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Consider curve given in polar coordinates by Find the derivative r = 8 cos 0,0 ≤ 0 ≤ π/2, dr = -8 sin(theta) do and use it to compute the area of the surface formed by revolving the curve around the polar axis. Enter theta for 0. 8 = S 64 sin(2theta) de = 64 cos (2theta) 2 ) ¹3. 64π

Consider curve given in polar coordinates by Find the derivative r = 8 cos 0,0 ≤ 0 ≤ π/2, dr = -8 sin(theta) do and use it to compute the area of the surface formed by revolving the curve around the polar axis. Enter theta for 0. 8 = S 64 sin(2theta) de = 64 cos (2theta) 2 ) ¹3. 64π

Trigonometry (MindTap Course List)
Trigonometry (MindTap Course List)
8th Edition
ISBN:9781305652224
Author:Charles P. McKeague, Mark D. Turner
Publisher:Charles P. McKeague, Mark D. Turner
Chapter8: Complex Numbers And Polarcoordinates
Section: Chapter Questions
Problem 3GP
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Consider curve given in polar coordinates by Find the derivative r = 8 cos 0,0 ≤0 ≤ π/2, s = √³ = dr do -8 sin(theta) and use it to compute the area of the surface formed by revolving the curve around the polar axis. Enter theta for 0. 647 sin(2theta) de = 64 cos (2theta) 2 13 64π
Transcribed Image Text:Consider curve given in polar coordinates by Find the derivative r = 8 cos 0,0 ≤0 ≤ π/2, s = √³ = dr do -8 sin(theta) and use it to compute the area of the surface formed by revolving the curve around the polar axis. Enter theta for 0. 647 sin(2theta) de = 64 cos (2theta) 2 13 64π
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We need to find out the area of the surface of revolution formed by the given function.

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