If the equation in terms of x has a solution, it will intersect the x-axis. Let's take an example, like the equation x²+2x+1=0. You can break it down into two expressions: y=0 and y=x²+2x+1. The points where these two lines intersect are the solutions to the equation. This is why points on the x-axis for x equations represent solutions.

For a quadratic equation, the discriminant is b²-4ac. If b²-4ac > 0, it means there are solutions, indicating intersections with the x-axis. If b²-4ac = 0, there is one solution(double root), a single intersection point. If b²-4ac < 0, it means the equation has no solution and doesn't intersect the x-axis. In this case, since the graph intersects the x-axis, the discriminant b²-4ac should be greater than 0, indicating solutions.