335 to the Power of 3 = 335 ³ = 37595375

Welcome to our exponent calculator! We're exploring the concept of "335 to the power of 3". Let's break down what this means and how to calculate it.

What are Exponents?

An exponent is a mathematical operation where we multiply a number (called the base) by itself a certain number of times (indicated by the power or exponent). In our case, 335 is the base, and 3 is the exponent.

Calculation

To calculate 335 to the power of 3, we multiply 335 by itself 3 times. Here's the step-by-step process:

Step	Calculation	Result
1	335	335
2	335 × 335	112225
3	335 × 335 × 335	37595375

Solution: 335 to the power of 3 is equal to 37595375.

How to write 335 to the power of 3 ?

Step 1: Understand the Concept

"335 to the power of 3" means we're multiplying 335 by itself 3 times. Let's break this down:

335 to the power of 3 = 335 × 335 × 335

Step 2: Learn the Notation

In mathematics, we have a special way to write this more concisely. We use superscript notation:

335³

Here, 335 is called the "base", and 3 is called the "exponent" or "power".

Step 3: Understand Alternative Notations

Sometimes, especially when typing or in programming, you might see it written as:

335³

This means the same thing as 335³.

Step 4: Calculate the Result

If we actually compute this:

335³ = 335 × 335 × 335 = 37595375

Note: Remember, the exponent (3 in this case) tells us how many times to multiply the base (335) by itself.

Practice

Try writing these on your own:

334 to the power of 2
336 to the power of 4
3 to the power of 335

Interactive Power Calculator

Similar Calculations:

Number	Power	Answer
336	3	336³ = 37933056
337	3	337³ = 38272753
338	3	338³ = 38614472

Related Mathematical Operations

Square Root

The square root is the inverse operation of squaring a number. For our example:

v38614472 ≈ 6,214.0544

This is approximate because 335^3 isn't a perfect square.

Logarithm

Logarithms are the inverse of exponential functions. The logarithm of 38614472 with base 335 should equal 3:

log₃₃₅(38614472) = 3

Exponent Properties

1. Multiplying exponents with the same base: 335^a * 335^b = 335^(a+b)

Example: 335² * 335³ = 335⁵ = 4219140959375

2. Dividing exponents with the same base: 335^a / 335^b = 335^(a-b)

Example: 335⁵ / 335² = 335³ = 37595375

335 to the Power of 3 = 335 3 = 37595375