Find the work done by the inverse-square force field
in moving a particle from (1,0,0) to (0,3,4).
Integrate first along the line segment from (1,0,0) to (5,0,0) and then along a path on the sphere with equation x2+y2+z2= 25.
Why is the second integral automatically zero?
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Find the work done by the inverse-square force field in moving a particle from (1,0,0) to (0,3,4). Integrate first along the line segment from (1,0,0) to (5,0,0) and then along a path on the sphere w...
Find the work done by the force field F on a particle moving along the given...
Find the work done by the force field F on a particle moving along the given path. F(x, y) = xi + 4yj C: x = t, y = 13 from (0, 0) to (2,8)
Find the work done by the force field F= (y2/2, Z, x) in moving a particle...
Find the work done by the force field F= (y2/2, Z, x) in moving a particle along the curve C, where C is the intersection curve of the plane x +z = 1 and the ellipsoid x2 + 2y2 + x2 = 1 oriented counterclockwise when viewed from positive z— axis.
13. Find the work done by the force field F on an object moving along the specified path. The specified path: Counterclockwise along the semicircle y=V4-n- from (2,0) (-2,0) to 13. Find the w...
13. Find the work done by the force field F on an object moving along the specified path. The specified path: Counterclockwise along the semicircle y=V4-n- from (2,0) (-2,0) to
13. Find the work done by the force field F on an object moving along the specified path. The specified path: Counterclockwise along the semicircle y=V4-n- from (2,0) (-2,0) to
2. A) Calculate the work done by the field } = (x² - y2,-2xy) when moving...
2. A) Calculate the work done by the field } = (x² - y2,-2xy) when moving an object from the origin to the point (1, 2) along the path C: x = t?, y = 2t. B) Use a Theorem from 16.3 to determine whether or not F = (x2 - y2,-2xy) is a conservative vector field. C) Deduce the work done by the field } = (x2 - y2,-2xy) moving an object from the point (1, 2) to the...
Find the work done by the force field F on a particle that moves along the...
Find the work done by the force field F on a particle that moves along the curve C. F(x,y)=xy i+x^2 j C: x=y2 from (0,0) to (4,2) Enter the exact answer as an improper fraction, if necessary. W=
F(x, y, z)-(y-re)it(cos(2y2)-x)/ 1s the force field acting on a particle moving around the rectangular path from A(0.1)...
F(x, y, z)-(y-re)it(cos(2y2)-x)/ 1s the force field acting on a particle moving around the rectangular path from A(0.1) to B(0,3) depicted in Figure 1 Figure 1. Rectangular path of the particle. Compute the work done by the force in this field; Using line integral (if the integral is difficult to evaluate, then use Matlab) b. Also using Green's Theorem without computer aid. Compare your results. a.
F(x, y, z)-(y-re)it(cos(2y2)-x)/ 1s the force field acting on a particle moving around the...
(1) Integrate f(x, y,z)+Vy - z2 over the straight line segment path from (0,0,0) to (1,1,1) (2) Consider the field F (2xyz+2,x2z, x2y), (a) (b) (c) Show that the field is conservative. Find a pot...
(1) Integrate f(x, y,z)+Vy - z2 over the straight line segment path from (0,0,0) to (1,1,1) (2) Consider the field F (2xyz+2,x2z, x2y), (a) (b) (c) Show that the field is conservative. Find a potential function for the field. Find the work the field does on an object that follows the path consisting of the line segment from (0,0,0) to (1,2,2), followed by the line segment from (1,2,2) to (2,4,3) Find the work done by the field ß-(x, 3y,-5z) along...
3. Find the work done in moving an object from P(1,0,0) to Q(1,0,1) in the presence...
3. Find the work done in moving an object from P(1,0,0) to Q(1,0,1) in the presence of the force F=(x+3y, y +x, ze) along the following paths. Is the work independent of the path? The helix r(t) b. (cos t, sin t, t/2T) ,0 t< 2T
force field: find the work done by F in moving object from (0,1) to (1,2) along the path from x=0 to x=1 We were una...
force field: find the work done by F in moving object from (0,1) to (1,2) along the path from x=0 to x=1 We were unable to transcribe this imagey = 1 + sin(π·r/2)
3. Calculate the work done by a particle moving from 0 to B, following the path...
3. Calculate the work done by a particle moving from 0 to B, following the path described below. The force acting on the particle is F = x i+yj. y B x 1: parabola, y = x2, II: straight line, y = -3x+27 2
Find the work done by the force field F on a particle moving along the given path. F(x, y) = xi + 4yj C: x = t, y = 13 from (0, 0) to (2,8)
Find the work done by the force field F= (y2/2, Z, x) in moving a particle along the curve C, where C is the intersection curve of the plane x +z = 1 and the ellipsoid x2 + 2y2 + x2 = 1 oriented counterclockwise when viewed from positive z— axis.
13. Find the work done by the force field F on an object moving along the specified path. The specified path: Counterclockwise along the semicircle y=V4-n- from (2,0) (-2,0) to
13. Find the work done by the force field F on an object moving along the specified path. The specified path: Counterclockwise along the semicircle y=V4-n- from (2,0) (-2,0) to
2. A) Calculate the work done by the field } = (x² - y2,-2xy) when moving an object from the origin to the point (1, 2) along the path C: x = t?, y = 2t. B) Use a Theorem from 16.3 to determine whether or not F = (x2 - y2,-2xy) is a conservative vector field. C) Deduce the work done by the field } = (x2 - y2,-2xy) moving an object from the point (1, 2) to the...
F(x, y, z)-(y-re)it(cos(2y2)-x)/ 1s the force field acting on a particle moving around the rectangular path from A(0.1) to B(0,3) depicted in Figure 1 Figure 1. Rectangular path of the particle. Compute the work done by the force in this field; Using line integral (if the integral is difficult to evaluate, then use Matlab) b. Also using Green's Theorem without computer aid. Compare your results. a.
F(x, y, z)-(y-re)it(cos(2y2)-x)/ 1s the force field acting on a particle moving around the...
(1) Integrate f(x, y,z)+Vy - z2 over the straight line segment path from (0,0,0) to (1,1,1) (2) Consider the field F (2xyz+2,x2z, x2y), (a) (b) (c) Show that the field is conservative. Find a potential function for the field. Find the work the field does on an object that follows the path consisting of the line segment from (0,0,0) to (1,2,2), followed by the line segment from (1,2,2) to (2,4,3) Find the work done by the field ß-(x, 3y,-5z) along...
3. Find the work done in moving an object from P(1,0,0) to Q(1,0,1) in the presence of the force F=(x+3y, y +x, ze) along the following paths. Is the work independent of the path? The helix r(t) b. (cos t, sin t, t/2T) ,0 t< 2T
3. Calculate the work done by a particle moving from 0 to B, following the path described below. The force acting on the particle is F = x i+yj. y B x 1: parabola, y = x2, II: straight line, y = -3x+27 2
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