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Suppose that is the path which starts at the point (2,0), then moves along the circle4 to the poi...
Suppose F⃗(x,y)=(x+6)i⃗+(5y+5)j⃗. Use the fundamental theorem of line integrals to calculate the following (a) The line integral of F⃗→ along the line segment C from the point P=(1,0) to the point Q=(...
Suppose F⃗(x,y)=(x+6)i⃗+(5y+5)j⃗. Use the fundamental theorem of line integrals to calculate the following (a) The line integral of F⃗→ along the line segment C from the point P=(1,0) to the point Q=(4,2). ∫CF⃗⋅dr⃗∫= (b) The line integral of F⃗→ along the triangle C from the origin to the point P=(1,0) to the point Q=(4,2) and back to the origin. ∫CF⃗⋅dr⃗∫=
5. Let F (y”, 2xy + €35, 3yes-). Find the curl V F. Is the vector...
5. Let F (y”, 2xy + €35, 3yes-). Find the curl V F. Is the vector field F conservative? If so, find a potential function, and use the Fundamental Theorem of Line Integrals (FTLI) to evaluate the vector line integral ScF. dr along any path from (0,0,0) to (1,1,1). 6. Compute the Curl x F = Q. - P, of the vector field F = (x4, xy), and use Green's theorem to evaluate the circulation (flow, work) $ex* dx +...
Recall that it is conservative, then the line intera/ F.dr is path-independent meaning that the the...
Recall that it is conservative, then the line intera/ F.dr is path-independent meaning that the the integral depends only on the initial and terminal bolets of the sath, and not on the path Similar ideas are true for surfaces, although we must now discuss the curl instead of the gradient. Note that there is some vector field A such that (V x A) = F. then Suo ' Theorem tells us that JP as - x A). S = 6...
Please explain in detail. Especially the parameterization as that is what I struggle with. (1 point)...
Please explain in detail. Especially the parameterization as
that is what I struggle with.
(1 point) Let F be the radial force field F(x, y) = xi+yj. Find the work done by this force along the following two curves, both which go from (0, 0) to (7, 49). (Use the Fundamental Theorem for Line Integrals instead of computing the line integral from the definition, as you did in the previous set. This way shows why the answers to the two...
31. For both parts of this problem, the curve C = C1 + C2 + Cg...
31. For both parts of this problem, the curve C = C1 + C2 + Cg consists of the three line segments Z 2 C:(0,0,0) + (0,1,0) C2: (0,1,0) + (0,1,2) C3: (0,1,2) + (3,1,2) X and F(x, y, z) = (7y - 22,7x + 2, -2x + y) 3 Note that F is conservative! 90 (a) Compute SF. dr one of the following ways: i. Parameterization of C ii. Fundamental Theorem of Line Integrals iii. Independence of Path Clearly...
MA330 Homework #4 1. This exercise concerns the function its gradient vector field F-vo See the p...
the excercise concerns the function (x^2 + y^2)* e^(1-x^2 -
y^2)
please do all parts
MA330 Homework #4 1. This exercise concerns the function its gradient vector field F-vo See the plots of each below. a) Compute the partial derivatives os and ty to find the gradient field vo. (b) In MA231, learned 1, you learned that mixed second-order partial derivatives of reasonable functions Verity that here by computing day and dys and checking that they are the same. should...
Interactive Exercises 2.14: Acceleration and Velocity Plots (Monster RC Truck) A radio-controlled (RC) truck moves along...
Interactive Exercises 2.14: Acceleration and Velocity Plots (Monster RC Truck) A radio-controlled (RC) truck moves along an x axis with an acceleration that depends on time in a manner shown in the graph in Interactive Fig. 2.14.1 below. At the instant0 the velocity of the truck is -1 m/s and its position is at the origin a (m/s) 0, 1 (s) 10 Interactive Figure 2.14.1: The acceleration versus time plot for an RC truck that moves on an axis. ▼...
2. Consider the vector field F = (yz - eyiz sinx)i + (x2 + eyiz cosz)j...
2. Consider the vector field F = (yz - eyiz sinx)i + (x2 + eyiz cosz)j + (cy + eylz cos.) k. (a) Show that F is a gradient vector field by finding a function o such that F = Vº. (b) Show that F is conservative by showing for any loop C, which is a(t) for te (a, b) satisfying a(a) = a(6), ff.dr = $. 14. dr = 0. Hint: the explicit o from (a) is not needed....
QUESTION 1: Why must project manager should have good technical skills but also good management skills?...
QUESTION 1: Why must project manager should have good technical skills but also good management skills? QUESTION 2: **Communication and Communicator are related" This quote from the text suppose that the communication process is lead by the spokeperson. Do you think is it a gift" to be a good communicator or a skill to improve ( use example of your knowledge to answer)? QUESTION 3: Look at the text paragraph yellow highlighted, and do you think that in today's world...
5. Let F (y”, 2xy + €35, 3yes-). Find the curl V F. Is the vector field F conservative? If so, find a potential function, and use the Fundamental Theorem of Line Integrals (FTLI) to evaluate the vector line integral ScF. dr along any path from (0,0,0) to (1,1,1). 6. Compute the Curl x F = Q. - P, of the vector field F = (x4, xy), and use Green's theorem to evaluate the circulation (flow, work) $ex* dx +...
Recall that it is conservative, then the line intera/ F.dr is path-independent meaning that the the integral depends only on the initial and terminal bolets of the sath, and not on the path Similar ideas are true for surfaces, although we must now discuss the curl instead of the gradient. Note that there is some vector field A such that (V x A) = F. then Suo ' Theorem tells us that JP as - x A). S = 6...
Please explain in detail. Especially the parameterization as
that is what I struggle with.
(1 point) Let F be the radial force field F(x, y) = xi+yj. Find the work done by this force along the following two curves, both which go from (0, 0) to (7, 49). (Use the Fundamental Theorem for Line Integrals instead of computing the line integral from the definition, as you did in the previous set. This way shows why the answers to the two...
31. For both parts of this problem, the curve C = C1 + C2 + Cg consists of the three line segments Z 2 C:(0,0,0) + (0,1,0) C2: (0,1,0) + (0,1,2) C3: (0,1,2) + (3,1,2) X and F(x, y, z) = (7y - 22,7x + 2, -2x + y) 3 Note that F is conservative! 90 (a) Compute SF. dr one of the following ways: i. Parameterization of C ii. Fundamental Theorem of Line Integrals iii. Independence of Path Clearly...
the excercise concerns the function (x^2 + y^2)* e^(1-x^2 -
y^2)
please do all parts
MA330 Homework #4 1. This exercise concerns the function its gradient vector field F-vo See the plots of each below. a) Compute the partial derivatives os and ty to find the gradient field vo. (b) In MA231, learned 1, you learned that mixed second-order partial derivatives of reasonable functions Verity that here by computing day and dys and checking that they are the same. should...
Interactive Exercises 2.14: Acceleration and Velocity Plots (Monster RC Truck) A radio-controlled (RC) truck moves along an x axis with an acceleration that depends on time in a manner shown in the graph in Interactive Fig. 2.14.1 below. At the instant0 the velocity of the truck is -1 m/s and its position is at the origin a (m/s) 0, 1 (s) 10 Interactive Figure 2.14.1: The acceleration versus time plot for an RC truck that moves on an axis. ▼...
2. Consider the vector field F = (yz - eyiz sinx)i + (x2 + eyiz cosz)j + (cy + eylz cos.) k. (a) Show that F is a gradient vector field by finding a function o such that F = Vº. (b) Show that F is conservative by showing for any loop C, which is a(t) for te (a, b) satisfying a(a) = a(6), ff.dr = $. 14. dr = 0. Hint: the explicit o from (a) is not needed....
QUESTION 1: Why must project manager should have good technical skills but also good management skills? QUESTION 2: **Communication and Communicator are related" This quote from the text suppose that the communication process is lead by the spokeperson. Do you think is it a gift" to be a good communicator or a skill to improve ( use example of your knowledge to answer)? QUESTION 3: Look at the text paragraph yellow highlighted, and do you think that in today's world...
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