Solve each equation. See Example 7. (3x+7)^1/3-(4x+2)^1/3=0

Cube roots are the values that, when multiplied by themselves three times, yield the original number. In the equation given, the terms (3x + 7)^(1/3) and (4x + 2)^(1/3) represent cube roots, which can be simplified by isolating the cube root expressions to facilitate solving the equation.

Isolating variables is a fundamental algebraic technique used to solve equations. In this context, it involves rearranging the equation to get one cube root expression on one side and the other on the opposite side, allowing for easier manipulation and eventual solution of the variable x.

Cubing both sides of an equation is a method used to eliminate cube roots. By raising both sides of the equation to the power of three, the cube roots are removed, transforming the equation into a polynomial form that can be solved for x. This step is crucial in solving the given equation.