6- Find the work done to turn a particle around a circle in the n plane, whosecenter is the origin, knowing that the corresponding force field isF = (2x-y+2) + (x+y-z³)j + (3x-2y +4z) kConsider as parametric equations of the circle x = 3 cos (t). y = 3 sin (t) in whicht varies from 0 to 2pi. As seen in the figure

Answered: Image /qna-images/answer/fc1ee9ad-be87-4b33-8f18-73c805a9bf10.jpg

Answered: 6- Find the work done to turn a…

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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show complete solution (computation and final answer must be in 4 decimal places)
Derive the Parametric Equation for the Elliptic Cone expressed in xyz coordinates. And then find the Normal Vector N. z = 4x² + y²
Find the work done by F (given below) when moving the particle CCW around T once. T is the triangle with points (2,2), (0,0), and (2,0). F(x,y) = sinx i + x^2y^3 j. Show this done using green's theorem and w/o Green's theorem
Parametrize the intersection of the surfaces y² - z² = x - 6, y² + z² = 25 using trigonometric functions. (Express numbers in exact form. Use symbolic notation and fractions where needed. Give the parametrization of the y variable in the form a cos (t).) x(t) = y(t) = z(t) =
Show that the acceleration of a point particle in polar coordinates (d'r d²0 dr de +2 de 0 is equivalent to the acceleration in Cartesian a = r r dt? dt dt? dt dt d?x coordinates ả : dt? d'y -ŷ using r = dt? x² + y² , î = cos Oâ + sin0ŷ, 2 Ö = - sin Ox + cos Oŷ , x =r cos0, and y = r sin©.
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