Why Does Zero Factorial Equal One? (2024)

A zero factorial is a mathematical expression for the number of ways to arrange a data set with no values in it. The answer is one.

In general, the factorialof a number is a shorthand way to write a multiplication expression wherein the number is multiplied by each number less than it but greater than zero. For example, 4! = 24 is the same as writing 4 x 3 x 2 x 1 = 24, but one uses an exclamation mark to the right of the factorial number (four) to express the same equation.

It is pretty clear from these examples how to calculate the factorial of any whole number greater than or equal to one, but why is the value of zero factorial one despite the mathematical rule that anything multiplied by zero is equal to zero?

This typically confuses people the first time that they see this equation, but we will see in the below examples why this makes sense when you look at the definition, permutations of, and formulas for the zero factorial.

The Definition of a Zero Factorial

The first reason why zero factorial is equal to one is that the definition of the factorial states that 0! = 1. A definition is a mathematically correct explanation (even if a somewhat unsatisfying one). Still, one must remember that a factorial is the product of all integers equal to or less than the original number—in other words, a factorial is the number of combinations possible with numbers less than or equal to that number.

Read MoreDemystifying Factorials in Math and StatsBy Courtney Taylor

Because zero has no numbers less than it but is still in and of itself a number, there is but one possible combination of how that data set can be arranged: It cannot. This still counts as a way of arranging it, so by definition, a zero factorial is equal to one, just as 1! is equal to one because there is only a single possible arrangement of this data set.

For a better understanding of how this makes sense mathematically, it's important to note that factorials like these are used to determine possible orders of information in a sequence, also known as permutations, which can be useful in understanding that even though there are no values in an empty or zero set, there is still one way that set is arranged.

Permutations and Factorials

A permutation is a specific, unique order of elements in a set. For example, there are six permutations of the set {1, 2, 3}, which contains three elements, since we may write these elements in the following six ways:

1, 2, 3
1, 3, 2
2, 3, 1
2, 1, 3
3, 2, 1
3, 1, 2

We could also state this fact through the equation 3! = 6, which is a factorial representation of the full set of permutations. Similarly, there are 4! = 24 permutations of a set with four elements and 5! = 120 permutations of a set with five elements. So an alternate way to think about the factorial is to let n be a natural number and say that n! is the number of permutations for a set with n elements.

With this way of thinking about the factorial, let’s look at a couple more examples. A set with two elements has two permutations: {a, b} can be arranged as a, b or b, a. This corresponds to 2! = 2. A set with one element has a single permutation, as the element 1 in the set {1} can only be ordered in one way.

This brings us to zero factorial. The set with zero elements is called the empty set. To find the value of zero factorial, we ask, “How many ways can we order a set with no elements?” Here we need to stretch our thinking a little bit. Even though there is nothing to put in an order, there is one way to do this. Thus we have 0! = 1.

Formulas and Other Validations

Another reason for the definition of 0! = 1 has to do with the formulas that we use for permutations and combinations. This does not explain why zero factorial is one, but it does show why setting 0! = 1 is a good idea.

A combination is a grouping of elements of a set without regard for order. For example, consider the set {1, 2, 3}, wherein there is one combination consisting of all three elements. No matter how we arrange these elements, we end up with the same combination.

We use the formula for combinations, n!/[r! x (n-r)!], with the combination of three elements, n, taken three at a time, r, and see that: 1 = C (3, 3) = 3!/(3! 0!). If we treat 0! as an unknown quantity and solve algebraically, we see that 3! x 0! = 3! and so 0! = 1.

There are other reasons why the definition of 0! = 1 is correct, but the reasons above are the most straightforward. The overall idea in mathematics is that when new ideas and definitions are constructed, they remain consistent with other mathematics, and this is exactly what we see in the definition of zero factorial is equal to one.

Key Takeaways

A factorial is the product of all integers less than or equal to the original number.
As such, zero factorial equals one because it represents the one possible arrangement of an empty set: none at all.
Factorials are used to determine permutations, which represent unique orders of elements in a set.

FAQs

Why Does Zero Factorial Equal One? ›

Factorial of a number in mathematics is the product of all the positive numbers less than or equal to a number. But there are no positive values less than zero so the data set cannot be arranged which counts as the possible combination of how data can be arranged (it cannot). Thus, 0! = 1.

Why does zero factorial equal 1? ›

A factorial is the product of all integers less than or equal to the original number. As such, zero factorial equals one because it represents the one possible arrangement of an empty set: none at all. Factorials are used to determine permutations, which represent unique orders of elements in a set.

Why is it necessary for 0 to equal 1? ›

Our formulas in combinatorics NEED 0! to be 1 so that the number of ways you can combine n things r at a time makes sense.

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Can you show that 0 != 1 though it has no meaning from the definition? ›

Explanation 1: We define n! as the product of all integers k with 1≤k≤n. When n=0 this product is empty so it should be 1. Explanation 2: If n is a nonnegative integer, we define n! to be the number of orderings on a set with n distinct objects. If n=0, this set is empty.

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What is the answer to the factorial of 0? ›

The answer of 0 factorial is 1. There are no calculations, nothing! All you have to do is write down 1 wherever and whenever you see 0!

Why does anything to the 0 equal 1? ›

So, the reason that any number to the zero power is one ibecause any number to the zero power is just the product of no numbers at all, which is the multiplicative identity, 1.

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Why is 0 factorial 1 quora? ›

Zero factorial, 0!, is the the product of no numbers. It's the empty product. But what is the empty product? Whatever it is, if you multiply it by 1, you'll get 1.

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Why is zero so important in math? ›

Zero is an important number, even though it represents a quantity of nothing! To summarize: Zero is a number between negative numbers and positive numbers. It is necessary as a placeholder in whole numbers and decimal numbers. It represents a place with no amount or null value.

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Why do we equate equations to zero? ›

To verify if a quadratic equation has equal roots, we prove the discrimant to be equal to zero.

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What is the mathematical proof of zero? ›

By definition, zero is that number which when added to any number gives us the same number. This is why mathematicians call the concept of zero the "Additive Identity". Now, to prove that the 0 we commonly use, that is, the "one less than 1" number, is indeed that zero, we simply add our 0 to any number,.

Why is NC0 equal to 1? ›

It answers the question "You have a set of n elements. In how many ways can you choose exactly zero elements from it?". The answer is quite clearly 1, because there is only one empty set that you can make.

Is 1 divided by 0 infinity or undefined? ›

We can say that the division by the number 0 is undefined among the set of real numbers. $\therefore$ The result of 1 divided by 0 is undefined. Note: We must remember that the value of 1 divided by 0 is infinity only in the case of limits. The word infinity signifies the length of the number.

Why is zero factorial equal to one? ›

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Why do factorials end in 0? ›

Think of all the numbers like 10, 20, 30, etc. that you multiplied in to the factorial of 1000 to arrive at the answer. Each one of the adds a 0 (two zeroes for 100, 200, etc.), since any number multiplied by 10 will end in a 0. They're also composed of a lot of numbers that are multiples of 2 or 5.

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What is big 0 of factorial? ›

Factorial Time Complexity - O(n!)

Factorial time is when the runtime scales factorially as the input grows. O(n!) is the notation for factorial time. It's pronounced "O of n factorial" or "big O of n factorial".

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Why does 0 0 not equal 1? ›

The short answer is that 0 has no multiplicative inverse, and any attempt to define a real number as the multiplicative inverse of 0 would result in the contradiction 0 = 1. Some people find these points to be confusing.

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Is any number raised to zero equal to 1 agree or disagree? ›

A number to the power of 0 is equal to 1 because of the division rule of exponents. a^n/a^n=1 because any value divided by itself is 1. It is also true that a^n/a^n=a^(n-n)=a^0, by the division rule of exponents. Therefore, a^0=1, by the transitive property of equality.

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