在同一平面直角坐标系中，一次函数$y_{1}=ax + b(a eq0)$与$y_{2}=mx + n(m eq0)$的图象如图所示，则下列结论正确的是 ( )---**Textual Information:** * Equations of Lines: y₁ = ax + b y₂ = mx + n * Axis Labels: x, y * Origin Label: O * Coordinate Values at Intersection: 2 (on x-axis), 3 (on y-axis) **Chart Description:** * Type: Cartesian coordinate plane showing the graphs of two linear functions (straight lines). * Axes: A horizontal x-axis and a vertical y-axis, intersecting at the origin O. Both axes have arrows indicating the positive direction. * Lines: * One line is labeled y₁ = ax + b. This line has a positive slope. * The other line is labeled y₂ = mx + n. This line has a negative slope. * Intersection Point: The two lines intersect at a single point. This point is located at the coordinates (2, 3). Dashed lines are drawn from the intersection point to the x-axis at x=2 and to the y-axis at y=3 to indicate its coordinates. * Relative Position and Direction: * For x < 2, the line y₂ = mx + n is above the line y₁ = ax + b. * For x = 2, the two lines intersect, meaning y₁ = y₂. The value of y at the intersection is 3. * For x > 2, the line y₁ = ax + b is above the line y₂ = mx + n.