The Lagrangian and Hamiltonian for series RLC circuit has been formulated. We use the analogical concept of classical mechanics with electrical quantity. The analogy is as follow mass, position, spring constant, velocity, and damping constant corresponding with inductance, charge, the reciprocal of capacitance, electric current, and resistance respectively. We find the Lagrangian for the LC, RL, RC, and RLC circuit by using the analogy and find the kinetic
and potential energy. First, we formulate the Lagrangian of the system. Second, we construct the Hamiltonian of the system by using the Legendre transformation of the Lagrangian. The results indicate that the Hamiltonian is the total energy of the system which means the equation of constraints is time independent. In addition, the Hamiltonian of overdamping and critical damping oscillation is distinguished by a certain factor.

G. R. Fowles and G. L. Cassiday, Analytical Mechanics, Thomson Learning, Belmont, 7th Edition, 2005.

R. A. Serway and J. W. Jewett, PHYSICS for Scientists and Engineers with Modern Physics, Thomson Learning, Belmont, 7th Edition, 2008.

M. L. Boas, Mathematical Methods in the Physical Sciences, John Wiley & Sons, New Jersey, 3rd Edition, 2006.

F. A. Buot, "Mesoscopic physics and nanoelectronics?: nanoscience and nanotechnology", em Physics Report, 234 (2-3), 73-174, 1993.

C. A. U. Daz, "Discrete-charge quantum circuits and electrical resistance", em Physics Letters A, 372 (30), 5059-5063, 2008.

I. A. Pedrosa and A. P. Pinheiro, "Quantum description of a mesoscopic RLC circuit", Progress of Theoretical Physics, 125 (6), 1133-1141, 2011.

J. R. Choi, "Quantization of underdamped, critically damped, and overdamped electric circuits with a power source", International Journal of Theoretical Physics, 41 (10), 1931-1939, 2002.

A. H. Panuluh and A. Damanik, "Lagrangian for RLC circuits using analogy with the classical mechanics concepts", Journal of Physics: Conference Series, 909, 012005, 2017.

H. Essen, "From least action in electrodynamics to magnetomechanical energy-a review", {em European Journal of Physics, 30 (3), 515-539, 2009.

A. P. Arya, Introduction to Classical Mechanics, Prentice-Hall, New Jersey, 2nd Edition, 1998.