Consider the following. Translate into a variable expression, (Use x for your variable. Do not simpllify.) \begin{tabular}{|l|}\hline\( x(4+x) \) \\ Simplify. \\ Suggested tutorials: \\ Leam it Translate verbal to variable expressions. \end{tabular}

This expression starts with \( x \) multiplied by the sum of 4 and \( x \). It represents a scenario where you might have \( x \) items, and for each item, there's an additional 4 items added to it. For example, if \( x \) were the number of boxes, each containing \( 4 + x \) toys, then \( x(4+x) \) tells us how many toys we would have in total if we multiplied the number of boxes by the total toys per box. In terms of real-world application, this could model scenarios in business or budgeting. Imagine you're managing a project where each team member (represented by \( x \)) can handle a specific number of tasks (like the \( 4 \) in the expression), plus they can take on extra tasks based on their capacity. The expression \( x(4+x) \) would then help calculate the total workload across your project team, guiding you in resource allocation and planning.