" A uniform electric field "bar(E)-E_(x)i+E_(y)j" exists.If the points "(1,0)" and "(-1,4)" are equipotential,"(E_(x))/(E_(y))" is equal to "-

If y = (e^(x)+1)/(e^(x)-1), " then" (y^(2))/2 + (dy)/(dx) is equal to

The potential field of an electric field vec(E)=(y hat(i)+x hat(j)) is

If y=e^(1+log_(e)x) , then the value of (dy)/(dx) is equal to

A uniform electric field exists in the region given by vec E=E_(o)hat i+E_(o)hat j . There are four points A(-a, 0) , B(0, a) , C(0 ,-a) and D(a ,0) lying in the x -y plane.Which of the following is the correct relation for the electric potential?

Let V_(0) be the potential at the origin in an electric field vecE=E_(x)hati+E_(y)hatj . The potential at the point (x,y) is

A cube of side a is placed in a uniform electric field E = E_(0) hat(i) + E_(0) hat(j) + E_(0) k . Total electric flux passing through the cube would be

Let there be a uniform electric field "E" existing along the positive X-direction.Assume electric potential to be zero at the origin.Potential at the point x=x_(0) is

A uniform electric field exists in the region given by vec E=E_(o)hat i+E_(o)hat j . There are four points A(-a, 0), B(0, a), C(0 ,-a) and D(a ,0) lying in the x -y plane . Which of the following is the correct relation for the electric potential?

A uniform electric field exists in the region given by vec E=E_(o)hat i+E_(o)hat j . There are four points A(-a, 0) B(0, a) C(0 ,-a) and D(a, 0) lying in the x -y plane.Which of the following is the correct relation for the electric potential? )