(3n)^3 Without Exponents

less than a minute read Jun 16, 2024
(3n)^3 Without Exponents

Expanding (3n)^3 Without Exponents

The expression (3n)^3 represents the product of (3n) multiplied by itself three times. To expand this without using exponents, we can simply write it out:

(3n)^3 = (3n) * (3n) * (3n)

Now, we can apply the distributive property of multiplication:

(3n) * (3n) * (3n) = (3 * 3 * 3) * (n * n * n)

Finally, we can simplify the multiplication:

**(3 * 3 * 3) * (n * n * n) = ** 27n^3

Therefore, (3n)^3 expanded without exponents is 27n^3.

In Summary:

  • (3n)^3 = (3n) * (3n) * (3n)
  • (3n) * (3n) * (3n) = (3 * 3 * 3) * (n * n * n)
  • (3 * 3 * 3) * (n * n * n) = 27n^3

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