Quick Intuitive Proof of the Gaussian Integral
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The Gaussian Integral – Quick Intuitive Proof
Overview
A fast vertical‑format animation that walks through the classic proof that by squaring the integral, converting to polar coordinates, and evaluating. The key takeaway is that the Gaussian integral equals .
Phases
| # | Phase Name | Duration | Description |
|---|---|---|---|
| 1 | Title & Subtitle | ~3 s | Fade‑in the title “The Gaussian Integral” and subtitle “An Intuitive Proof” at the top of the frame. |
| 2 | Statement of Integral | ~2 s | Write the one‑dimensional integral below the subtitle. |
| 3 | The Trick: Square It! | ~1.5 s | Appear a short cue “The Trick: Square it!” then transform the single integral into . |
| 4 | Merge to 2‑D Integral | ~2 s | Transform to the double integral . |
| 5 | Switch to Polar Coordinates | ~3 s | Fade in text “Switch to Polar Coordinates” with the substitution and . |
| 6 | Polar Integral Form | ~2 s | Transform to . |
| 7 | Separate the Integrals | ~1.5 s | Split into and . |
| 8 | Evaluate Radial Part | ~1.5 s | Show the antiderivative and evaluate from 0 to . |
| 9 | Assemble Result | ~1.5 s | Simplify to . |
| 10 | Final Reveal | ~4 s | Transform to the final equation and draw a highlighted box around it. |
Layout
┌─────────────────────────────────────────────┐
│ │
│ MAIN (visual) │
│ │
├─────────────────────────────────────────────┤
│ Caption / step label (small, optional) │
└─────────────────────────────────────────────┘
Area Descriptions
| Area | Content | Notes |
|---|---|---|
| Main | Title, subtitles, all equations, transformation arrows, and the final boxed result. | Takes up the majority of the vertical frame; centered horizontally. |
| Caption | Brief step label (e.g., “The Trick”, “Polar Coordinates”). | Small text placed just below the main equation during each step; fades out when the step ends. |
Notes
- Aspect ratio: 9:16 vertical video (TikTok/Shorts) as requested.
- Color palette: Accent = TEAL, Highlight = YELLOW, neutral gray for auxiliary text.
- Font sizes: Title 42 pt, subtitle 24 pt, step cues 28 pt, all MathTex at 34 pt (except final equation at 36 pt).
- Transitions: Primarily
FadeIn,TransformMatchingShapes, andFadeOutto keep the pacing brisk. - Assumptions: No persistent footer text is needed beyond the step cue; the caption area is used only for temporary step labels. All timing estimates are rounded to the nearest half‑second to keep the total length under 30 seconds.
- Single Scene: The entire animation fits within one
Sceneclass. - No extra text: All information is conveyed visually; no explanatory narration text is included beyond the on‑screen cues.
Créé par
adomokhaidavid4life
Description
A fast vertical animation walks through the classic proof that the integral of the Gaussian function over the whole real line equals the square root of pi. It squares the integral, converts to a double integral, switches to polar coordinates, separates and evaluates the radial part, and finally reveals the result.
Date de création
Jul 12, 2026, 02:42 PM
Durée
0:22
Tags
calculusintegralsgaussian-integralpolar-coordinates