Let $a$, $b$, $c$, $d$, and $e$ be five positive integers. If $ab+c=3115$, $c^2+d^2=e^2$, both $a$ and $c$ are prime numbers, $b$ is even and has $11$ divisors. Find these five numbers
What is the minimal number of masses required in order to measure any weight between 1 and $n$ grams. Note that a mass can be put on either sides of the balance.
Let $k$ be a positive integer, show that $(4k+3)$ cannot be a square number.
How many numbers in this series are squares? $$1, 14, 144, 1444, 14444, \cdots$$
Find all positive integer $n$ such that $n$ is a square and its last four digits are the same.
Solve the following equation in positive integers: $15x - 35y + 3 = z^2$
Find a four-digit square number whose first two digits are the same and the last two digits are the same too.
Solve the following equation in positive integers: $3\times (5x + 1)=y^2$
Find all pairs of integers $(x, y)$ such that $5\times (x^2 + 3)= y^2$.
If we arrange all the square numbers ascendingly as a queue: $1491625364964\cdots$ What is the $612^{th}$ digit?
In how many zeros does the number $\frac{2002!}{(1001!)^2}$ end?
Let $A$ and $B$ be two positive integers and $A=B^2$. If $A$ satisfies the following conditions, find the value of $B$:
- $A$'s thousands digit is $4$
- $A$'s tens digit is $9$
- The sum of all $A$'s digits is $19$
Is it possible to find four positive integers such that $2002$ plus the product of any two of them is always a square? If yes, find such four positive integers. If no, explain.
If the middle term of three consecutive integers is a perfect square, then the product of these three numbers is called a $\textit{beautiful}$ number. What is the greatest common divisor of all the $\textit{beautiful}$ numbers?
Find the smallest square whose last three digits are the same but not equal $0$.
Let $\overline{ABCA}$ be a four-digit number. If $\overline{AB}$ is a prime, $\overline{BC}$ is a square, and $\overline{CA}$ is the product of a prime and a greater-than-one square. Find all such $\overline{ABCA}$.
Let $A$ be a two-digit number, multiplying $A$ by 6 yields a three-digit number $B$. The difference of the two five-digit numbers obtained by appending $A$ to the left and right of $B$, respectively, is a perfect square. Find the sum of all such possible $A$s.
Find such a positive integer $n$ such that both $(n-100)$ and $(n-63)$ are square numbers.
Find such a positive integer $n$ such that both $(n+23)$ and $(n-30)$ are square numbers.
Find the smallest positive integer $n$ such that $\frac{12!}{n}$ is a square.
Consider the following $32$ numbers: $1!, 2!, 3!, \cdots, 32!$. If one of them is removed, then the product of the remaining $31$ numbers is a perfect squre. What is that removed number?
There exist $5$ consecutive positive integers such that their sum is a square, and the sum of the middle three is a cube. What is the smallest one of these five numbers?
Let integers $a$, $b$ and $c$ satisfy $a + b + c = 0$, show that $\vert{a^3 + b^3 + c^3}\vert$ cannot be a prime number.
Let $n$ be a positive integer, show that $11^{n+2} + 12^{2n+1}$ is a multiple of 133.
How many positive divisors does $20$ have?