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Q5 Bonus Problem 5 Points Use stokes theorem to prove that if F = Vf then...
Use Stokes' Theorem to find SC F. dr where F(x,y,z) = (-y, x,x) and C is...
Use Stokes' Theorem to find SC F. dr where F(x,y,z) = (-y, x,x) and C is the curve of intersection of the plane y = 2 and the paraboloid y + x2 + z2 = 6. Show all work. Please select file(s) Select file(s)
calc hw- pls help!! (: -/5 POINTS MY NOTES Use Stokes' theorem to evaluate | vxř....
calc hw- pls help!! (:
-/5 POINTS MY NOTES Use Stokes' theorem to evaluate | vxř. ñ ds where F = 9y?z, 6xz, 7x?y2 and S is the paraboloid z = x2 + y2 inside the cylinder x2 + y2 = 1, oriented upward. Submit Answer -/5 POINTS MY NOTES Use Stokes' theorem to compute the circulation F. dr where F = (6xyz, 3y-z, 2yz) and C is the boundary of the portion of the plane 2x + 3y +...
. Problem #8: Use Stokes' Theorem to evaluate | F• dr where F = (x +...
.
Problem #8: Use Stokes' Theorem to evaluate | F• dr where F = (x + 52)i + (6x + y)j + (7y - -)k and C is the curve of intersection of the plane x + 3y += = 12 with the coordinate planes. (Assume that C is oriented counterclockwise as viewed from above.) Problem #8: Just Save Submit Problem #8 for Grading Attempt #1 Attempt #2 Attempt #3 Attempt #4 Attempt #5 Problem #8 Your Answer: Your Mark:...
Use Stokes' theorem to find the circulation of the vector field F around any smooth, simple closed curve C, where: (Sy 7sin() 5) Use Stokes' theorem to find the circulation of the vector...
Use Stokes' theorem to find the circulation of the vector field F around any smooth, simple closed curve C, where: (Sy 7sin() 5)
Use Stokes' theorem to find the circulation of the vector field F around any smooth, simple closed curve C, where: (Sy 7sin() 5)
Problem #8: Use Stokes' Theorem to evaluate F. dr where F = (x + 5z) i...
Problem #8: Use Stokes' Theorem to evaluate F. dr where F = (x + 5z) i + (6x + y)j + (9y – =) k and C is the curve of JC intersection of the plane x + 2y += = 8 with the coordinate planes. (Assume that C is oriented counterclockwise as viewed from above.) Problem #8:
10. Stokes' Theorem and Surfac e Integrals of Vector Fields a. Stokes' Theorem: F-dr= b. Let S be th ky-plane. Draw a sketch of curve C in the xy-plane. et be the surface of the paraboloi...
10. Stokes' Theorem and Surfac e Integrals of Vector Fields a. Stokes' Theorem: F-dr= b. Let S be th ky-plane. Draw a sketch of curve C in the xy-plane. et be the surface of the paraboloid z 4-x-y and Cis the trace of S in the c Let Fox.y.z) <2z, x, y>, Compute the curl (F) d. Find a parametrization of the surface S: G(u,v)- Compute N(u,v) F-dr Use Stokes' Theorem to compute , e.
10. Stokes' Theorem and Surfac...
10. Stokes' Theorem and Surface Integrals of Vector Fields a. Stokes' Theorem: F dr- b. Let S be the surface of the paraboloid z 4-x2-y2 and C is the trace of S in the xy-plane. Draw a sk...
10. Stokes' Theorem and Surface Integrals of Vector Fields a. Stokes' Theorem: F dr- b. Let S be the surface of the paraboloid z 4-x2-y2 and C is the trace of S in the xy-plane. Draw a sketch of curve C in the xy-plane. Let F(x,y,z) = <2z, x, y?». Compute the curl (F) c. d. Find a parametrization of the surface S: G(u,v)- Compute N(u,v) e. Use Stokes' Theorem to computec F dr
10. Stokes' Theorem and Surface Integrals...
Help Entering Answers 1 point) Verify that Stokes' Theorem is true for the vector field F that li...
Help Entering Answers 1 point) Verify that Stokes' Theorem is true for the vector field F that lies above the plane z1, oriented upwards. 2yzi 3yj +xk and the surface S the part of the paraboloid z 5-x2-y To verify Stokes' Theorem we will compute the expression on each side. First computecurl F dS curl F0,3+2y,-2 Edy dx curl F dS- where x2 = curl F ds- Now compute F.dr The boundary curve C of the surface S can be...
Help Entering Answers (1 point) Verify that Stokes' Theorem is true for the vector field F -yi+ z...
Verify that Stokes' Theorem is true for the vector field
Help Entering Answers (1 point) Verify that Stokes' Theorem is true for the vector field F -yi+ zj + xkand the surface S the hemisphere x2 + y2 + z2-25, y > 0oriented in the direction of the positive y- axis To verify Stokes' Theorem we will compute the expression on each side. First compute curl F dS curl F The surface S can be parametrized by S(s, t) -...
6.5. (Added at 7am on Thursday, March 7) Using Stokes' Theorem or Gauss' Theorem, evaluate: (a)...
6.5. (Added at 7am on Thursday, March 7) Using Stokes' Theorem or Gauss' Theorem, evaluate: (a) curl(F)-dS, where S is a closed smooth surface on and inside which F is defined and continuously differentiable; (b) . dr where C is a closed smooth curve and is continuously differentiable on a surface with boundary C
Use Stokes' Theorem to find SC F. dr where F(x,y,z) = (-y, x,x) and C is the curve of intersection of the plane y = 2 and the paraboloid y + x2 + z2 = 6. Show all work. Please select file(s) Select file(s)
calc hw- pls help!! (:
-/5 POINTS MY NOTES Use Stokes' theorem to evaluate | vxř. ñ ds where F = 9y?z, 6xz, 7x?y2 and S is the paraboloid z = x2 + y2 inside the cylinder x2 + y2 = 1, oriented upward. Submit Answer -/5 POINTS MY NOTES Use Stokes' theorem to compute the circulation F. dr where F = (6xyz, 3y-z, 2yz) and C is the boundary of the portion of the plane 2x + 3y +...
.
Problem #8: Use Stokes' Theorem to evaluate | F• dr where F = (x + 52)i + (6x + y)j + (7y - -)k and C is the curve of intersection of the plane x + 3y += = 12 with the coordinate planes. (Assume that C is oriented counterclockwise as viewed from above.) Problem #8: Just Save Submit Problem #8 for Grading Attempt #1 Attempt #2 Attempt #3 Attempt #4 Attempt #5 Problem #8 Your Answer: Your Mark:...
Use Stokes' theorem to find the circulation of the vector field F around any smooth, simple closed curve C, where: (Sy 7sin() 5)
Use Stokes' theorem to find the circulation of the vector field F around any smooth, simple closed curve C, where: (Sy 7sin() 5)
Problem #8: Use Stokes' Theorem to evaluate F. dr where F = (x + 5z) i + (6x + y)j + (9y – =) k and C is the curve of JC intersection of the plane x + 2y += = 8 with the coordinate planes. (Assume that C is oriented counterclockwise as viewed from above.) Problem #8:
10. Stokes' Theorem and Surfac e Integrals of Vector Fields a. Stokes' Theorem: F-dr= b. Let S be th ky-plane. Draw a sketch of curve C in the xy-plane. et be the surface of the paraboloid z 4-x-y and Cis the trace of S in the c Let Fox.y.z) <2z, x, y>, Compute the curl (F) d. Find a parametrization of the surface S: G(u,v)- Compute N(u,v) F-dr Use Stokes' Theorem to compute , e.
10. Stokes' Theorem and Surfac...
10. Stokes' Theorem and Surface Integrals of Vector Fields a. Stokes' Theorem: F dr- b. Let S be the surface of the paraboloid z 4-x2-y2 and C is the trace of S in the xy-plane. Draw a sketch of curve C in the xy-plane. Let F(x,y,z) = <2z, x, y?». Compute the curl (F) c. d. Find a parametrization of the surface S: G(u,v)- Compute N(u,v) e. Use Stokes' Theorem to computec F dr
10. Stokes' Theorem and Surface Integrals...
Help Entering Answers 1 point) Verify that Stokes' Theorem is true for the vector field F that lies above the plane z1, oriented upwards. 2yzi 3yj +xk and the surface S the part of the paraboloid z 5-x2-y To verify Stokes' Theorem we will compute the expression on each side. First computecurl F dS curl F0,3+2y,-2 Edy dx curl F dS- where x2 = curl F ds- Now compute F.dr The boundary curve C of the surface S can be...
Verify that Stokes' Theorem is true for the vector field
Help Entering Answers (1 point) Verify that Stokes' Theorem is true for the vector field F -yi+ zj + xkand the surface S the hemisphere x2 + y2 + z2-25, y > 0oriented in the direction of the positive y- axis To verify Stokes' Theorem we will compute the expression on each side. First compute curl F dS curl F The surface S can be parametrized by S(s, t) -...
6.5. (Added at 7am on Thursday, March 7) Using Stokes' Theorem or Gauss' Theorem, evaluate: (a) curl(F)-dS, where S is a closed smooth surface on and inside which F is defined and continuously differentiable; (b) . dr where C is a closed smooth curve and is continuously differentiable on a surface with boundary C
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