dy/dx = y/x is a first-order differential equation that describes the slope of the tangent line at any point (x, y) in the plane.

The slope field for dy/dx = 2x shows that the slope of the tangent line increases linearly with x, indicating that the function is quadratic.

The differential equation is dy/dx = -1, indicating that the slope of the tangent line is constant and negative.

The slope field for dy/dx = -x indicates that the slope of the tangent line decreases linearly as x increases.

Slope fields provide a visual representation of the solutions to differential equations, helping to understand the behavior of solutions without solving them analytically.

The slope field for dy/dx = x^2 shows that the slope increases quadratically with x, leading to curves that steepen as x moves away from zero.

The general form is dy/dx = f(x, y), where f is a function of x and y.