Complex and Parametric Motion is still in progress

Start with complex numbers as points on one plane, turn that plane into unit-circle and polar-coordinate geometry, deepen that same bench into trig identities and inverse-angle reasoning, then carry the coordinate language into motion traced from x(t) and y(t).

This completion page stays public, but the completion reflection only unlocks after every concept and authored checkpoint in this track is clear on this browser. The route still reads the same local concept records and solved challenge ids, and signed-in sync keeps reusing those records instead of inventing a separate track store.

Complex points on a planeUnit-circle and polar geometryTrig identities from one pointQuadrant-aware inverse trigPath vs traversal

Track progress

Finish the remaining guided moments to open the full reflection.

Complex Numbers on the Plane opens this track and sets up the rest of the path.

Track completion

0 / 10 complete

concepts complete

checkpoints clear

stronger checks

challenges solved

Remaining concepts: Complex Numbers on the Plane, Unit Circle / Sine and Cosine from Rotation, Polar Coordinates / Radius and Angle, Trig Identities from Unit-Circle Geometry, Inverse Trig / Angle from Ratio, Parametric Curves / Motion from Equations. Remaining checkpoints: Complex-plane checkpoint, Unit-circle sign checkpoint, Inverse-angle checkpoint, Parametric-motion checkpoint.

Start with Complex numbers Open full track

Shareable links

Copy the completion reflection, the full track, or recap mode without carrying any saved progress.

Completed so far

These concepts are already complete in the track.

Status and mastery badges come from the same local-first concept records used everywhere else.

No concepts in this track are complete yet on this browser.