Vectors Prep

§2.6

Total Differential & the Fundamental Lemma

The right notion of differentiability for several variables - and the lemma that justifies the chain rule.

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§2.9

The General Chain Rule

Jacobian matrices multiply under composition - area distortion factors compose.

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§2.10

Implicit Functions

When equations secretly define functions - the derivative formula and the Implicit Function Theorem.

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§2.11*

Proof of the IFT

How monotonicity and the IVT force a unique smooth solution into existence.

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§2.12

Inverse Functions & Coordinates

Coordinate transformations, the Jacobian reciprocal rule, and polar/cylindrical/spherical systems.

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§2.18

Higher Derivatives of Implicit Functions

Find second-order partial derivatives without solving for z explicitly.

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§2.19

Maxima & Minima

Find and classify critical points - the second derivative test, saddle points, and absolute extrema.

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§2.21

Quadratic Forms & Definiteness

Classify critical points using the Hessian, eigenvalues, and quadratic forms.

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§3.1

Introduction

The fluid model, stream lines, and a first taste of divergence and curl.

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§3.2

Vector Fields & Scalar Fields

Radial, rotation, and gravitational fields. Scalar fields and level curves.

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§3.3

The Gradient Field

Directional derivatives, steepest ascent, and the geometry of level curves.

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§3.4

Divergence

Sources, sinks, and net flux - measuring how much a field spreads out.

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§3.5

The Curl

Rotation in a vector field - the paddle wheel test and the curl formula.

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§3.6

Combined Operations

Chaining grad, div, and curl - fundamental identities, the Laplacian, and potential functions.

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§4.1

The Definite Integral

Riemann sums, iterated integrals, and changing the order of integration.

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§4.2

Numerical Evaluation of Indefinite Integrals

Building functions one trapezoid at a time, and elliptic integrals.

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§4.3

Double Integrals

Integrating over curved regions, physical applications, and the mean value property.

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§4.4

Triple Integrals

Extending integration to three dimensions - mass, volume, and iterated integrals.

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§4.5

Integrals of Vector Functions

Component-wise integration, displacement, and work along a path.

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§4.6

Change of Variables

Jacobian determinants, coordinate transformations, and area stretching.

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§4.7

Arc Length & Surface Area

Measuring curves and surfaces via parametric integrals and cross products.

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§4.8

Improper Multiple Integrals

Convergence over unbounded regions and near singularities.

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§4.9

Leibnitz's Rule

Differentiate under the integral sign with fixed or variable limits.

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§5.1

Introduction to Vector Integral Calculus

Three kinds of line integrals: arc length, mass, and work along a curve.

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§5.2

Line Integrals in the Plane

Parametric computation of ∫ P dx + Q dy, direction, closed curves, piecewise paths.

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§5.3

Line Integrals

Scalar line integrals with respect to arc length, curtain visualization.

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§5.4

Line Integrals as Integrals of Vectors

The vector form $\int_C \mathbf{u}\cdot d\mathbf{r}$ - work, circulation, and the conservative-field shortcut.

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§5.5

Green's Theorem

Convert closed-curve line integrals into double integrals over the enclosed region.

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§5.11

The Divergence Theorem

Flux across a closed surface equals the total divergence inside - Gauss's theorem.

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§5.12

Stokes's Theorem

Circulation around a boundary curve equals the total curl through any spanning surface.

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