dima wrote off their fractional parts on paper. Then all the numbers on the board squared, and Dima wrote off another paper with fractional parts of the resulting numbers. It turned out that on Dima's papers were written the same sets of numbers (maybe in different order). Prove that the original numbers on the board were integers. (The fractional part of a number $x$ is such a number $\{x\}, 0 \le \{x\} <1$, that $x-\{x\}$ is an integer.)

V Soros Olympiad 1998 - 99 (Russia), 9.3

Tags: system of equations , fractional part , algebra

Solve the system of equations: $$\begin{cases} x + [y] + \{z\}=3.9 \\ y + [z] + \{x\}= 3.5 \\ z + [x] + \{y\}= 2. \end{cases}$$

2011 Laurențiu Duican, 3

Tags: function , real analysis , continuity , fractional part

Let be two continuous functions $ f:[0,\infty )\longrightarrow\mathbb{R} $ satisfying the following equations: $$ \lim_{x\to\infty } f(x) =\infty =\lim_{x\to\infty } g(x) $$ Prove that there exists a divergent sequence $ \left( k_n \right)_{n\ge 1} $ of nonnegative integers which has the property that each term (function) of the sequence of functions $ \left( h_{n} \right)_{n\ge 1} :[0,\infty )\longrightarrow\mathbb{R} $ defined as $$ h_{n} (x) =f\left( k_n+g(x) -\left\lfloor g(x) \right\rfloor \right) , $$ doesn't have limit at $ \infty . $ [i]Romeo Ilie[/i]

1985 Tournament Of Towns, (086) 2

Tags: floor function , integer part , fractional part

The integer part $I (A)$ of a number $A$ is the greatest integer which is not greater than $A$ , while the fractional part $F(A)$ is defined as $A - I(A)$ . (a) Give an example of a positive number $A$ such that $F(A) + F( 1/A) = 1$ . (b) Can such an $A$ be a rational number? (I. Varge, Romania)

2017 Romania National Olympiad, 1

Tags: algebra , fractional part , integer part , floor , logarithm , equation

Solve in the set of real numbers the equation $ a^{[ x ]} +\log_a\{ x \} =x , $ where $ a $ is a real number from the interval $ (0,1). $ $ [] $ and $ \{\} $ [i]denote the floor, respectively, the fractional part.[/i]

2004 District Olympiad, 3

Tags: fractional part , algebra

[b]a)[/b] Show that there are infinitely many rational numbers $ x>0 $ such that $ \left\{ x^2 \right\} +\{ x \} =0.99. $ [b]b)[/b] Show that there are no rational numbers $ x>0 $ such that $ \left\{ x^2 \right\} +\{ x \} =1. $ $ \{\} $ denotes the usual fractional part.

2003 Gheorghe Vranceanu, 1

Tags: fractional part , integer part , algebra

For a real number $ k\ge 2, $ solve the equation $ \frac{\{x\}[x]}{x} =k. $

2024 Israel National Olympiad (Gillis), P2

Tags: remainder , number theory , fractional part

A positive integer $x$ satisfies the following: \[\{\frac{x}{3}\}+\{\frac{x}{5}\}+\{\frac{x}{7}\}+\{\frac{x}{11}\}=\frac{248}{165}\] Find all possible values of \[\{\frac{2x}{3}\}+\{\frac{2x}{5}\}+\{\frac{2x}{7}\}+\{\frac{2x}{11}\}\] where $\{y\}$ denotes the fractional part of $y$.

2003 Argentina National Olympiad, 1

Tags: floor function , algebra , fractional part

Find all positive numbers $x$ such that:$$\frac{1}{[x]}-\frac{1}{[2x]}=\frac{1}{6\{x\}}$$ where $[x]$ represents the integer part of $x$ and $\{x\}=x-[x]$.

2008 Gheorghe Vranceanu, 2

Tags: inequalities , kronecker , number theory , fractional part

Show that there is a natural number $ n $ that satisfies the following inequalities: $$ \sqrt{3} -\frac{1}{10}<\{ n\sqrt 3\} +\{ (n+1)\sqrt 3 \} <\sqrt 3. $$

2008 Gheorghe Vranceanu, 1

Tags: fractional part , integer part , floor function , number theory

At what index the harmonic series has a fractional part of $ 1/12? $

1990 Greece National Olympiad, 4

Tags: algebra , floor function , integer part , fractional part , integer and fractional part

Froa nay real $x$, we denote $[x]$, the integer part of $x$ and with $\{x\}$ the fractional part of $x$, such that $x=[x]+\{x\}$. a) Find at least one real $x$ such that$\{x\}+\left\{\frac{1}{x}\right\}=1$ b) Find all rationals $x$ such that $\{x\}+\left\{\frac{1}{x}\right\}=1$

1999 USAMO, 3

Tags: modular arithmetic , geometry , polynomial , fractional part , algebra

Let $p > 2$ be a prime and let $a,b,c,d$ be integers not divisible by $p$, such that \[ \left\{ \dfrac{ra}{p} \right\} + \left\{ \dfrac{rb}{p} \right\} + \left\{ \dfrac{rc}{p} \right\} + \left\{ \dfrac{rd}{p} \right\} = 2 \] for any integer $r$ not divisible by $p$. Prove that at least two of the numbers $a+b$, $a+c$, $a+d$, $b+c$, $b+d$, $c+d$ are divisible by $p$. (Note: $\{x\} = x - \lfloor x \rfloor$ denotes the fractional part of $x$.)

2012 India Regional Mathematical Olympiad, 3

Tags: algebra , number theory , fractional part , solve- integer part , integer part , solve- fractional part

Solve for real $x$ : $2^{2x} \cdot 2^{3\{x\}} = 11 \cdot 2^{5\{x\}} + 5 \cdot 2^{2[x]}$ (For a real number $x, [x]$ denotes the greatest integer less than or equal to x. For instance, $[2.5] = 2$, $[-3.1] = -4$, $[\pi ] = 3$. For a real number $x, \{x\}$ is defined as $x - [x]$.)