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Find the last two digit numbers of $3^{9999}-2^{9999}$ .
Compare the sum (consisting of $n+1$ terms) $S_{n}=\frac{2}{101+1}+\frac{2^{2}}{101^{2}+1}+\ldots+\frac{2^{n+1}}{101^{2 \prime}+1}$ $S_{n}=\frac{2}{101+1}+\frac{2^{2}}{101^{2}+1}+\ldots+\frac{2^{n+1}}{101^{2 \prime}+1}$ with $0,02$ .
Let $a$ , $b$ and $c$ be positive numbers such that $a b+b c+c a=1$ . Prove the inequality $\frac{1}{a b}+\frac{1}{b c}+\frac{1}{c a} \geq 3+\sqrt{\frac{1}{a^{2}}+1}+\sqrt{\frac{1}{b^{2}}+1}+\sqrt{\frac{1}{c^{2}}+1}.$ $\frac{1}{a b}+\frac{1}{b c}+\frac{1}{c a} \geq 3+\sqrt{\frac{1}{a^{2}}+1}+\sqrt{\frac{1}{b^{2}}+1}+\sqrt{\frac{1}{c^{2}}+1}.$ When does equality occur?
Solve the equation $\sqrt{7 x^{2}-22 x+28}+\sqrt{7 x^{2}+8 x+13}+\sqrt{31 x^{2}+14 x+4}=3 \sqrt{3}(x+2).$ $\sqrt{7 x^{2}-22 x+28}+\sqrt{7 x^{2}+8 x+13}+\sqrt{31 x^{2}+14 x+4}=3 \sqrt{3}(x+2).$
Let $A B C D$ be a rectangular with $A B<B C$ . Let $M$ be a point, different from $A$ and $B$ , on the half-circle with $A B$ as its diameter and on the same side with $CD$ . $MA$ and $MB$ meet $CD$ at $P$ and $Q$ respectively. $M C$ and $M D$ meet $A B$ at $E$ and $F$ respectively. Find the position of the point $M$ on the half-circle such that the sum $P Q+E F$ is smallest possible. Calculate this smallest value.
Find all pairs of positive integers $a$ , $b$ such that $q^{2}-r=2007,$ where $q$ and $r$ are respectively the quotient and the remainder obtained when dividing $a^{2}+b^{2}$ by $a+b$
Consider the equation $a x^{3}-x^{2}+b x-1=0$ $a x^{3}-x^{2}+b x-1=0$ where $a, b$ are real numbers, $a \neq 0$ and $a \neq b$ such that all of its roots are positive real numbers. Find the smallest value of $P=\frac{5 a^{2}-3 a b+2}{a^{2}(b-a)}.$ $P=\frac{5 a^{2}-3 a b+2}{a^{2}(b-a)}.$
Choose five points $A$ , $B$ , $C$ , $D$ and $E$ on a sphere with radius $R$ such that $\widehat{B A C}=\widehat{C A D} =\widehat{D A E}=\widehat{E A B}=\frac{2}{3} \widehat{B A D}=\frac{2}{3} \widehat{C A E}.$ $\widehat{B A C}=\widehat{C A D} =\widehat{D A E}=\widehat{E A B}=\frac{2}{3} \widehat{B A D}=\frac{2}{3} \widehat{C A E}.$ Prove the inequality $A B+A C+A D+A E \leq 4 \sqrt{2} R.$ $A B+A C+A D+A E \leq 4 \sqrt{2} R.$
Suppose that $M$ , $N$ and $P$ are three points lying respectively on the edges $A B$ , $B C$ . $C A$ of a triangle $A B C$ such that $A M+B N+C P=M R+N C+P A.$ $A M+B N+C P=M R+N C+P A.$ Prove the inequality $S_{M N P} \leq \dfrac{1}{4} S_{A B C}$ .
Find the limit $\lim_{n \rightarrow+\infty}\sqrt{2-\sqrt{2}} \cdot \sqrt{2-\sqrt{2+\sqrt{2}}} \cdots \underbrace{\sqrt{2-\sqrt{2+\sqrt{2+\ldots+\sqrt{2}}}}}_{n \text { signsor railiad }}$ $\lim_{n \rightarrow+\infty}\sqrt{2-\sqrt{2}} \cdot \sqrt{2-\sqrt{2+\sqrt{2}}} \cdots \underbrace{\sqrt{2-\sqrt{2+\sqrt{2+\ldots+\sqrt{2}}}}}_{n \text { signsor railiad }}$
Denote by $[x]$ the largest integer not exceeding $x$ and write $\{x\}=x-[x] .$ Find the limit $\displaystyle \lim _{n \rightarrow+\infty}(7+4 \sqrt{3})^{n}$ }
Let $n$ be a positive integer and $2 n+2$ real numbers $a, b, a_{1}, a_{2}, \ldots, a_{n}, b_{1}, b_{2}, \ldots, b_{n}$ such that $a_{i} \neq 0(i=1,2, \ldots, n)$ and the function $F(x)=\sum_{i=1}^{n} \sqrt{a_{i} x+b_{i}}-(a x+b)$ $F(x)=\sum_{i=1}^{n} \sqrt{a_{i} x+b_{i}}-(a x+b)$ satisfies the following property: There exists distinct real numbers $\alpha, \beta$ such that $F(\alpha)=F(\beta)=0$ Prove that $\alpha$ and $\beta$ are the only real solutions of the equation $F (x) = 0$
There are three bells in the laboratory. The first bell rings every $4$ minutes, the second every $12$ minutes, the third every $16$ minutes. The three bells ring simultaneously at $7^{\text {h }} 30$ in the morning.
a) At what next time do the three bells ring simultaneously?
b) From $7^{\mathrm{h}} 30$ to $11^{\mathrm{h}} 30$ p.m., how many times do only two bells ring simultaneously?
a) In the figure let $\widehat{B E C}=30^{\circ}$ , $\widehat{A C D}=70^{\circ}$ , $\widehat{C D E}=110^{\circ}$ and $\widehat{B A C}=\widehat{C E D}=\widehat{A B E}$ and justify the answer.
b) How many triangles are there in the figure? Write down these triangles.
Find the integer-solutions of the equation $4(a-x)(x-b)+b-a=y^{2}$ $4(a-x)(x-b)+b-a=y^{2}$ where $a, b$ are given integers, $a>b$ .
Prove that the equation $(n+1) x^{n+2}-3(n+2) x^{n+1}+a^{n+2}=0$ $(n+1) x^{n+2}-3(n+2) x^{n+1}+a^{n+2}=0$ (where $n$ is a given even positive integer and $a>3$ ) has no solution.
Prove that $\sqrt{\frac{a}{b}}+\sqrt{\frac{b}{a}}+\frac{3(\sqrt{a}+\sqrt{b})}{\sqrt{a+b}}>6$ $\sqrt{\frac{a}{b}}+\sqrt{\frac{b}{a}}+\frac{3(\sqrt{a}+\sqrt{b})}{\sqrt{a+b}}>6$
Let $A B C$ be a triangle ; on the opposite rays of the rays $B A, C A$ take respectively the points $E, F$ (distinct from $B, C)$ $B F$ cuts $C E$ at $M$ . Prove that $\frac{M B}{M F}+\frac{M C}{M E} \geq 2 \sqrt{\frac{A B \cdot A C}{A F \cdot A E}}$ $\frac{M B}{M F}+\frac{M C}{M E} \geq 2 \sqrt{\frac{A B \cdot A C}{A F \cdot A E}}$ When does equality occur?
Let be given a convex quadrilateral $A B C D$ . $A B$ cuts $C D$ at $E$ , $A D$ cuts $B C$ at $F$ . The diagonals $A C$ , $B D$ intersect at $O$ . Let $M$ , $N$ , $P$ , $Q$ be respectively the midpoints of $A B$ , $B C$ , $C D$ , $DA$ . $CF$ cuts $M P$ at $H$ , $O E$ cuts $N Q$ at $K$ . Prove that $H K$ is parallel to $E F$ .
Let $x, y, p$ be integers such that $p>1$ and $x^{2002}$ , $y^{2003}$ are divisible by $p$ . Prove that $1+x+y$ is not divisible by $p$ .
Let $a_{1}, a_{2}, \ldots a_{n}$ and $b_{1}, b_{2}, \ldots, b_{n}$ be positive numbers. Prove that
a) $\displaystyle \frac{d_{1}^{r}}{b_{1}^{r-1}}+\frac{c_{2}}{b_{2}^{r-1}}+\ldots+\frac{a_{n}^{r}}{b_{n}^{r-1}} \geq \frac{\left(a_{1}+a_{2}+\ldots+a_{n}\right)^{r}}{\left(b_{1}+b_{2}+\ldots+b_{n}\right)^{r-1}}$ where $r$ is a rational number, $r>1$ ;
b) $\displaystyle \frac{a_{1}^{s}}{b_{1}}+\frac{a_{2}^{s}}{b_{2}}+\ldots+\frac{a_{n}^{s}}{b_{n}} \geq \frac{\left(a_{1}+a_{2}+\ldots+a_{n}\right)^{s}}{n^{s-2}\left(b_{1}+b_{2}+\ldots+b_{n}\right)}$ where $s$ is a rational number, $s \geq 2$ .
The sequence of numbers $\left(v_{n}\right)$ is defined by $v_{0}=1,\quad v_{n}=\frac{-1}{3+v_{n-1}},\,\forall n=1,2,3, \ldots$ $v_{0}=1,\quad v_{n}=\frac{-1}{3+v_{n-1}},\,\forall n=1,2,3, \ldots$ Prove that the sequence has a limit and find this limit.
$M$ is a point inside an acute triangle $A B C$ with $B C=a$ , $C A=b$ , $A B=c$ . Let $D$ , $E$ , $F$ be respectively the orthogonal projections of $M$ on the sides $B C$ , $C A$ , $A B$ . Find the greatest value of the expression $P=a \cdot M E \cdot M F + b \cdot M F \cdot M D+c \cdot M D \cdot M E$ $P=a \cdot M E \cdot M F + b \cdot M F \cdot M D+c \cdot M D \cdot M E$ and determine the position of $M$ where this expression assumes its greatest value.
Let $S_{A}$ , $S_{B}$ , $S_{C}$ , $S_{D}$ be respectively the areas of the faces $B C D$ , $C D A$ , $D A B$ , $A B C$ of a tetrahedron $A B C D$ and $R$ be the radius of the circumscribed sphere of $A B C D$ . Prove that $R \geq \frac{T}{S_{A}+S_{B}+S_{C}+S_{D}}$ $R \geq \frac{T}{S_{A}+S_{B}+S_{C}+S_{D}}$ where $T^{2}=A B^{2} S_{A} S_{B}+A C^{2} S_{A} S_{C}+A D^{2} S_{A} S_{D}+B C^{2} S_{B} S_{C}+B D^{2} S_{B} S_{D}+C D^{2} S_{C} S_{D}.$ $T^{2}=A B^{2} S_{A} S_{B}+A C^{2} S_{A} S_{C}+A D^{2} S_{A} S_{D}+B C^{2} S_{B} S_{C}+B D^{2} S_{B} S_{D}+C D^{2} S_{C} S_{D}.$ When does equality occur?

PROBLEM OF THE WEEK | ЗАДАЧА НА НЕДЕЛАТА

PW 150. Prove that the sum

S_{n} = \sum_{k = 0}^{n} \frac{1}{C_{n}^{k}}

has a finite limit when

n

tends to infinity and find this limit (

C_{n}^{k}

are binomial coefficients).

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June 23 to 28 Tirana, Albania

July 2 to 13 Chiba, Japan

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June 23 to 28
Tirana, Albania

July 2 to 13
Chiba, Japan