The work done by the force `= vec F = A (x^(2) hati + 2 x^(2) hatj)`, where A is a constant and x and y are in meters around the path shown is.

The work done by the force vec(F)=A(y^(2) hati+2x^(2)hatj) , where A is a constant and x & y are in meters around the path shown is :

A particle moves in x-y plane from (0,0) to (a,a) and is acted upon by a force vecF=k(y^(2)hati+x^(2)hatj)N , where k is a constant and x and y are coordinates in meter. Find work done by this force, if the particle moves along Two straight lines first from (0,0) to (a,0) and then from (a,0) to (a,a)

The work done by the forces vecF = 2hati - hatj -hatk in moving an object along the vectors 3hati + 2hatj - 5hatk is:

The electric field strength depends only on the x and y coordinates according to the law E = (a(xhati+ y hatj))/(x^(2) + y^(2)) , where a is a constant hati and hatj are unit vectors of the x and y axes . Find the potential difference between x = 1 and x = 5 :

A force F=-k(^hati + x^hatj) (where k is a positive constant) acts on a particle moving in the x-y plane. Starting from the origin, the particle is taken along the positive x-axis to the point (a,0) and then parallel to the y-axis to the point (a,a) . The total work done by the force F on the particle is (a) -2ka^(2) , (b) 2ka^(2) , (c) -ka^(2) , (d) ka^(2)

The work done by a force vec(F)=(-6x^(3)hat(i)) N in displacing a particle from x = 4m to x = - 2m is

The work done by an applied variable force F=x+x^(3) from x = 0 m to x = 2m, where x is displacement, is

What is the work done when a force vec F =2hati +3hatj-5hatk units acts on a body, producing a displacement vec S =2hati+4hatj+3hatk units ?

A force F = -K(y hatI + x hatj) (where K is a posive constant ) acts on a particle moving in the xy plane . Starting form the original , the partical is taken along in the positive x axis to the point (x,0) and then partical to they axis the point (x,0) . The total work done by the force F on the particls is