%5E3-without-exponents.jpeg "(2x^2)^3 Without Exponents")
Expanding (2x^2)^3 without Exponents
The expression (2x^2)^3 represents the product of (2x^2) multiplied by itself three times. Let's break down how to expand this without using exponents.
Understanding the Exponent
The exponent "3" in (2x^2)^3 indicates that we are multiplying the base, (2x^2), by itself three times. This can be written as:
(2x^2)^3 = (2x^2) * (2x^2) * (2x^2)
Expanding the Multiplication
Now, let's multiply each term individually:
- Multiply the coefficients: 2 * 2 * 2 = 8
- Multiply the variables: x^2 * x^2 * x^2 = x^(2+2+2) = x^6
Final Result
By combining the results from step 1 and step 2, we get:
(2x^2)^3 = 8x^6
Therefore, the expanded form of (2x^2)^3 without exponents is 8x^6.