Why Is Zero Factorial 1

Why is the zero factorial one i.e ($0!=1$)? 14. Why $0!$ is equal to $1$? 3. Factorial of 0 - a ... $\begingroup$ decrementing n down to 1-- which doesn't make sense for n = 0, so we seek another uniform property of factorial in order to extend the definition. Similarly, why

$$ 0! = \Gamma(1) = \int_0^{\infty} e^{-x} dx = 1 $$ If you are starting from the "usual" definition of the factorial, in my opinion it is best to take the From the permutation formula, we could deduce that the number of permutations for n objects into n places would equal n!/0!. On the other hand, we could interpret, from

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Why is the zero factorial one i.e ($0!=1$)? 14. Why $0!$ is equal to $1$? 3. Factorial of 0 - a ...

$\begingroup$ decrementing n down to 1-- which doesn't make sense for n = 0, so we

$$ 0! = \Gamma(1) = \int_0^{\infty} e^{-x} dx = 1 $$ If you are

From the permutation formula, we could deduce that the number of permutations for

Consider (the formula for factorials): n! = prod_(k=0)^n k If n=0, then

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