isoclines

Isoclines are curves in the plane associated with a first-order ordinary differential equation dy/dx = F(x, y). An m-isocline is the locus of points where F(x, y) = m, i.e., where the slope of any solution through that point is equal to m. The collection of all isoclines, for varying m, partitions the plane by constant slope values and provides a graphical tool for analyzing the direction field without solving the equation.

To use isoclines, one draws the slope field of dy/dx = F(x, y). On each isocline, tangent lines

Example: for y' = x − y, the m-isocline is y = x − m, since x − y = m. The

Limitations: isoclines provide qualitative insight into the behavior of solutions and aid in sketching phase portraits,