Clawdemy
Clawdemy Lessons
Free AI literacy for everyday users. Bite-size narrated lessons that turn fear into fluency, one topic at a time.
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Episodes
GPUs and TPUs: brief 25.05.2026 13:00
How GPUs and TPUs execute model math: SIMT cores and memory tiers, the physics behind arithmetic intensity, and the TPU's systolic-array bet on matmul.
Language model evaluation: brief 25.05.2026 12:00
An overview of how modern language models are evaluated: the four benchmark formats, why evaluation is hard, contamination defenses, and the layered stack.
LLM data sources, part 1: brief 25.05.2026 13:00
What you will learn about where LLM training tokens come from: six source categories, open datasets, the raw-to-final funnel, and sampling weights.
Data filtering and deduplication: brief 25.05.2026 13:00
What this lesson covers and the skills it builds: filtering, deduplication, mixing, and synthetic data, with prerequisites and the technical-not-legal scope.
What vectors are: brief 24.05.2026 10:00
What this lesson on vectors covers: the three views, the two defining operations, prerequisites (none), and read and practice times.
Spans and basis, in brief 24.05.2026 9:00
Overview of the spans and basis lesson: what you will learn, prerequisites, the light algebra involved, and read and practice time estimates.
Matrices between dimensions: brief 24.05.2026 10:00
Overview of rectangular matrices: read a shape to find input and output dimensions, tell embeddings from projections, and place column space and null space.
Matrix multiplication: brief 24.05.2026 10:00
Overview of the matrix multiplication lesson: composition of transformations, computing products column by column, prerequisites, time, and outcomes.
Linear transformations: brief 24.05.2026 10:00
What this lesson on linear transformations covers: a matrix as the record of where basis vectors land, plus prerequisites, timing, and outcomes.
Matrix inverse and null space: brief 24.05.2026 11:00
Orientation to inverses, column space, and null space: what you will learn, prerequisites, and the three equivalent tests for whether a matrix is invertible.
Eigenvectors and eigenvalues: brief 24.05.2026 13:00
Overview of the eigenvectors lesson: what you will learn, how diagonalization delivers the change-of-basis payoff, prerequisites, and time and difficulty.
Dot products: brief 24.05.2026 11:00
A learning guide to the dot product: the two formulas, projection, duality, and its role in attention and cosine similarity, plus prerequisites and timing.
The determinant: brief 24.05.2026 10:00
A guide to the determinant: what it scales, how to read it off the unit square, the ad-bc formula, why zero means collapse, and the product rule.
Cross products: brief 24.05.2026 9:00
A brief on the 2D cross product: compute the signed area two vectors span, read its sign as orientation, and see it as the determinant you know.
Cramer's rule: brief 24.05.2026 11:00
A roadmap to the Cramer's rule lesson: prerequisites, the area-ratio derivation you will build, and what solving a 2x2 system as a determinant ratio covers.
Change of basis, in brief 24.05.2026 12:00
Overview of the change of basis lesson: what you'll learn, the prerequisites (inverses, transformations), and how it sets up eigenvectors.
Abstract vector spaces, in brief 24.05.2026 12:00
What this brief covers: functions and polynomials as vectors, the derivative as a matrix, prerequisites, time, and how every track tool generalizes.
Stepping up to 3D: brief 24.05.2026 10:00
Overview of the 3D linear algebra lesson: what you will learn, prerequisites, and how stepping into three dimensions sets up the determinant next.
3D cross product via duality: brief 24.05.2026 12:00
Overview of the lesson that derives the 3D cross product from duality, with prerequisites, learning outcomes, and the three geometric properties it covers.
Why e is special: brief 24.05.2026 11:00
An overview of why e^x is its own derivative: the multiplier crossing point, the chain-rule extension to e^(kx), and where e appears in growth and AI.
Why area equals slope: brief 24.05.2026 11:00
A guided overview of proving why area equals slope: the area function, the sliver argument giving A'(x)=f(x), and how it yields the fundamental theorem.
Trig derivatives from geometry: brief 24.05.2026 11:00
A roadmap to deriving sine and cosine derivatives from a point on the unit circle: what you'll learn, prerequisites, and where it fits.
The derivative as a rate, in brief 24.05.2026 10:00
Brief overview of the derivative lesson: the instantaneous-rate paradox, the rise-over-run limit, free-fall velocity, and the secant-to-tangent picture.
The product rule, in brief 24.05.2026 11:00
An overview of the product rule: why multiplying two derivatives is wrong, how a growing rectangle gives its two terms, plus the examples you will work.
The power rule from geometry: brief 24.05.2026 11:00
What the power rule lesson covers: deriving d/dt(t^n) = n*t^(n-1) from growing squares and cubes, prerequisites, learning outcomes, and the time needed.
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