fifty-one numbers are chosen from 1-100 prove that at least 2 of them are consecutive

pigeonhole 2. Show that if 7 numbers was chosen from 1 to 12, any 2 of...

pigeonhole 2. Show that if 7 numbers was chosen from 1 to 12, any 2 of it will add to 13. 3. How many friend you should have to ensure that at least 5 of them have the same birth month? 4. 6 persons collect their money and the amount is RM 21.61. Show that at least one of them must have RM 3.61.

At least how many numbers must be randomly chosen from 1, 2, 3, ..., 20 such...

At least how many numbers must be randomly chosen from 1, 2, 3, ..., 20 such that there must exist two numbers which are not relative prime (i.e. has a common factor larger than 1)? Explain why the answer is 10.

Prove deductively that for any three consecutive odd integers, one of them is divisible by 3

Prove deductively that for any three consecutive odd integers, one of them is divisible by 3

1. Abigail, Beth and Charlotte picked 31 oranges combined. Prove that at least one of them...

1. Abigail, Beth and Charlotte picked 31 oranges combined. Prove that at least one of them picked at least 11 oranges. Also prove that at least one of them picked at most 10 oranges.

6. (a) Prove by contrapositive: If the product of two natural numbers is greater than 100,...

6. (a) Prove by contrapositive: If the product of two natural numbers is greater than 100, then at least one of the numbers is greater than 10. (b) Prove or disprove: If the product of two rational numbers is greater than 100, then at least one of the numbers is greater than 10.

Prove that if there are n≥2 people at a party, then at least 2 of them...

Prove that if there are n≥2 people at a party, then at least 2 of them have the same number of friends at the party. (Hint: The Pigeonhole Principle states that if n items are placed inmcontainers, wheren>m, at least one container must contain more than one item. You may use this without proof.)

Pigeonhole 1. If 13 people in one room, show that at least 2 people born in...

Pigeonhole 1. If 13 people in one room, show that at least 2 people born in the same month. 2. Show that if 7 numbers was chosen from 1 to 12, any 2 of it will add to 13. 3. How many friend you should have to ensure that at least 5 of them have the same birth month? 4. 6 persons collect their money and the amount is RM 21.61. Show that at least one of them must have...

k numbers are chosen at random from the set {1,2,...,N}, one after the other, without replacement....

k numbers are chosen at random from the set {1,2,...,N}, one after the other, without replacement. Find the probabilities of each of these events: 1. The set of numbers drawn is {1,2,...,k}. (Note that they need not be drawn in that exact order since we only care about the set.) 2. The numbers are chosen in an ascending order. 3. How do your answers to parts 1 and 2 change if the numbers are drawn one after the other, but...

one of your curious students noted the following interesting relationship; when she added 2 consecutive odd...

one of your curious students noted the following interesting relationship; when she added 2 consecutive odd integers, teh sum was divisible by 2. when she added 3 consecutive odd integers the sum was divisible by 3. she made the conjecture that the sum of n consecutive odd numbers is divisible by n. is she correct? how would you help her prove or disprove her conjecture

How could I mathematically prove these statements? 1.If the difference of two numbers is even then...

How could I mathematically prove these statements? 1.If the difference of two numbers is even then so is their sum. 2. If a sum of several numbers is odd, then at least one of the numbers is itself odd. 3. If a square number is even then so is its square root.