Total marks 15 Total marks on paper: 80 6. Let DCR2 be a bounded domain with the boundary ǝD which can be represented as a smooth closed curve : [a, b] → R², oriented in the anticlockwise direction. (i) Use Green's Theorem to justify that the area of the domain D can be computed by the formula 1 Area(D) = . [5 Marks] (ii) Use the area formula in (i) to find the area of the domain D enclosed by the ellipse (t) = (5 cos(t), 10 sin(t)), t = [0,2π]. [5 Marks] (iii) Explain in your own words why Green's Theorem can not be applied to the vector field У x F(x,y) = ( - x² + y²²x² + y² ). [5 Marks]

Total marks 15 Total marks on paper: 80 6. Let DCR2 be a bounded domain with the boundary ǝD which can be represented as a smooth closed curve : [a, b] → R², oriented in the anticlockwise direction. (i) Use Green's Theorem to justify that the area of the domain D can be computed by the formula 1 Area(D) = . [5 Marks] (ii) Use the area formula in (i) to find the area of the domain D enclosed by the ellipse (t) = (5 cos(t), 10 sin(t)), t = [0,2π]. [5 Marks] (iii) Explain in your own words why Green's Theorem can not be applied to the vector field У x F(x,y) = ( - x² + y²²x² + y² ). [5 Marks]

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter9: Systems Of Equations And Inequalities

Section: Chapter Questions

Problem 39RE

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Question

Total marks 15
Total marks
on paper: 80
6.
Let DCR2 be a bounded domain with the boundary ǝD which
can be represented as a smooth closed curve : [a, b] → R², oriented in
the anticlockwise direction.
(i) Use Green's Theorem to justify that the area of the domain
D can be computed by the formula
1
Area(D)
=
.
[5 Marks]
(ii)
Use the area formula in (i) to find the area of the domain
D enclosed by the ellipse
(t) = (5 cos(t), 10 sin(t)), t = [0,2π].
[5 Marks]
(iii)
Explain in your own words why Green's Theorem can not
be applied to the vector field
У
x
F(x,y) = ( - x² + y²²x² + y² ).
[5 Marks]

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