LINEAR TRANSFORMATION SIMULATION

▸ Building the coordinate grid & basis vectors î, ĵ…
▸ Loading the target matrix [[a, b], [c, d]]
▸ Interpolating smoothly: identity matrix → target matrix
▸ Computing the determinant det = ad − bc (area factor)
▸ Solving eigenvalues λ & drawing eigenvectors…
▸ Ready — Online. ✅
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⌂ Mathematics

Simulation room Matrices & linear transforms

Linear Transforms · 2×2 Matrix
Online
î · ĵ · det · eigenvector · λ
Matrix & invariants
2×2 matrix
î (green) · ĵ (red) · unit cell → image
î → (a, c)
ĵ → (b, d)
Determinant det
Trace
Eigenvalue λ₁
Eigenvalue λ₂
Tip
Column 1 = where î lands, column 2 = where ĵ lands. det = ad − bc is the signed area-scaling factor (negative = flips like a mirror). An eigenvector = a direction that does not change, only stretched by λ.
Switch the Scenario to see different grid transforms (rotate · scale · shear · reflect · singular · project) · click a structure to open a card
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det · λ₁ · λ₂ over the morph progress (0 → target → 0) detλ₁λ₂