In this and the following problem you will consider the integral f7y cos(3x) dx + 4xy dy on the closed curve C consisting of the line segments from (0,0) to (2.7) to (0,7) to (0,0). Here, you evaluate the line integral along each of these segments separately (as you would have before having attained a penetrating and insightful knowledge of Green's Theorem), and in the following problem you will apply Green's Theorem to find the same integral. Note that you can check your answers between the two problems, because the value of the final integral will be the same (that is, the sum you find below must be equal to the final anser in the following problem). Evaluate the integral above by finding the integral from (0,0) to (2,7), adding the integral from (2,7) to (0.7), and adding the integral from (0,7) to (0,0): fc 7y cos(3x) dx + 4xy dy = 1+0+0

Advanced Engineering Mathematics
10th Edition
ISBN:9780470458365
Author:Erwin Kreyszig
Publisher:Erwin Kreyszig
Chapter2: Second-order Linear Odes
Section: Chapter Questions
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In this and the following problem you will consider the integral
7y cos(3a) da + 4xy dy
on the closed curve C consisting of the line segments from (0,0) to (2,7) to (0,7) to (0,0). Here, you evaluate the line integral along each of these segments separately (as you would have before having
attained a penetrating and insightful knowledge of Green's Theorem), and in the following problem you will apply Green's Theorem to find the same integral. Note that you can check your answers
between the two problems, because the value of the final integral will be the same (that is, the sum you find below must be equal to the final anser in the following problem).
Evaluate the integral above by finding the integral from (0,0) to (2,7), adding the integral from (2,7) to (0,7), and adding the integral from (0,7) to (0,0):
fc 7y cos(3x) dx + 4xy dy=
Transcribed Image Text:In this and the following problem you will consider the integral 7y cos(3a) da + 4xy dy on the closed curve C consisting of the line segments from (0,0) to (2,7) to (0,7) to (0,0). Here, you evaluate the line integral along each of these segments separately (as you would have before having attained a penetrating and insightful knowledge of Green's Theorem), and in the following problem you will apply Green's Theorem to find the same integral. Note that you can check your answers between the two problems, because the value of the final integral will be the same (that is, the sum you find below must be equal to the final anser in the following problem). Evaluate the integral above by finding the integral from (0,0) to (2,7), adding the integral from (2,7) to (0,7), and adding the integral from (0,7) to (0,0): fc 7y cos(3x) dx + 4xy dy=
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