Explanation Given: C: boundary of the region lying between the graphs of y = x and y = x 3 in the first quadrant. Formula used: ∂ ∂ x e x = e x ∂ ∂ y e y = e y Calculation: The path C can be considered that is composed of two paths C 1 and C 2 . The path C 1 given by y = x and C 2 given by y = x 3 , which intersects each other at ( 0 , 0 ) & ( 1 , 1 ) . The parametric equation of the two paths gives us r ( t ) = { t i + t 3 j ; 0 ≤ t ≤ 1 ( 2 − t ) i + ( 2 − t ) j ; 1 ≤ t ≤ 2 For the path C 1 , has x ( t ) = t and y ( t ) = t 3 , which implies that d x = d t and d y = 3 t 2 d t For the path C 2 , has x ( t ) = 2 − t and y ( t ) = 2 − t , which implies that d x = − d t and d y = − d t ∫ C x e y d x + e x d y = ∫ C 1 ( x e y d x + e x d y ) + ∫ C 2 ( x e y d x + e x d y ) = ∫ 0 1 ( t e t 3 d t + e t 3 t 2 d t ) + ∫ 1 2 ( ( 2 − t ) e 2 − t ( − d t ) + e 2 − t ( − d t ) ) = ∫ 0 1 ( t e t 3 + e t 3 t 2 ) d t + ∫ 1 2 e 2 − t ( t − 3 ) d t = 2.935997 − 2.718300 = 0.217697 The value of the two integrals ∫ 0 1 ( t e t 3 + e t 3 t 2 ) d t and ∫ 1 2 e 2 − t ( t − 3 ) d t can be by the use of a computer algebraic system

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Author: Ron Larson, Bruce H. Edwards

Publisher: Cengage Learning

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Chapter 15.4, Problem 10E

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By the use of a computer algebra system the value of both the integrals ∫Cxeydx+exdy=∬R(∂N∂x−∂M∂y)dA for the given path C and also, verify Green’s Theorem.

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Chapter 15.4, Problem 9E

Chapter 15.4, Problem 11E

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By the use of a computer algebra system the value of both the integrals ∫ C x e y d x + e x d y = ∬ R ( ∂ N ∂ x − ∂ M ∂ y ) d A for the given path C and also, verify Green’s Theorem.

Solution Summary: The author explains how a computer algebra system determines the value of both the integrals for the given path C and verify Green's Theorem.

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By the use of a computer algebra system the value of both the integrals ∫Cxeydx+exdy=∬R(∂N∂x−∂M∂y)dA for the given path C and also, verify Green’s Theorem.

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