**2 to the 73rd power**, our post about the mathematical operation

*exponentiation of 2 to the power of 73*.

If you have been looking for 2 to the seventy-third power, or if you have been wondering about 2 exponent 73, then you also have come to the right place.

The number 2 is called the base, and the number 73 is called the exponent. In this post we are going to answer the question

*what is 2 to the 73rd power*.

Keep reading to learn everything about two to the seventy-third power.

## What is 2 to the 73rd Power?

2 to the 73rd power is conventionally written as 2^{73}, with superscript for the exponent, but the notation using the caret symbol ^ can also be seen frequently: 2^73.

2^{73} stands for the mathematical operation *exponentiation of two by the power of seventy-three*.

As the exponent is a positive integer, exponentiation means a repeated multiplication:

The exponent of the number 2, 73, also called index or power, denotes how many times to multiply the base (2).

Thus, we can answer what is 2 to the 73rd power as

**2 to the power of 73 = 2**.

^{73}= 94 4473296573 9290427392If you have come here in search of an exponentiation different to 2 to the seventy-third power, or if you like to experiment with bases and indices, then use our calculator below.

To stick with 2 to the power of 73 as an example, insert 2 for the base and enter 73 as the index, also known as exponent or power.

2 to the 73rd power is an exponentiation which belongs to the category powers of 2.

Similar exponentiations on our site in this category include, but are not limited, to:

Ahead is more info related to 2 to the 73 power, along with instructions how to use the search form, located in the sidebar or at the bottom, to obtain a number like 2^73.

## 2 to the Power of 73

Reading all of the above, you already know most about 2 to the power of 73, except for its inverse which is discussed a bit further below in this section.

Using the aforementioned search form you can look up many numbers, including, for instance, 2 to the power 73, and you will be taken to a result page with relevant posts.

Now, we would like to show you what the inverse operation of 2 to the 73rd power, (2^{73})^{−1}, is. The inverse is the 73rd root of 2^{73}, and the math goes as follows:

^{73})

^{−1}

Because the index of 73 is not a multiple of 2, which means odd, in contrast to even numbers, the operation produces only one value: (2

^{73})

^{−1}

Make sure to understand that exponentiation is not commutative, which means that 2

^{73}≠ 73

^{2}, and also note that (2

^{73})

^{-1}≠ 2

^{-73}, the inverse and reciprocal of 2

^{73}, respectively.

You already know what 2 to the power of 73 equals, but you may also be interested in learning what 2 to the negative 73rd power stands for.

Next is the summary of our content.

## Two to the Seventy-third Power

You have reached the concluding section of two to the seventy-third power = 2^{73}. Two to the seventy-third power is, for example, the same as 2 to the power 73 or 2 to the 73 power.

Exponentiations like 2^{73} make it easier to write multiplications and to conduct math operations as numbers get either big or small, such as in case of decimal fractions with lots of trailing zeroes.

If you have been looking for 2 power 73, *what is 2 to the 73 power*, 2 exponent 73 or 73 power of 2, then it’s safe to assume that you have found your answer as well.

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## Conclusion

In summary,

If you like to learn more about exponentiation, the mathematical operation conducted in 2^{73}, then check out the articles which you can locate in the header menu of our site.

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