a) Find a potential function for the vector field, i.e., find a function ƒ so that F =Vƒ. b) Use the potential function found above and the Fundamental Theorem for Line Integrals to find fF.dr, where F =< 3x²y²,2x³y> and the curve C is r(t) =,0 ≤t≤1.

a) Find a potential function for the vector field, i.e., find a function ƒ so that F =Vƒ. b) Use the potential function found above and the Fundamental Theorem for Line Integrals to find fF.dr, where F =< 3x²y²,2x³y> and the curve C is r(t) =,0 ≤t≤1.

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter6: The Trigonometric Functions

Section6.6: Additional Trigonometric Graphs

Problem 78E

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Question

a) Find a potential function for the vector field, i.e., find a function f so
that F =Vf.
b) Use the potential function found above and the Fundamental Theorem for Line Integrals to
find F.dr, where F =< 3x²y²,2x³y> and the curve C is
r(t) =<t+1,²-2,0>,0 ≤ t≤1.

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