Answer:
6x^(3/2)
Explanation:
To simplify the expression (2√x) × (3³√x), we can first use the properties of exponents to rewrite the cube root as a fractional exponent:
3³√x = x^(1/3)^3 = x^(1)
Using this, we can rewrite the expression as:
(2√x) × (3³√x) = 2x^(1/2) × 3x^(1)
To multiply these two terms, we can add the exponents since the bases are the same:
2x^(1/2) × 3x^(1) = 6x^(1/2 + 1) = 6x^(3/2)
Therefore, the simplified expression is 6x^(3/2).