Question

” In a room full of 50 people, what is the probability that at least two people have the same birthday? Assume that all birthdays are equally likely (uniform distribution) and there are 365 days in the year.​

Answer 1

Answer:

Ur Answer

To trust someone,

Love someone

nd least

A good daughter or son no need to love anyone

that's world rule nd public rule nd also my family rule which I already break

Answer 2

Answer:

The answer is 0.970.

Explanation:

The probability exists simply how likely something exists to happen. Whenever we're uncertain about the outcome of an event, we can talk about the possibilities of certain outcomes—how likely they exist. The analysis of events controlled by probability is named statistics.

Given: Number of individuals = 50

To Find the Probability that at least two individuals have their birthday on the same day.

The probability that at least two people maintain their birthday on the same day = 1 - (Probability that all are born on various days).

So, the required probability is,

$&=1-\frac{365 * 364 * 363 \ldots \ldots * 316}{365 * 365+365 \ldots \ldots * 365}$

$&=\frac{365 !}{315 ! * 365^{50}}$

=0.970

Hence, the answer is 0.970.

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