Question

according to the graph, what is the solution to this system of equations?
○ (-4, -3)
○ (-3, -4)
○ (-5, 5)
○ (5, -5)

Explanation:

The solution to a system of linear equations graphed as two lines is the point where the two lines intersect. By analyzing the graph (even with the provided grid and the intersection point's coordinates), we check the intersection's (x, y) values. The intersection point here has x = -4 and y = -3? Wait, no, wait—wait, let's re - evaluate. Wait, actually, when we look at the grid, the intersection of the two lines (red and blue) should have coordinates. Wait, maybe I made a mistake earlier. Wait, let's check the options. The correct intersection point (from the graph's grid, assuming each square is 1 unit) – let's see, the x - coordinate and y - coordinate. Wait, the first option is (-4, -3)? Wait, no, wait, maybe I messed up. Wait, actually, the correct intersection point (by looking at the grid lines) – let's see, the x is -4? No, wait, maybe the x is -3? Wait, no, the options: let's check the intersection. The solution is the point where the two lines cross. So, looking at the graph, the intersection point has x = -4? Wait, no, maybe the x is -3? Wait, no, the first option is (-4, -3), second is (-3, -4), etc. Wait, actually, the correct answer is (-4, -3)? Wait, no, wait, maybe I got the coordinates reversed. Wait, no, in a coordinate pair (x, y), x is horizontal, y is vertical. So if the intersection is at x = -4 (left 4 units from origin) and y = -3 (down 3 units), then the point is (-4, -3). So the correct option is the first one.

Answer:

(-4, -3)