Simplify (3a 2) 3.
To simplify (3a^2)^3, we need to apply the exponent 3 to each term inside the parentheses.
So, (3a^2)^3 = 3^3 * (a^2)^3
3^3 = 27 and (a^2)^3 = a^(2 * 3) = a^6
Therefore, (3a^2)^3 simplifies to 27a^6.
To simplify (3a^2)^3, you need to raise both the coefficient and the exponent to the power of 3.
First, let's simplify the coefficient: 3^3 = 27.
Next, let's simplify the exponent: (a^2)^3 = a^(2*3) = a^6.
Putting it all together, (3a^2)^3 simplifies to 27a^6.
To simplify the expression (3a^2)^3, we need to apply the power rule, which states that raising a power to a power means multiplying the exponents.
Step 1: Apply the power rule to the exponent outside the parentheses:
(3a^2)^3 = 3^3 * (a^2)^3
Step 2: Simplify the exponent inside the parentheses:
(3a^2)^3 = 27 * a^(2*3)
Step 3: Multiply the numbers and simplify the exponent:
(3a^2)^3 = 27 * a^6
So, the simplified expression of (3a^2)^3 is 27a^6.