%5E2-without-exponents.jpeg "(3x^3)^2 Without Exponents")
Expanding (3x^3)^2 without Exponents
The expression (3x^3)^2 represents the square of the entire term (3x^3). To expand this without exponents, we'll use the properties of exponents and multiplication:
Understanding the Exponent
The exponent "2" signifies that we are multiplying the base (3x^3) by itself twice:
(3x^3)^2 = (3x^3) * (3x^3)
Expanding the Multiplication
Now we need to multiply each part of the first term with each part of the second term:
(3x^3) * (3x^3) = (3 * 3) * (x^3 * x^3)
Applying Exponent Rules
When multiplying terms with the same base, we add the exponents:
(3 * 3) * (x^3 * x^3) = 9 * x^(3+3)
Final Result
This simplifies to:
9 * x^(3+3) = 9x^6
Therefore, (3x^3)^2 expanded without exponents is 9x^6.