Find out the electric flux through an area `10 m^(2)` lying in XY plane due to a electric field `vec(E)=2hat(i)-10 hat(j)+5hat(k)`.

Electric flux through a surface of area 100m^2 lying in the xy plane is (in V-m) if vec E= hat i+ sqrt 2hat j + sqrt 3 hat k- .

Electric flux through a surface of area 100 m^(2) lying in the plane in the xy plane is (in V-m) if E=hat(i)sqrt(2)hat(j)+sqrt(3)hat(k) :

Find the potential difference between points A and B in an electric field vec(E ) = (2hat(i) + 3hat(j) + 4hat(k)) NC^(-1) where vec(r_(A)) = (hat(i) -2hat(j) + hat(k))m and vec(r_(B)) = (2hat(i) + hat(j) - 2hat(k))m

A surface element vec(ds) = 5 hat(i) is placed in an electric field vec(E) = 4 hat(i) + 4 hat(j) + 4 hat(k) . What is the electric flux emanting from the surface ?

Find the area of the parallelogram whose adjacent sides are represented by the vectors (i) vec(a)=hat(i) + 2 hat(j)+ 3 hat(k) and vec(b)=-3 hat(i)- 2 hat(j) + hat(k) (ii) vec(a)=(3 hat(i)+hat(j) + 4 hat(k)) and vec(b)= ( hat(i)- hat(j) + hat(k)) (iii) vec(a) = 2 hat(i)+ hat(j) +3 hat(k) and vec(b)= hat(i)-hat(j) (iv) vec(b)= 2 hat(i) and vec(b) = 3 hat(j).

An electric field is given by (6 hat i 5 hat j 3 hat k) N/C. The electric flux through a surface area 30 hat i m^2 lying in YZ-plane (in SI unit) is :

The electric field in a region of space is given by E = (5 hat(i) + 2hat(j))N//C . The electric flux due to this field through an area 2m^(2) lying in the YZ plane, in S.I. unit is :-

If the electric field is given by vec(E) = 8 hat(i) + 4 hat(j) + 3 hat(k) NC^(-1) , calculate the electric flux through a surface of area 100 m^(2) lying in X-Y plane.