Titles in this Series

Acute angle between the lines

Item #: 275647

Acute angles between the curves

Item #: 275648

Angle between a vector and the x-axis

Item #: 275649

Angle between two vectors

Item #: 275650

Approximating Double Integrals with Rectangles

Item #: 275651

Arc length of a vector function

Item #: 275652

Area of a surface

Item #: 275653

Average value of a double integral

Item #: 275654

Average value

Item #: 275655

Center, radius, and equation of the sphere

Item #: 275656

Chain rule for multivariable functions

Item #: 275657

Chain rule for multivariable functions and tree diagrams

Item #: 275658

Changing double integrals to polar coordinates

Item #: 275659

Changing iterated integrals to polar coordinates

Item #: 275660

Changing the order of integration

Item #: 275661

Changing triple integrals to cylindrical coordinates

Item #: 275662

Changing triple integrals to spherical coordinates

Item #: 275663

Combinations of vectors

Item #: 275664

Compositions of multivariable functions

Item #: 275665

Copying vectors and using them to draw combinations

Item #: 275666

Critical points

Item #: 275667

Cross product of two vectors

Item #: 275668

Curl and divergence of a vector field

Item #: 275669

Curvature

Item #: 275670

Cylindrical coordinates

Item #: 275671

Derivative of a vector function

Item #: 275672

Describing a region in three dimensional space

Item #: 275673

Differential of a multivariable function

Item #: 275674

Direction cosines and direction angles

Item #: 275675

Directional derivatives in the direction of the angle

Item #: 275676

Directional derivatives in the direction of the vector

Item #: 275677

Discontinuities of multivariable functions

Item #: 275678

Distance between a point and a line

Item #: 275679

Distance between a point and a plane

Item #: 275680

Distance between parallel planes

Item #: 275681

Distance between points in three dimensions

Item #: 275682

Divergence theorem

Item #: 275683

Domain of a multivariable function

Item #: 275684

Domain of a multivariable function, example 2

Item #: 275685

Domain of a vector function

Item #: 275686

Dot product of two vectors

Item #: 275687

Double integrals

Item #: 275688

Double integrals to find mass and center of mass

Item #: 275689

Equation of a plane

Item #: 275690

Equation of the tangent plane

Item #: 275691

Expressing the integral six ways

Item #: 275692

Extreme value theorem

Item #: 275693

Finding area

Item #: 275694

Finding surface area

Item #: 275695

Finding volume with a double integral

Item #: 275696

Finding volume with a double polar integral

Item #: 275697

Finding volume

Item #: 275698

Finding volume with triple integrals

Item #: 275699

Global extrema

Item #: 275700

Gradient vectors

Item #: 275701

Gradient vectors and the tangent plane

Item #: 275702

Green's theorem for one region

Item #: 275703

Green's theorem for two regions

Item #: 275704

Higher order partial derivatives

Item #: 275705

Implicit differentiation for multivariable functions

Item #: 275706

Independence of path

Item #: 275707

Integral of a vector function

Item #: 275708

Intersection of a line and a plane

Item #: 275709

Iterated integrals

Item #: 275710

Iterated integrals

Item #: 275711

Iterated integrals, example 2

Item #: 275712

Jacobian for three variables

Item #: 275713

Jacobian for two variables

Item #: 275714

Limit of a multivariable function

Item #: 275715

Limit of a vector function

Item #: 275716

Line integral of a curve

Item #: 275717

Line integral of a vector function

Item #: 275718

Linear approximation in two variables

Item #: 275719

Linearization of a multivariable function

Item #: 275720

Local extrema and saddle points

Item #: 275721

Magnitude and angle of the resultant force

Item #: 275722

Maximum curvature

Item #: 275723

Maximum product of three real numbers

Item #: 275724

Maximum rate of change and its direction

Item #: 275725

Maximum volume of a rectangular box inscribed in a sphere

Item #: 275726

Midpoint rule for double integrals

Item #: 275727

Midpoint rule for triple integrals

Item #: 275728

Minimum distance from the point to the plane

Item #: 275729

Moments of inertia

Item #: 275730

Normal and osculating planes

Item #: 275731

Normal line to the surface

Item #: 275732

Open, connected, and simply-connected

Item #: 275733

Orthogonal, parallel, or neither

Item #: 275734

Parallel, intersecting, skew and perpendicular lines

Item #: 275735

Parallel, perpendicular and angle between planes

Item #: 275736

Parametric and symmetric equations of a line

Item #: 275737

Parametric equations for the line of intersection of two planes

Item #: 275738

Parametric equations of the tangent line

Item #: 275739

Parametric representation of the surface

Item #: 275740

Partial derivatives in three or more variables

Item #: 275741

Partial derivatives in two variables

Item #: 275742

Plotting points in three dimensions

Item #: 275743

Point on a cone closest to another point

Item #: 275744

Points on the surface

Item #: 275745

Potential function of a conservative vector field

Item #: 275746

Potential function of a conservative vector field to evaluate a line integral

Item #: 275747

Potential function of the conservative vector field, three dimensions

Item #: 275748

Precise definition of the limit for multivariable functions

Item #: 275749

Projections of the curve

Item #: 275750

Reducing equations to standard form

Item #: 275751

Reparametrizing the curve

Item #: 275752

Riemann sums for double integrals

Item #: 275753

Scalar and vector projections

Item #: 275754

Scalar equation of a line

Item #: 275755

Scalar equation of a plane

Item #: 275756

Scalar triple product to prove vectors are coplanar

Item #: 275757

Second derivative test

Item #: 275758

Sketching area

Item #: 275759

Sketching level curves of multivariable functions

Item #: 275760

Sketching the surface

Item #: 275761

Sketching the vector equation

Item #: 275762

Spherical coordinates

Item #: 275763

Stokes' theorem

Item #: 275764

Sum of two vectors

Item #: 275765

Surface integrals

Item #: 275766

Surface integrals, example 2

Item #: 275767

Surface of the vector equation

Item #: 275768

Symmetric equations for the line of intersection of two planes

Item #: 275769

Symmetric equations of a line

Item #: 275770

Tangent plane to the parametric surface

Item #: 275771

Tangential and normal components of the acceleration vector

Item #: 275772

Three dimensions, one constraint

Item #: 275773

Three dimensions, two constraints

Item #: 275774

Triple integrals

Item #: 275775

Triple integrals to find mass and center of mass

Item #: 275776

Two dimensions, one constraint

Item #: 275777

Two dimensions, one constraint, example 2

Item #: 275778

Type I and II regions

Item #: 275779

Unit tangent and unit normal vectors

Item #: 275780

Unit tangent vector

Item #: 275781

Unit vector in the direction of the given vector

Item #: 275782

Using inequalities to describe the region

Item #: 275783

Vector and parametric equations of a line

Item #: 275784

Vector and parametric equations of a line segment

Item #: 275785

Vector from two points

Item #: 275786

Vector function for the curve of intersection of two surfaces

Item #: 275787

Vector orthogonal to the plane

Item #: 275788

Velocity and acceleration vectors

Item #: 275789

Velocity and position given acceleration and initial conditions

Item #: 275790

Velocity, acceleration and speed given position

Item #: 275791

Volume of the parallelepiped from adjacent edges

Item #: 275792

Volume of the parallelepiped from vectors

Item #: 275793

Work done by a force field

Item #: 275794

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Integral Calc: Calculus 3

The Series Includes : Acute angle between the lines | Acute angles between the curves | Angle between a vector and the x-axis | Angle between two vectors | Approximating Double Integrals with Rectangles | Arc length of a vector function | Area of a surface | Average value of a double integral | Average value | Center, radius, and equation of the sphere | Chain rule for multivariable functions | Chain rule for multivariable functions and tree diagrams | Changing double integrals to polar coordinates | Changing iterated integrals to polar coordinates | Changing the order of integration | Changing triple integrals to cylindrical coordinates | Changing triple integrals to spherical coordinates | Combinations of vectors | Compositions of multivariable functions | Copying vectors and using them to draw combinations | Critical points | Cross product of two vectors | Curl and divergence of a vector field | Curvature | Cylindrical coordinates | Derivative of a vector function | Describing a region in three dimensional space | Differential of a multivariable function | Direction cosines and direction angles | Directional derivatives in the direction of the angle | Directional derivatives in the direction of the vector | Discontinuities of multivariable functions | Distance between a point and a line | Distance between a point and a plane | Distance between parallel planes | Distance between points in three dimensions | Divergence theorem | Domain of a multivariable function | Domain of a multivariable function, example 2 | Domain of a vector function | Dot product of two vectors | Double integrals | Double integrals to find mass and center of mass | Equation of a plane | Equation of the tangent plane | Expressing the integral six ways | Extreme value theorem | Finding area | Finding surface area | Finding volume with a double integral | Finding volume with a double polar integral | Finding volume | Finding volume with triple integrals | Global extrema | Gradient vectors | Gradient vectors and the tangent plane | Green's theorem for one region | Green's theorem for two regions | Higher order partial derivatives | Implicit differentiation for multivariable functions | Independence of path | Integral of a vector function | Intersection of a line and a plane | Iterated integrals | Iterated integrals | Iterated integrals, example 2 | Jacobian for three variables | Jacobian for two variables | Limit of a multivariable function | Limit of a vector function | Line integral of a curve | Line integral of a vector function | Linear approximation in two variables | Linearization of a multivariable function | Local extrema and saddle points | Magnitude and angle of the resultant force | Maximum curvature | Maximum product of three real numbers | Maximum rate of change and its direction | Maximum volume of a rectangular box inscribed in a sphere | Midpoint rule for double integrals | Midpoint rule for triple integrals | Minimum distance from the point to the plane | Moments of inertia | Normal and osculating planes | Normal line to the surface | Open, connected, and simply-connected | Orthogonal, parallel, or neither | Parallel, intersecting, skew and perpendicular lines | Parallel, perpendicular and angle between planes | Parametric and symmetric equations of a line | Parametric equations for the line of intersection of two planes | Parametric equations of the tangent line | Parametric representation of the surface | Partial derivatives in three or more variables | Partial derivatives in two variables | Plotting points in three dimensions | Point on a cone closest to another point | Points on the surface | Potential function of a conservative vector field | Potential function of a conservative vector field to evaluate a line integral | Potential function of the conservative vector field, three dimensions | Precise definition of the limit for multivariable functions | Projections of the curve | Reducing equations to standard form | Reparametrizing the curve | Riemann sums for double integrals | Scalar and vector projections | Scalar equation of a line | Scalar equation of a plane | Scalar triple product to prove vectors are coplanar | Second derivative test | Sketching area | Sketching level curves of multivariable functions | Sketching the surface | Sketching the vector equation | Spherical coordinates | Stokes' theorem | Sum of two vectors | Surface integrals | Surface integrals, example 2 | Surface of the vector equation | Symmetric equations for the line of intersection of two planes | Symmetric equations of a line | Tangent plane to the parametric surface | Tangential and normal components of the acceleration vector | Three dimensions, one constraint | Three dimensions, two constraints | Triple integrals | Triple integrals to find mass and center of mass | Two dimensions, one constraint | Two dimensions, one constraint, example 2 | Type I and II regions | Unit tangent and unit normal vectors | Unit tangent vector | Unit vector in the direction of the given vector | Using inequalities to describe the region | Vector and parametric equations of a line | Vector and parametric equations of a line segment | Vector from two points | Vector function for the curve of intersection of two surfaces | Vector orthogonal to the plane | Velocity and acceleration vectors | Velocity and position given acceleration and initial conditions | Velocity, acceleration and speed given position | Volume of the parallelepiped from adjacent edges | Volume of the parallelepiped from vectors | Work done by a force field
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Description

This series includes everything from Calculus 3, including partial derivatives, multiple integrals, and vectors.

Length: 1476 minutes

Item#: FMK275646

Copyright date: ©2017

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