the solution to each systen \( \left\{y \geq-\frac{5}{3} x+2 y \geq-3\right. \)

To solve the given system of inequalities, start by rewriting them: 1. \( y \geq -\frac{5}{3}x + 2 \) 2. \( y \geq -3 \) Graph these inequalities on the coordinate plane. The first inequality represents a line with a slope of \(-\frac{5}{3}\) that intercepts the y-axis at 2. The second inequality is a horizontal line at \(y = -3\). The solution to the system is where the shaded regions for both inequalities overlap, which is above the line \(y = -3\) and above the line defined by the slope. In more specific terms, you can find the intersection points by setting \(-\frac{5}{3}x + 2 = -3\), leading us to find the x-coordinate. Solve for x to discover your boundary points, and then shade the areas that meet the conditions! Always remember: the solution set for systems of inequalities is a region, not just points!