Consider the 3-dimensional vector field F defined by F (x, y, z) = (12r²y² + 2z² + 1,8x³y – 3z,4xz – 3y – 3). (a) Write down the Jacobian matrix Jp (x, y, z). (b) Determine the divergence div E(r, y, z). (c) Determine curl E(x,y, z). (d) Give reasons why F has a potential function. (Refer to the relevant definitions and theorems in the study guide.) (e) Find a potential function of F, using the method of Example 7.9.1. Note, however that that example concerns a 2-dimensional vector field, so you will have to adapt the method to be suitable for a 3-dimensional vector field. Pay special attention to the notation that you use for derivatives of functions of more than one variable.

Calculus in Higher Dimensions

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Document1 - Microsoft Word (Product Activation Failed) File Home Insert Page Layout References Mailings Review View X.'1•l'2.1:3·1'4L:5'1•6' :7:1:8' 1: 9:1 10. 111: I'12.1'13. 1'14. I'15: I 16' I'17. I 18 1 19. : 20. 1 21. I 22. 1 23. 1 24. 1 25. 1 26' I 27. 1 28 I :29. 1 30. I :31 I 32. I 33' 1 34. I' 35. 1 36' I 37% E W Consider the 3-dimensional vector field F defined by F (x, y, z) = (12x²y² + 2z² + 1, 8x*y – 3z, 4xz – 3y – 3). (a) Write down the Jacobian matrix Jp (x, y, z). (b) Determine the divergence div F(x, y, z). (c) Determine curl F(x,y, z). (d) Give reasons why F has a potential function. (Refer to the relevant definitions and theorems in the study guide.) (e) Find a potential function of F, using the method of Example 7.9.1. Note, however that that example concerns a 2-dimensional vector field, so you will have to adapt the method to be suitable for a 3-dimensional vector field. Pay special attention to the notation that you use for derivatives of functions of more than one variable. all 07:07 PM 2021-05-11 Words: 0 E 90% -