Factor $3$ out of the left-hand side of $3x + 9y$. Rewrite the inequality using that factorization before simplifying further.

When you divide both sides of an inequality by a positive number, does the direction of the inequality sign change or stay the same?

In Desmos, type 3x + 9y >= -12. You should see a boundary line and a shaded half-plane showing all the solutions to the original inequality.

On new lines in Desmos, enter each option exactly:

• x + 3y <= -4
• 3x + 9y <= -12
• -x - 3y >= 4
• x + 3y >= -4

Turn them on and off (using the checkboxes) to compare each graph with the original.

Look for the choice whose boundary line and shaded region perfectly overlap with the graph of 3x + 9y >= -12—same line and same side shaded. That option is the inequality that is truly equivalent to the original.

Two inequalities are equivalent if they have exactly the same set of solutions. You can create an equivalent inequality by doing the same operation to both sides (like adding, subtracting, multiplying, or dividing by the same nonzero number), remembering that multiplying or dividing by a negative number flips the inequality sign.

Start with the given inequality:

Notice that every term ($3x$, $9y$, and $-12$) is divisible by $3$. Factor out $3$ from the left side:

So the inequality can be rewritten as:

Now divide both sides of the inequality by $3$ to isolate the parentheses:

Because $3$ is positive, the inequality sign stays the same:

This simplified inequality is equivalent to the original one and matches answer choice D, $x + 3y \ge -4$.