A particle moves along `y=sqrt(1-x^ (2))` between the points (0, -1) m and (0, 1) m under the influence of a force `vec(F)=(y^(2)hat(i)+x^(2)hat(j))N`. Then,

If vec(E)=2x^(2) hat(i)-3y^(2) hat(j) , then V (x, y, z)

If vec(E)=2y hat(i)+2x hat(j) , then find V (x, y, z)

A particle of mass 2 kg moves in the xy plane under the action of a constant force vec(F) where vec(F)=hat(i)-hat(j) . Initially the velocity of the particle is 2hat(j) . The velocity of the particle at time t is

A particle is moved in x-y plane form (a,0) to (0,a) along circular arc having centre at origin. Work done by a force (-ky)/((x^(2)+y^(2))^(3/2))hat(i)+(kx)/((x^(2)+y^(2))^(3/2))hat(j) on the particle during this motion will be

A particle is moving with a constant acceleration vec(a) = hat(i) - 2 hat(j) m//s^(2) and instantaneous velocity vec(v) = hat(i) + 2 hat(j) + 2 hat(k) m//s then rate of change of speed of particle 1 second after this instant will be :

A particle is acted upon by only a conservative force F=(7hat(i)-6hat(j)) N (no other force is acting on the particle). Under the influence of this force particle moves from (0, 0) to (-3m, 4m) then

A body constrained to move along the z-axis of a co-ordinate system, is subjected to a constant force vec(F) given by vec(F)=-hat(i)+2hat(j)+3hat(k) Newton where hat(i),hat(j) and hat(k) represent unit vectors along x-,y-,and z-axes of the system, respectively. Calculate the work done by this force in displacing the body through a distance of 4m along the z-axis.

A particle moves in XY plane such that its position, velocity and acceleration are given by vec(r)=xhat(i)+yhat(j), " "vec(v)=v_(x)hat(i)+v_(y)hat(j), " "vec(a)=a_(x)hat(i)+a_(y)hat(j) Which of the following condition is correct if the particle is speeding down? A. xv_(x)+yv_(y) lt 0 B. xv_(x)+yv_(y) gt 0 C. a_(x)v_(x)+a_(y)v_(y) lt 0 D. a_(x)v_(x)+a_(y)v_(y) gt 0

A particle is moving with speed 6m//s along the direction of vec(A)=2hat(i)+2hat(j)-hat(k) , then its velocity is :

A particle of mass 5 kg moving in the x-y plane has its potential energy given by U=(-7x+24y)J where x and y are in meter. The particle is initially at origin and has a velocity vec(i)=(14 hat(i) + 4.2 hat (j))m//s