Problems
Two fractions sum up to \(1\), but their difference is \(\frac1{10}\). What are they?
On her birthday, my grandma was asked how old she was. She said: "Start with the year I was born. Add the current year to it. Then, from the sum subtract the year I celebrated by \(20\)th birthday. From that, take away the year I was \(30\). The result will be \(16\)." How old is my grandma?
In the long addition above, each letter corresponds to a different digit. What is the sum \(D + O +G + C +A +T\)?
Let \(ABCDE\) be a regular pentagon. The point \(G\) is the midpoint of \(CD\), the point \(F\) is the midpoint of \(AE\). The lines \(EG\) and \(BF\) intersect at the point \(H\). Find the angle \(EHF\).
Show that \(\text{Nim}(x_1,\dots,x_k)\) is an losing position if and only if \(x_1 \oplus \dots \oplus x_k = 0\). \(x \oplus y\) denotes the nim-sum of \(x\) and \(y\).
I have three positive integers. When you add them together, you get \(15\). When you multiply the three numbers together, you get \(120\).
What are the three numbers?
If a magician puts \(1\) dove into his hat, he pulls out \(2\) rabbits and \(2\) flowers from it. If the magician puts \(1\) rabbit in, he pulls out \(2\) flowers and \(2\) doves. If he puts \(1\) flower in, he pulls out \(1\) rabbit and \(3\) doves. The magician starts with \(1\) rabbit. Could he end up with the same number of rabbits, doves, and flowers after performing his hat trick several times?
In the other room there are two doors. The statements on them say:
There is treasure behind at least one of the doors.
There is treasure behind the first door.
Your guide says: The first sign is true if there is treasure behind the first door, otherwise it is false. The second sign is false if there is treasure behind the second door, otherwise it is true. What would you do?
For any real number \(x\), the absolute value of \(x\), written \(\left| x \right|\), is define to be \(x\) if \(x>0\) and \(-x\) if \(x \leq 0\). What is \(\left| 3 \right|\), \(\left| -4.3 \right|\) and \(\left| 0 \right|\)?
Prove that for any real number \(x\), \(x \leq \left| x \right|\) and \(0 \leq \left| x \right|\). Then prove that for any real numbers \(x,y\), the triangle inequality holds: \(\left| x+y \right| \leq \left| x \right|+\left| y \right|\).
Is there a divisibility rule for \(2^n\), where \(n = 1\), \(2\), \(3\), . . .? If so, then explain why the rule works.