A particle is moved from (0, 0) to (a, a) under a force a `F=(3hat(i)+4hat(j))` from two paths. Path 1 is OP and path 2 is OPQ. Let `W_(1)` and `W_(2)` be the work done by this force in these two paths. Then,

A particle is moved from (0, 0) to (a, a) under a force F =(x^(2)hati+y^(3)hatj) from two paths. Path 1 si OP and Path 2 is OQP . Let W_(1) and W_(2) be the work done by this force in these two paths. Then

A given mass of a gas expands from the state A to the state B by three paths 1,2 and 3 as shown in the figure, If W_(1),W_(2) and W_(3) respectively be the work done by the gas along the three paths then

A particle of mass m moves from A to C under the action of force vecF = 2xyhati + y^2 hatj , along different paths as shown in figure.

A given mass of gas expands from state A to state B by three paths 1, 2, and 3 as shown in the figure : If w_(1),w_(2)and w_(3) respectively, be the work done by the gas along three paths, then

An object is moving along a straight line path from P to Q under the action of a force vec(F)=(4 hati-3hatj+hat2k)N . If the co-ordinate of P and Q in meters are (3,2,-1) and (2,-1,4) respectively. Then the work done by the force is

A given mass of gas expands from state A to state B by three paths 1,2 , and 3 as shown in the figure below. If w_(1),w_(2) and w_(3) , respectively, be the work done by the gas along three paths, then

A given mass of gas expands from state A to state b by three paths 1,2 , and 3 as shown in the figure below. If w_(1),w_(2) and w_(3) , respectively, be the work done by the gas along three paths, then

A givne mass of a gas expands from a state A to the state B by three paths 1, 2 and 3 as shown in T-V indicator diagram. If W_(1),W_(2) and W_(3) respectively be the work done by the gas along the three paths, then

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 particle moves from position 3hat(i)+2hat(j)-6hat(k) to 14hat(i)+13hat(j)+9hat(k) due to a uniform force of 4hat(i)+hat(j)+3hat(k)N . If the displacement is in meters, then find the work done by the force.