Find all functions $f : R \to R$ such that $$f(f(x) + f(y)^2) = f(x)^2 +y^2f(y)^3.$$ Here $R$ denotes the usual real numbers.

Fow which real values of $m$ does the polynomial $x^3+1995x^2-1994x+m$ have all three roots integers?

Find all functions $f$ from the reals to the reals such that \[f\left(f(x)+y\right)=2x+f\left(f(y)-x\right)\] for all real $x,y$.

For $\alpha \in (0,1)$ we consider the equation $\{x\{x\}\}= \alpha$. a) Prove that the equation has rational solutions if and only if there exist $m,p,q\in\mathbb{Z}$, $0<p<q$, $\gcd(p,q)=1$, such that $\alpha = \left( \frac pq\right)^2 + \frac mq$. b) Find a solution for $\alpha = \frac {2004}{2005^2}$.

Let $n$ be any natural number. Find all $n$-tuples of real numbers $x_1\le x_2\le ... \le x_n$, for which holds $$\left(\sum_{i=1}^n x_i\right)^2 \le n \sum_{i=1}^n x_i x_{n-i+1}.$$

Let $x_1, x_2, ..., x_{24}$ be real numbers. prove that $$x_1 + 2x_2 + 3x_3 +...+ 24x_{24} - 439 \le \frac{x^2_1+x^2_2+... + x^2_{24}}{2}+ 2011.$$

Let $ f(x) \equal{} \frac{x^2\plus{}1}{2x}$ for $ x \neq 0.$ Define $ f^{(0)}(x) \equal{} x$ and $ f^{(n)}(x) \equal{} f(f^{(n\minus{}1)}(x))$ for all positive integers $ n$ and $ x \neq 0.$ Prove that for all non-negative integers $ n$ and $ x \neq \{\minus{}1,0,1\}$ \[ \frac{f^{(n)}(x)}{f^{(n\plus{}1)}(x)} \equal{} 1 \plus{} \frac{1}{f \left( \left( \frac{x\plus{}1}{x\minus{}1} \right)^{2n} \right)}.\]

Determine all infinite sequences of nonnegative integers $a_1,a_2,\ldots$ such that: 1. Every positive integer appears in the sequence at least once, and; 2. $a_i$ is the smallest integer $j$ such that $a_{j+2}=i$, for all $i\ge 1$. [i](Proposed by Ho Janson)[/i]

Let (i) $a_1,a_2,a_3$ is an arithmetic progression and $a_1+a_2+a_3=18$ (ii) $b_1,b_2,b_3$ is a geometric progression and $b_1b_2b_3=64$ If $a_1+b_1,a_2+b_2,a_3+b_3$ are all positive integers and it is a ageometric progression, then find the maximum value of $a_3$.

Let $a$ be a real number such that $\frac{1}{a}=a-[a]$. Show that $a$ is irrational. Clarification: The brackets indicate the integer part of the number they enclose.

Consider an arithmetic progression $a_0,\ldots,a_n$ with $n\ge2$. Prove that $$\sum_{k=0}^n(-1)^k\binom{n}{k}a_k=0.$$

Prove that if $ x,y$ are nonnegative real numbers with $ x\plus{}y\equal{}2$, then: $ x^2 y^2 (x^2\plus{}y^2) \le 2$.

Given that for reals $a_1,\cdots, a_{2004},$ equation $x^{2006}-2006x^{2005}+a_{2004}x^{2004}+\cdots +a_2x^2+a_1x+1=0$ has $2006$ positive real solution, find the maximum possible value of $a_1.$

Let $x>0$ be a real number and $A$ a square $2\times 2$ matrix with real entries such that $\det {(A^2+xI_2 )} = 0$. Prove that $\det{ (A^2+A+xI_2) } = x$.

Find all real numbers $x,y,z$ such that satisfied the following equalities at same time: $\sqrt{x^3-y}=z-1 \wedge \sqrt{y^3-z}=x-1\wedge \sqrt{z^3-x}=y-1$

Let $x,y,z$ be positive numbers such that $x^2+y^2+z^2=1$. Prove that $$\frac x{1-x^2}+\frac y{1-y^2}+\frac z{1-z^2}\ge\frac{3\sqrt3}2$$

Let $\{a_{n}\}$ be a sequence which satisfy $a_{1}=5$ and $a_{n=}\sqrt[n]{a_{n-1}^{n-1}+2^{n-1}+2.3^{n-1}} \qquad \forall n\geq2$ [b](a)[/b] Find the general fomular for $a_{n}$ [b](b)[/b] Prove that $\{a_{n}\}$ is decreasing sequences

The function $ F$ is defined on the set of nonnegative integers and takes nonnegative integer values satisfying the following conditions: for every $ n \geq 0,$ (i) $ F(4n) \equal{} F(2n) \plus{} F(n),$ (ii) $ F(4n \plus{} 2) \equal{} F(4n) \plus{} 1,$ (iii) $ F(2n \plus{} 1) \equal{} F(2n) \plus{} 1.$ Prove that for each positive integer $ m,$ the number of integers $ n$ with $ 0 \leq n < 2^m$ and $ F(4n) \equal{} F(3n)$ is $ F(2^{m \plus{} 1}).$

Prove that the system of equations \[2yz+x-y-z=a,\\ 2xz-x+y-z=a,\\ 2xy-x-y+z=a, \] $a$ being a parameter, cannot have five distinct solutions. For what values of $a$ does this system have four distinct integer solutions?

[b]p1. [/b] At Duke, $1/2$ of the students like lacrosse, $3/4$ like football, and $7/8$ like basketball. Let $p$ be the proportion of students who like at least all three of these sports and let $q$ be the difference between the maximum and minimum possible values of $p$. If $q$ is written as $m/n$ in lowest terms, find the value of $m + n$. [b]p2.[/b] A [i]dukie [/i]word is a $10$-letter word, each letter is one of the four $D, U, K, E$ such that there are four consecutive letters in that word forming the letter $DUKE$ in this order. For example, $DUDKDUKEEK$ is a dukie word, but $DUEDKUKEDE$ is not. How many different dukie words can we construct in total? [b]p3.[/b] Rectangle $ABCD$ has sides $AB = 8$, $BC = 6$. $\vartriangle AEC$ is an isosceles right triangle with hypotenuse $AC$ and $E$ above $AC$. $\vartriangle BFD$ is an isosceles right triangle with hypotenuse $BD$ and $F$ below $BD$. Find the area of $BCFE$. [b]p4.[/b] Chris is playing with $6$ pumpkins. He decides to cut each pumpkin in half horizontally into a top half and a bottom half. He then pairs each top-half pumpkin with a bottom-half pumpkin, so that he ends up having six “recombinant pumpkins”. In how many ways can he pair them so that only one of the six top-half pumpkins is paired with its original bottom-half pumpkin? [b]p5.[/b] Matt comes to a pumpkin farm to pick $3$ pumpkins. He picks the pumpkins randomly from a total of $30$ pumpkins. Every pumpkin weighs an integer value between $7$ to $16$ (including $7$ and $16$) pounds, and there’re $3$ pumpkins for each integer weight between $7$ to $16$. Matt hopes the weight of the $3$ pumpkins he picks to form the length of the sides of a triangle. Let $m/n$ be the probability, in lowest terms, that Matt will get what he hopes for. Find the value of $m + n$ [b]p6.[/b] Let $a, b, c, d$ be distinct complex numbers such that $|a| = |b| = |c| = |d| = 3$ and $|a + b + c + d| = 8$. Find $|abc + abd + acd + bcd|$. [b]p7.[/b] A board contains the integers $1, 2, ..., 10$. Anna repeatedly erases two numbers $a$ and $b$ and replaces it with $a + b$, gaining $ab(a + b)$ lollipops in the process. She stops when there is only one number left in the board. Assuming Anna uses the best strategy to get the maximum number of lollipops, how many lollipops will she have? [b]p8.[/b] Ajay and Joey are playing a card game. Ajay has cards labelled $2, 4, 6, 8$, and $10$, and Joey has cards labelled $1, 3, 5, 7, 9$. Each of them takes a hand of $4$ random cards and picks one to play. If one of the cards is at least twice as big as the other, whoever played the smaller card wins. Otherwise, the larger card wins. Ajay and Joey have big brains, so they play perfectly. If $m/n$ is the probability, in lowest terms, that Joey wins, find $m + n$. [b]p9.[/b] Let $ABCDEFGHI$ be a regular nonagon with circumcircle $\omega$ and center $O$. Let $M$ be the midpoint of the shorter arc $AB$ of $\omega$, $P$ be the midpoint of $MO$, and $N$ be the midpoint of $BC$. Let lines $OC$ and $PN$ intersect at $Q$. Find the measure of $\angle NQC$ in degrees. [b]p10.[/b] In a $30 \times 30$ square table, every square contains either a kit-kat or an oreo. Let $T$ be the number of triples ($s_1, s_2, s_3$) of squares such that $s_1$ and $s_2$ are in the same row, and $s_2$ and $s_3$ are in the same column, with $s_1$ and $s_3$ containing kit-kats and $s_2$ containing an oreo. Find the maximum value of $T$. PS. You should use hide for answers. Collected [url=https://artofproblemsolving.com/community/c5h2760506p24143309]here[/url].

A positive integer \(n\) is called perfect if the sum of its positive divisors \(\sigma(n)\) is twice \(n\), that is, \(\sigma(n) = 2n\). For example, \(6\) is a perfect number since the sum of its positive divisors is \(1 + 2 + 3 + 6 = 12\), which is twice \(6\). Prove that if \(n\) is a positive perfect integer, then: \[ \sum_{p|n} \frac{1}{p + 1} < \ln 2 < \sum_{p|n} \frac{1}{p - 1} \] where the sums are taken over all prime divisors \(p\) of \(n\).

Prove that if real numbers $a,b,c,d$ satisfy $a^2+b^2+(a+b)^2=c^2+d^2+(c+d)^2$, then they also satisfy $a^4+b^4+(a+b)^4=c^4+d^4+(c+d)^4$.

Let $a,b,c$ be distinct numbers such that the equations $x^2+ax+1=0$ and $x^2+bx+c=0$ have a common real root, and the equations $x^2+x+a=0$ and $x^2+cx+b$ also have a common real root. Compute the sum $a+b+c$.

Prove that for all real numbers $a, b, c > 1$ the inequality \[a(b^2 + c) + b(c^2 + a) + c(a^2 + b) \ge a^2 + b^2 + c^2 + 3abc\] holds. When does equality hold? Proposed by [i]Ilija Jovcevski[/i]

Given a positive integer $n$, find all $n$-tuples of real number $(x_1,x_2,\ldots,x_n)$ such that \[ f(x_1,x_2,\cdots,x_n)=\sum_{k_1=0}^{2} \sum_{k_2=0}^{2} \cdots \sum_{k_n=0}^{2} \big| k_1x_1+k_2x_2+\cdots+k_nx_n-1 \big| \] attains its minimum.