Geometric Derivative of a Parabola via Secant Limit
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Derivative as a Geometric Limit
Overview
An animation illustrating the geometric meaning of the derivative for the function . A point on the parabola is used to draw a secant line with a nearby point separated by a horizontal offset . As , the secant approaches the tangent, visually demonstrating the limit definition .
Phases
| # | Phase Name | Duration | Description |
|---|---|---|---|
| 1 | Intro & Axes | ~4s | Fade‑in a white background, draw centered Cartesian axes with equal scaling; label the origin subtly (no persistent text). |
| 2 | Plot Parabola & Point | ~6s | Sketch the curve in a thin black line; place a white‑filled dot at and highlight it with a brief pulse. |
| 3 | Secant with Initial | ~8s | Introduce a second point with . Draw the secant line in a contrasting color (e.g., blue). Show the fraction beside the line (small inline formula). |
| 4 | Shrink | ~30s | Animate decreasing smoothly from 1 to 0.02 in many small steps; for each step, update the position of and the secant line. The fraction updates in real time, visually approaching a constant value. |
| 5 | Tangent Emerges | ~8s | When is sufficiently small, fade the secant into the tangent line at . Highlight the tangent in red and display the limit value (the derivative ). |
| 6 | Zoom Out & End | ~4s | Slowly zoom the camera out to show the whole parabola while keeping the tangent and point visible; then fade to white. |
Layout
┌─────────────────────────────────────────────┐
│ │
│ MAIN (graph) │
│ │
├─────────────────────────────────────────────┤
│ Caption (optional, small formula display) │
└─────────────────────────────────────────────┘
Area Descriptions
| Area | Content | Notes |
|---|---|---|
| Main | Cartesian axes, parabola , points and , secant/tangent lines | Occupies most of the frame; background is solid white |
| Caption | Small inline formula showing or the limit value | Appears near the bottom edge; fades when not needed |
Notes
- All objects are white or black except the dynamic secant (blue) and final tangent (red) to keep contrast on the white background.
- The camera remains centered on the origin; only a gentle zoom out occurs in the final phase.
- No persistent textual labels are used except the brief formula in the caption area.
- Total runtime is approximately 60 seconds, respecting the requested duration.
Создано
tcjoechan
Описание
The animation shows a parabola with a point at (2,4). A moving second point creates a secant line whose slope is displayed as a fraction. As the horizontal offset shrinks, the secant approaches the tangent, and the slope value settles to the derivative at that point. The final tangent is highlighted and the limit value is shown before the view zooms out.
Создано
Jul 5, 2026, 06:19 AM
Длительность
1:00
Теги
calculusderivativegeometryparabola