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Maths Olympiad - exercise your grey matter!
I doubt many murcers qualify to enter the competition, but the questions are fun to think about.
Here are the problems:
1. The difference of two numbers is equal to 0.01. Can the difference of their squares be greater than 1000?
2. A box of fresh mushrooms weighs 10 kg. At first, water made up 99% of the weight of mushrooms. After a while, the mushrooms have dried up so that now water makes up only 98% of their weight. How much does the box of mushrooms weigh now?
3. Is it possible to come up with four integers such that both their product and their sum are odd?
4. Each of the following equalities is missing numerators (which are positive integers): ?/7-?/5=1/35, ?/5-?/7=1/35. Find as many possible pairs of numerators as you can. Note that irregular fractions (i.e. fractions whose numerator is larger than the denominator) are allowed. For example, 2 and 4 are NOT a solution for the first equality: 2/7-4/5=10/35-28/35=-18/35.
5. Is it possible to wrap a unit cube into a square piece of paper with side of length 3? (You may not cut the piece of paper.)
6. There are two villages on the same side of the river. How should a road be built from one village to the other if it has to be of the smallest possible length and must touch the river?
7. Given an angle and a point P inside of it draw a straight line through this point in such a way that the segment of this line inside the angle has the point P as its midpoint.
8. Among the lines passing through the point A choose the one for which the sum of the distances to the points B and C is the maximum possible.
9. Consider a unit square in the plane. Find all the points such that the sum of the shortest distances from that point to the sides of the square or their extensions is 3.
10. You have 16 coins. You know that each of them has a different weight. Find the lightest and the heaviest coins by taking at most 22 measurements using a scale (balance) with two cups without using any extra weights.
Now lets see how long it take Gurm to either answer them all, or explain why they are fundamentally flawed
Here are the problems:
1. The difference of two numbers is equal to 0.01. Can the difference of their squares be greater than 1000?
2. A box of fresh mushrooms weighs 10 kg. At first, water made up 99% of the weight of mushrooms. After a while, the mushrooms have dried up so that now water makes up only 98% of their weight. How much does the box of mushrooms weigh now?
3. Is it possible to come up with four integers such that both their product and their sum are odd?
4. Each of the following equalities is missing numerators (which are positive integers): ?/7-?/5=1/35, ?/5-?/7=1/35. Find as many possible pairs of numerators as you can. Note that irregular fractions (i.e. fractions whose numerator is larger than the denominator) are allowed. For example, 2 and 4 are NOT a solution for the first equality: 2/7-4/5=10/35-28/35=-18/35.
5. Is it possible to wrap a unit cube into a square piece of paper with side of length 3? (You may not cut the piece of paper.)
6. There are two villages on the same side of the river. How should a road be built from one village to the other if it has to be of the smallest possible length and must touch the river?
7. Given an angle and a point P inside of it draw a straight line through this point in such a way that the segment of this line inside the angle has the point P as its midpoint.
8. Among the lines passing through the point A choose the one for which the sum of the distances to the points B and C is the maximum possible.
9. Consider a unit square in the plane. Find all the points such that the sum of the shortest distances from that point to the sides of the square or their extensions is 3.
10. You have 16 coins. You know that each of them has a different weight. Find the lightest and the heaviest coins by taking at most 22 measurements using a scale (balance) with two cups without using any extra weights.
Now lets see how long it take Gurm to either answer them all, or explain why they are fundamentally flawed
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