Explanation Given: F ( x , y ) = ( x 3 / 2 − 3 y ) i ^ + ( 6 x + 5 y ) j ^ ; C : triangle with vertices ( 0 , 0 ) , ( 5 , 0 ) , and ( 0 , 5 ) . Formula used: Green’s Theorem states that, ∫ C M d x + N d y = ∬ R ( ∂ N ∂ x − ∂ M ∂ y ) d A Work done by force F is given by, ∫ C F . d r Integration of a function x n is given as, ∫ x n = x n + 1 n + 1 + C Partial differentiation of a function x n with respect to x is given as, ∂ ( x n ) ∂ x = n x n − 1 Calculation: The path C is shown below in the graph, Consider the force, F ( x , y ) = ( x 3 / 2 − 3 y ) i ^ + ( 6 x + 5 y ) j ^ As, M = x 3 / 2 − 3 <

Calculus: Early Transcendental Functions

7th Edition

ISBN: 9781337552516

Author: Ron Larson, Bruce H. Edwards

Publisher: Cengage Learning

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Chapter 15.4, Problem 27E

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To calculate: Work done by force F(x,y)=(x3/2−3y)i^+(6x+5y)j^ on a particle which moves counter clockwise around closed path C.

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Chapter 15.4, Problem 26E

Chapter 15.4, Problem 28E

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Calculus: Early Transcendental Functions

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Work done by force F ( x , y ) = ( x 3 / 2 − 3 y ) i ^ + ( 6 x + 5 y ) j ^ on a particle which moves counter clockwise around closed path C .

Solution Summary: The author explains the work done by the force F on a particle which moves counter clockwise around closed path C.

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To calculate: Work done by force F(x,y)=(x3/2−3y)i^+(6x+5y)j^ on a particle which moves counter clockwise around closed path C.

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