Going To New York Riddle
A old man was going to New York. Along the way he met a man with seven wives. Each wife had seven children. Each child had seven cats. Each cat had seven kittens. Kittens, cats, children, wives. How many people are going to New York?
Hint:
New York Plane Crash Riddle
If a plane carrying passengers from New Jersey crashes in New York, where do you bury the survivors?
Hint:
Losing A New York Bet
You are hanging around in NYC when a person approaches you.
"Leaving the bald people aside, I can bet a hundred bucks that there are two people living in NYC who have same number of hairs on their heads," he says to you.
You say that you will take the bet. After talking to the man for a couple of minutes, you realize that you have lost the bet.
What did the person say to you that proved his statement ?
"Leaving the bald people aside, I can bet a hundred bucks that there are two people living in NYC who have same number of hairs on their heads," he says to you.
You say that you will take the bet. After talking to the man for a couple of minutes, you realize that you have lost the bet.
What did the person say to you that proved his statement ?
Hint:
This problem can be best solved using the pigeonhole principle.
The argument will go like this:
Assume that all the non-bald people in NYC have different number of hairs on their head. The population is about 9 million and let us assume that there are 8 million among them who are not bald.
Now, those 8 million people need to have different number of hairs. On an average, people have just 100, 000 hairs on their head. If we keep on assuming that there is someone with just one hair, someone with two, someone with three and so on, there will be 7, 900, 00 other people left who will have more than 100, 000 hairs on their head and need different number of hairs.
Now, as per this assumption, if we keep increasing one hair for each person, to make everybody hair different in numbers, we will come across someone with 8, 000, 000 hairs. But that is practically impossible (even 1, 000, 000 is impossible). Thus there must be two people who are having same number of hairs. Did you answer this riddle correctly?
YES NO
The argument will go like this:
Assume that all the non-bald people in NYC have different number of hairs on their head. The population is about 9 million and let us assume that there are 8 million among them who are not bald.
Now, those 8 million people need to have different number of hairs. On an average, people have just 100, 000 hairs on their head. If we keep on assuming that there is someone with just one hair, someone with two, someone with three and so on, there will be 7, 900, 00 other people left who will have more than 100, 000 hairs on their head and need different number of hairs.
Now, as per this assumption, if we keep increasing one hair for each person, to make everybody hair different in numbers, we will come across someone with 8, 000, 000 hairs. But that is practically impossible (even 1, 000, 000 is impossible). Thus there must be two people who are having same number of hairs. Did you answer this riddle correctly?
YES NO
New York Multiplication Riddle
Hint:
Dracula In New York Riddle
Hint:
Cows Visit New York Riddle
Hint:
Creating Lawyers Riddle
Hint:
School Sluffing Ant Riddle
Hint:
Known For Spicy Food Riddle
I have a flag of red, white and green. My national bird is the golden eagle. And I am known for my spicy food, and rhythmic music. What country am I?
Hint:
Goodbye Tree Riddle
Hint:
Schooling Rudolph Riddle
Hint:
The Belle Of New York
My first wears my second;
My third might be what my first would acquire if he went to sea.
Put together my one, two, three,
And the belle of New York is the girl for me.
What one word am I?
My third might be what my first would acquire if he went to sea.
Put together my one, two, three,
And the belle of New York is the girl for me.
What one word am I?
Hint:
Home-schooled Elves Riddle
Hint:
Gobbling Desserts
Hint:
Gobble Gobble Dance
Hint:
Add Your Riddle Here
Have some tricky riddles of your own? Leave them below for our users to try and solve.