An electric field `vec E=(25hat i+30hat j)NC^(-1)` exists in a region of space.If the potential at the origin is taken to be zero then the potential at x=2m y=2m is : (A) -110V (B) -140V (D) -120V -130V

An electric field vec E=(25hat i+30hat j)NC^(-1) exists in a region of space.If the potential at the origin is taken to be zero then the potential at x =2 m y =2 m is :?

An electric field vecE = vec(i20 + vecj30 ) NC^(-1) exists in the space. If the potential at the origin is taken to be zero find the potential at (2m, 2m).

An electric field vec(E)=(10 hat(i) + 20 hat(j)) N//C exists in the space. If the potential at the origin is taken to be zero, find the potential at (3m, 3m).

An electric field vec E=20y hat j exist in space . The potential at (5 m, 5 m) is taken to be zero. The potential at origin is

An electric field vec(E)=B x hat(i) exists in space, where B = 20 V//m^(2) . Taking the potential at (2m, 4m) to be zero, find the potential at the origin.

An electric field vecE = vec I Ax exists in the space, where A= 10 V m ^(-2). Take the potential at (10m, 20m ) to be zero. Find the potential at the origin.

An electric field vec(E ) = hat(i) Cx exists in the space, where C = 10 V/ m^(2) . Taking the potential at (10 m, 20 m ) to be zero, find the potential at the origin.

Assume that an electric field vecE=30x^2hatj exists in space. Then the potential difference V_A-V_O , where V_O is the potential at the origin and V_A the potential at x=2m is:

If uniform electric field vec E = E_ 0 hati + 2 E _ 0 hatj , where E _ 0 is a constant exists in a region of space and at (0,0) the electric potential V is zero, then the potential at ( x _ 0 , 2x _ 0 ) will be -