prove that E(ax+b)=aE(x)+b where a and b are constants

What is potential gradient? The electric potential is found to depend on X only and is given by V(x) = ax - bx^2 , where a and b are constants. Find the positions on the X - axis where electric field intensity is zero.

The electric potential V(x) in an electric field depends only on x and V(x) = ax - bx^(3) where a and b are constants. Where on the x-axis will electric field intensity be zero?

answer any one question : (ii) if X and Y are two independent variables , then rove that var(aX+bY ) =a^2 var (X) +b^2 var (Y) , where a and b are constants

If X and Y are two independent variables, then prove that var(aX+bY)=a^2var(X)+b^2var(Y) , where a and b are constants.

If (x+y) prop (x-y) , then prove that (ax +by) prop (px+qy) where a ,b ,p, q are non -zero variation constant.

Find the differential equation representing the family of curves y= ae^(bx+5) where a and b are arbitrary constants.

The differential equation of the family of curves y=e^(2x)(acosx+bsinx) , where a and b are arbitrary constants, is given by

Find the differential equation of y = Ax + (B)/(x) , where A and B are arbitrary constants .