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Line Integrals of Scalar Functions: Evaluate Line Integrals : Contour Integrals

Line Integral of a Vector Field :: F(x,y,z) = sin(x) i + cos(y) j + xz k

Fundamental Theorem for Line Integrals :: Conservative Vector Field Line Integral

Green's Theorem Examples

Scalar Surface Integral ∫∫ x^2yz dS where S is part of the plane z=1+2x+3y

Scalar Surface Integral ∫∫xy dS, S is the triangular region (1,0,0), (0,2,0), (0,0,2)

Evaluate the Surface Integral over the Helicoid r(u,v) = ucos v i + usin v j + v k

Find the Flux of the Vector Field F = x i + y j + z^4 k Through the Cone with Downward Orientation

Use Stokes' Theorem to Evaluate the Surface Integral

Divergence Theorem:: Find the flux of F = ( cos(z) + xy^2, xexp(-z), sin(y)+x^2z )

Description:

Explore vector calculus concepts in this comprehensive tutorial covering Stewart Calculus Chapter 16. Delve into line integrals of scalar functions, vector fields, and the Fundamental Theorem for Line Integrals. Learn to apply Green's Theorem, evaluate scalar surface integrals, and calculate flux through various surfaces. Master techniques for solving problems involving helicoids, cones, and complex vector fields. Gain proficiency in using Stokes' Theorem and the Divergence Theorem to evaluate surface integrals and flux. Perfect for students seeking a deep understanding of vector calculus and its applications.

Stewart Calculus - Vector Calculus

Jonathan Walters

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#Mathematics #Calculus #Vector Calculus #Green's Theorem #Stokes' Theorem #Vector Fields #Divergence Theorem #Line Integrals