Problems

The diagram shows a triangle drawn on a square grid. The area of the shaded triangle is \(9~\text{cm}^2\). What is the area of one of the little squares of the grid?

The first \(2026\) prime numbers are multiplied. How many zeroes are at the end of this resulting number?

Three skiers—Alice, Bob, and Cynthia—compete in a downhill race. They begin skiing in the following order: first Cynthia, then Bob, and finally Alice.

Each skier starts with \(0\) points. Whenever one skier overtakes another during the race, the overtaking skier gains \(1\) point and the skier being overtaken loses \(1\) point.

At the end of the race, Alice crosses the finish line first, and Bob finishes with \(0\) points.

In what position does Cynthia finish?

On the Problemland Space Station, there are \(1000\) tonnes of air, of which \(99\%\) is oxygen. After an unfortunate asteroid impact, some of the air is vented into space. The hull is quickly repaired, and no further loss occurs.

Afterward, measurements reveal that oxygen now makes up only \(98\%\) of the remaining air, and that only oxygen was lost during the incident.

How many tonnes of oxygen remain on the space station?

In the following puzzle, different animals represent different digits, and your goal is to find which digit each animal represents.

Find all possible solutions.

What is the smallest positive whole number whose digits add up to \(2026\)?

The thirteen dwarves sat down around a bonfire in a circle, and their leader Thorin proposed a challenge to pass the time:

Each dwarf would choose an integer (it is not necessary that each dwarf chooses a different number) so that for every group of three neighboring dwarves, the sum of their numbers must be exactly \(13\).

Does Thorin’s challenge have a solution?

In the month of January of a certain year, there are exactly \(4\) Mondays and \(4\) Fridays. What day of the week is the \(20^{\text{th}}\) day of this month?

We would like to place the numbers \(1\) to \(10\) into the circles in the picture below, using each number exactly once, so that for every straight line of three circles, the numbers in those circles add up to the same total. Is this possible?

We have a \(17\) digit number, and we form a new number by reading the original number from right to left (if this produces a leading zero, we simply ignore this leading zero, giving a \(16\) digit number). We add this new number to the original number. Show that this resulting sum will have at least one even digit.