Boundary Conditions for Asymmetric Cylindrical cable: Original Problem: An infinitely long, thin, conducting circular tube of radius b is split in two halves. The upper half is kept at a potential V=VO and the lower half at a V=-Vo. Determine the potential distribution both inside and outside the tube. New Problem: Resolve the above problem assuming the top half as voltage Vo while the bottom half has 0 voltage and not -VO. Write down an equation for the voltage for this asymmetric case. Hints and notes: - A plot of the voltage vs the angle phi in both cases and comparing might be helpful - The total grade is 10 points. You will be graded based on the correctness of the final equation. Partial credit, if any, will be given based on the steps you took to modify the equation and not on the steps you took to solve the boundary conditions. No need to write down any steps for resolving the boundary conditions.