81-82. Looking ahead: Area from line integrals The area of a region R in the plane, whose boundary is the curve C, may be computed using line integrals with the formula arca of R = [rdy = - f a |y dx. Let R = {(r, 0): 0 sIs a, 0 s 0 s 2} be the disk of radius a centered at the origin, and let C be the boundary of R oriented counterclockwise. Use the formula A = - Scy dx to verify that the area of the disk is ra².

81-82. Looking ahead: Area from line integrals The area of a region R in the plane, whose boundary is the curve C, may be computed using line integrals with the formula arca of R = [rdy = - f a |y dx. Let R = {(r, 0): 0 sIs a, 0 s 0 s 2} be the disk of radius a centered at the origin, and let C be the boundary of R oriented counterclockwise. Use the formula A = - Scy dx to verify that the area of the disk is ra².

Calculus For The Life Sciences

2nd Edition

ISBN:9780321964038

Author:GREENWELL, Raymond N., RITCHEY, Nathan P., Lial, Margaret L.

Publisher:GREENWELL, Raymond N., RITCHEY, Nathan P., Lial, Margaret L.

Chapter8: Further Techniques And Applications Of Integration

Section8.3: Volume And Average Value

Problem 11E

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Question

81-82. Looking ahead: Area from line integrals The area of a region
R in the plane, whose boundary is the curve C, may be computed using
line integrals with the formula
arca of R = [rdy = - f a
|y dx.
Let R = {(r, 0): 0 sIs a, 0 s 0 s 2} be the disk of radius
a centered at the origin, and let C be the boundary of R oriented
counterclockwise. Use the formula A = - Scy dx to verify that
the area of the disk is ra².

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