The Answer is Only twenty-three people need be in the room, a surprisingly small number. The probability that there will not be two matching birthdays is then, ignoring leap years, 365x364x363x...x343/365 over 23 which is approximately 0.493. this is less than half, and therefore the probability that a pair occurs is greater than 50-50. With as few as fourteen people in the room the chances are better than 50-50 that a pair will have birthdays on the same day or on consecutive days.
Explaination:- Only twenty-three people need be in the room, a surprisingly small number. The probability that there will not be two matching birthdays is then, ignoring leap years, 365x364x363x...x343/365 over 23 which is approximately 0.493. this is less than half, and therefore the probability that a pair occurs is greater than 50-50. With as few as fourteen people in the room the chances are better than 50-50 that a pair will have birthdays on the same day or on consecutive days.
Please keep visiting our website to other existing sections related to fun, riddles, jokes, quotes and top information.
Please visit us a great collection of 3500+ riddles with answer .
We encourage you to subscribe us to receive our Daily/Weekly riddles newsletter. How many people must be gathered together in a room, before you can be certain that there is a greater than 50/50 chance that at least two of them have the same birthday? is one of the best riddle of the day.We have best collections of riddles, You can see our best collection of Tricky Riddles with Answer
Funtimejokes be the be the world's most knowledge able riddle website on the internet for riddles, puzzles, rebus caps and quizzes. Our riddle library has interesting riddles and answers to riddles for adults and evoke deep thought and community discussion. Riddlers will benefit from the creativity of our members who participate in growth of our online riddles and puzzles resource. We encourage you to become a member of Riddles and receive daily/weekly free riddles email.
