

Assignment 5: Problem 8 Previous Problem List Next (1 point) Let F = (7z+ 7x®) i...
(1 point) Let +4z + 4 sin (a) Find curl F. curl F- (b) What does your answer to part (a) tell you about JcF dr where C is the circle (x 30)2 + (y - 10)2 1 in the xy-plane, oriented clockwise? (e) If C is any closed curve, what can you say about fcFdr? (d) Now let C be the half circle (-30)2-cy-10)2-1 in the xy-plane with y 10, traversed from (31, 10) to (29, 10). Find F...
(1 point) Let F (72+72) i + (2y +62 + 6 sin(y*)) 3+ (2x + 6y + 2e=") R. (a) Find curl F. curl F = <0,0,0> (b) What does your answer to part (a) tell you about Sc F. dr where is the circle (2 – 30)2 + (y - 35)2 = 1 in the ty-plane, oriented clockwise? SF. dr = 0 (c) If C is any closed curve, what can you say about SF. dr? SoF dr =...
Let ?⃗ =(5z+5x^3)i+(6?+7?+7sin(?^3))j+(5?+7?+6?^(?3))k (a) Find curl ?⃗ curl ?⃗ = (b) What does your answer to part (a) tell you about ∫??⃗ ⋅??⃗ where C is the circle (?−25)^2+(?−30)^2=1 in the xy-plane, oriented clockwise? ∫??⃗ ⋅??⃗ =∫CF→⋅dr→= (c) If C is any closed curve, what can you say about ∫C ?⃗ ⋅??⃗ ? ∫C ?⃗ ⋅??⃗ = d. Now let ? be the half circle (?−25)^2+(?−30)^2=1 in the ??-plane with ?>30, traversed from (26,30) to (24,30). Find ∫C ?⃗ ⋅??⃗ by...
Ocा । Previous Problem Problem List Next Problem (1 point) Find the function satisfying the differential equation y' - 3y=9e6e and y(0) = -6. y = Preview My Answers Submit Answers You have attempted this problem 0 times. You have unlimited attempts remaining. WORP Page generated at 04/19/2020 at 07:47pm PDT 1996-2017 theme: math4 ww_version: We Work 2.13 g version PG-13 The W WebWork
(a) Find curl F curl F (b) What does your answer to part (a) tell you aboFwhere C is the circle (a 5)2(5) in the ry-plane, oriented clockwise? e) It C is any closed curve, what can you say about Jc F.r (d) Now let C be the half circle (5)2 5)2 in the zy-plane with y 5, traversed from (6,5) to (4,5). Find JF dr by using your result from (c) and considering C plus the line segment connecting...
Section 10.7: Problem 19 Previous Problem Problem List Next Problem (1 point) Find a parametrization, using cos(t) and sin(t), of the following curve The intersection of the plane y 6 with the sphere z2 +y2 + z2100 Preview My Answers Submit Answers You have attempted this problem 0 times. You have unlimited attempts remaining. Email instructor Page generated at 03/24/2019 at 11:56am MST WeBWorK 1996-20171 theme: math4 I ww version: WeBWork-2.13 l pg._version 2.121 The WeBWorK Project
Section 10.7: Problem...
MAA MATHEMATICAL ASSOCIATION OF AMERICA webwork /math 205_summer 1 2019/summer assignment 5/9 Summer Assignment 5: Problem 9 | Previous Problem List Next (1 point) Match each of the following with the correct statement A The series is absolutely convergent. C. The series converges, but is not absolutely convergent. D. The series diverges. n 1 3" 00 (n+ 2)! 2. 4" n! (-1)"7-1 Σ 3. (7)+1n n! n-1 Σ-ν. 4. 00 (-1) 3" n! 5. Note: in order to get credit...
Problem 6 Using Stokes' Theorem, we equate F dr curl F dA. Find curl F- PreviousS us Problem ListNext Noting that the surface is given by (1 point) Calculate the circulation, Fdr7in z - 16-x2 - y2, find two ways, directly and using Stokes' Theorem. dA The vector field F = 6y1-6y and C is the boundary of S, the part of the surface dy dx With R giving the region in the xy-plane enclosed by the surface, this gives...
(23 pts) Let F(x, y, z) = ?x + y, x + y, x2 + y2?, S be the top
hemisphere of the unit sphere oriented upward, and C the unit
circle in the xy-plane with positive orientation.
(a) Compute div(F) and curl(F).
(b) Is F conservative? Briefly explain.
(c) Use Stokes’ Theorem to compute ? F · dr by converting it to
a surface integral. (The integral is easy if C
you set it up correctly)
4. (23 pts)...
Homework 4-3: Problem 4 Previous Problem List Next (1 point) Find the general solution to y" + 4y' + 29y = 0. In your answer, use e, and to denote arbitrary constants and t the independent variable. Enter as c1 ando as c2. Preview My Answers Submit Answers You have attempted this problem 0 times You have unlimited attempts remaining Email instructor Page generated at 03/15/2020 at 09:28pm EDT 1998-2015 theme math 4 ww_version 2.10 pg_version 2.10The We Work Project...