πCondensed Notes
π§ͺUnderstanding Vectors and Their Operationsπ§ͺApplications and Visualization of Cross Product Orthogonalityπ§ͺVectors are Independent of Basis, Components Transform via Rotation Matricesπ§ͺThe Kronecker Delta and Permutation Symbol are Essential Tools for Vector Algebra and Geometric Inteπ§ͺFields as Functions Mapping Space to Physical Quantitiesπ§ͺIntegral Theorems: Connecting Derivatives to Boundariesπ§ͺVector Calculus in General and Orthogonal Coordinate SystemsπScalar and Vector Potentials: Decomposing Vector Fields and Their PropertiesπThe Outer Product and Tensor TransformationsπOperations and Properties of TensorsπThe Metric Tensor Covariant Derivatives and Tensor DensitiesπTensors in Cartesian Coordinates and Their IntegrationπApplications of Tensors in Solid Mechanics Electromagnetism and Classical MechanicsπFrom Extensive Properties to the Continuity EquationπDerivation of the Diffusion and Heat Equations from the Continuity PrincipleπThe Wave Equation-Derivation and Physical Applications and Wave Speed DeterminationπBoundary and Initial Conditions for Partial Differential Equations-Types and Uniqueness and StationaπFluid Momentum and the Continuity Equation-Derivation of the Cauchy and Navier-Stokes Equations
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