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13 Nov 2019
Find the length of the curve defined by the parametric equations. x = sin2 t, y = 9 cos 2t; 0 t Ï
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Jamar Ferry
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18 Jun 2019
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Related questions
1 point Which of the following integrals represents the area of the surface obtained by rotating the parametric curve x = sin2(t), y = sin(3) 0 t Ï/3, about the x-axis? OA./ 2Ï sin2(t)ã/36 sir? (t) cos2(t) + cos2(3) dt 0 or B., 2Ï sin(30V2sun(t) cos() + 3 cos(3t) dt 0 Ï/3 2xin(336 sin2() cos) + cos (3) dit
5. Find the length of each the following parametric curves: (a) C(t) = (2t + 3, e' + e-t), 0 t 2. (b) C(t) = (2-3 sin2(t), cos(2t)), 0-K (c) C(t) = (et cost, et sin t), 0 t T. ì¦.
3) Find the length of the curve given by parametric equations: x=232, y = 5 + 2t3, 0 t 1 (2 pt.) *Extra : x = 2 + 2t, y = e-t + et, 0 t 2 (1pt. ) *
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