A region Rxy, in the XY plane, is shown below:y =2x + 3y – 6 = 02x + 3y +1 = 0RryConsider the change of variable u = xy and v = 3y + 2x and the integral/I (20*y – 3ry?) - sin(3ry? + 2a°y)dA»yIRryIf Ruy is the region in the UV plane generated with the above change of variable, then it istrue that:A) I =U · sin(uv)dAuB) I =-uvv2 – 24u · sin(uv)dAuvC) I =uvv² – 24u · sin(uv)dAuvRuvD) I =-u · sin(uv)dAuv

Answered: Image /qna-images/answer/01b93cbb-a71d-4361-a4b0-ef388e59b645.jpg

A region Rxy, in the XY plane, is shown below: A) 1- JJRa 2r + 3y – 6 = 0 2r +3y+1 0 Rry %3D Consider the change of variable u = xy and v = 3y + 2x and the integral /I (20*y – 3ry?) - sin(3ry? + 2a°y)dA_ I Rry If Ruy is the region in the UV plane generated with the above change of variable, th true that: I = U • sin(uv)dAu B) I = -uvv2 – 24u · sin(uv)dAuv Ruv C) I = || uvv² – 24u · sin(uv)dAu Ruv

A region Rxy, in the XY plane, is shown below: A) 1- JJRa 2r + 3y – 6 = 0 2r +3y+1 0 Rry %3D Consider the change of variable u = xy and v = 3y + 2x and the integral /I (20*y – 3ry?) - sin(3ry? + 2a°y)dA_ I Rry If Ruy is the region in the UV plane generated with the above change of variable, th true that: I = U • sin(uv)dAu B) I = -uvv2 – 24u · sin(uv)dAuv Ruv C) I = || uvv² – 24u · sin(uv)dAu Ruv

Algebra & Trigonometry with Analytic Geometry

13th Edition

ISBN:9781133382119

Author:Swokowski

Publisher:Swokowski

Chapter9: Systems Of Equations And Inequalities

Section: Chapter Questions

Problem 12T

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Question

A region Rxy, in the XY plane, is shown below:
y =
2x + 3y – 6 = 0
2x + 3y +1 = 0
Rry
Consider the change of variable u = xy and v = 3y + 2x and the integral
/I (20*y – 3ry?) - sin(3ry? + 2a°y)dA»y
I
Rry
If Ruy is the region in the UV plane generated with the above change of variable, then it is
true that:
A) I =
U · sin(uv)dAu
B) I =
-uvv2 – 24u · sin(uv)dAuv
C) I =
uvv² – 24u · sin(uv)dAuv
Ruv
D) I =
-u · sin(uv)dAuv

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