Evaluate the circulation of ?⃗ =???⃗ +??⃗ +6??⃗ around a square of side 8, centered at...

Use the surface integral in​ Stokes' Theorem to calculate the circulation of the field F=x2i+5xj+z2k around...

Use the surface integral in​ Stokes' Theorem to calculate the circulation of the field F=x2i+5xj+z2k around the curve​ C: the ellipse 25 x squared plus 4 y squared equals 25x2+4y2=2 in the​ xy-plane, counterclockwise when viewed from above.

A single-turn square loop of side L is centered on the axis of a long solenoid....

A single-turn square loop of side L is centered on the axis of a long solenoid. In addition, the plane of the square loop is perpendicular to the axis of the solenoid. The solenoid has 1210 turns per meter and a diameter of 6.25 cm , and carries a current of 3.00 A . Find the magnetic flux through the Loop when L= a)2.70 b)6.25 c)14.0

PUSHING A BOX A square of side length 20 cm sits in quadrant I of the...

PUSHING A BOX A square of side length 20 cm sits in quadrant I of the x-y plane with one vertex at the origin and one side along the x-axis. A force  = 5.8 N x̂ + -1 N  is applied at the point  = 5 cm x̂ + 11 cm . (a) What is the torque on the box around the corner at the origin? ANSWER: -0.688 N*m ẑ (b) What is the torque on the box around the center of mass?

A single-turn square loop of side L is centered on the axis of a long solenoid....

A single-turn square loop of side L is centered on the axis of a long solenoid. In addition, the plane of the square loop is perpendicular to the axis of the solenoid. The solenoid has 1200 turns per meter and a diameter of 5.60 cm , and carries a current of 2.15 A . Part A: Find the magnetic flux through the loop when L = 2.25 cm. Φ1 = ____________ Wb Part B: Find the magnetic flux through the...

A circular loop of radius R1 lies in the x − y plane, centered on the...

A circular loop of radius R1 lies in the x − y plane, centered on the origin, and has a current i running through it clockwise when viewed from the positive z direction. A second loop with radius R2 sits above the first, centered on the positive z axis and parallel to the first. 1. If the second loop is centered at the point z = R1, what must the current be (direction and magnitude) in order for the net...

Use Stokes" Theorem to evaluate (F-dr where F(x, y, z)=(-y , x-z , 0) and the...

Use Stokes" Theorem to evaluate (F-dr where F(x, y, z)=(-y , x-z , 0) and the surface S is the part of the paraboloid : z = 4- x^2 - y^2 that lies above the xy-plane. Assume C is oriented counterclockwise when viewed from above.

Calculate the line integral I C <y,z,x> where C is the curve of intersection of the...

Calculate the line integral I C <y,z,x> where C is the curve of intersection of the sphere given by equation (x − 1)^2 + (y − 1)^2 + z^ 2 = 4 and the plane given by equation x = 1 oriented counterclockwise when viewed from the positive x-axis.

Use Stokes' Theorem to evaluate C F · dr where C is oriented counterclockwise as viewed...

Use Stokes' Theorem to evaluate C F · dr where C is oriented counterclockwise as viewed from above. F(x, y, z) = 5yi + xzj + (x + y)k, C is the curve of intersection of the plane z = y + 7 and the cylinder x2 + y2 = 1.

A square loop of wire, of side length 9.5 m, is placed on the edge of...

A square loop of wire, of side length 9.5 m, is placed on the edge of a magnetic field of strength 3 T into the page. This field can be described as a section of the Cartesian plane with x<0 (everywhere x is negative) and the loop is oriented so that it is in this plane with its right edge at x=0 (it starts entirely within the magnetic field). The wire loop is then pulled in the +x direction (out...

Evaluate∫ C F ⋅ d r , where F(x,y,z)={e^−4x,e^2x,1e^z} and C is the boundary of the...

Evaluate∫ C F ⋅ d r , where F(x,y,z)={e^−4x,e^2x,1e^z} and C is the boundary of the part of the plane 3x+7y+5z=3 lying in the first octant, traversed counterclockwise as viewed from above. HINT: Use Stokes' Theorem.