Phase portraits (HL only)

d/dt(x, y) = M(x, y) with M = (a, b; c, d); the only equilibrium is the origin (0, 0) (when M is invertible).

Their nature classifies it: same-sign real → node, opposite-sign real → saddle, complex → spiral, purely imaginary → centre.

A stable node (sink): every trajectory decays to the origin because each e^(λt) → 0.

A saddle point — always unstable (pulled in one direction, flung out the other).

Spiral; stable (inward) if a < 0, unstable (outward) if a > 0. If a = 0 it is a centre (closed loops).

It is a straight-line trajectory through the origin; the state moves IN if its eigenvalue is negative, OUT if positive.

(x, y) = A·e^(λ₁t)·v₁ + B·e^(λ₂t)·v₂, with v₁, v₂ the eigenvectors and A, B set by the starting state.

Enter M as a matrix and use the eigenvalue/eigenvector tools; use it for Euler's method too (GDC allowed on every AI paper).