Let E be solid with boundary surfaces S. The volume of E isSs S cos yi + (y +1²z)j – y°k]. do OS, S(z + z cos y)i + 2²zj + y° zk]. do OSs S[(2 + cos y)i + z²zj – (y² - z)k]. do OS. Si(z - I cos y)i + 2°zj – y*k]. do OSs SI( + sin y)i + (yz + sin zz)j – yk]. do OS S(z + a cos y)i + x² zj – y°zk]. do OSM+2 cos y)i + 2²zj– y°k}. do O

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Let E be solid with boundary surfaces S. The volume of E is S S cos yi + (y +1²z2)j – y°k]. do O Ss S(z + x cos y)i + 2'zj+ y° zk]. do O Ss S(# + cos y)i + a² zj – (y² - z)k]. do O S. S(z - I I cos y)i + x²zj – y³k], do O Ss SI( + sin y)i + (yæ + sin zz)j – y k). do O L S(z + a cos y)i + x² zj – y°zk]. do O S S( +2 cos y)i + 2²zj - y°k]. do O

Let E be solid with boundary surfaces S. The volume of E is S S cos yi + (y +1²z2)j – y°k]. do O Ss S(z + x cos y)i + 2'zj+ y° zk]. do O Ss S(# + cos y)i + a² zj – (y² - z)k]. do O S. S(z - I I cos y)i + x²zj – y³k], do O Ss SI( + sin y)i + (yæ + sin zz)j – y k). do O L S(z + a cos y)i + x² zj – y°zk]. do O S S( +2 cos y)i + 2²zj - y°k]. do O

Advanced Engineering Mathematics

10th Edition

ISBN:9780470458365

Author:Erwin Kreyszig

Publisher:Erwin Kreyszig

Chapter2: Second-order Linear Odes

Section: Chapter Questions

Problem 1RQ

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