Using simple steps solution of Lagrange's PDE simple example 4

In this video explaining Lagrange's partial differential equation general solution. This very simple and method is very easy. Using simple integration formula. Quantum Mechanics: Lagrange's equations are used to derive the Schrödinger equation which is the fundamental equation that describes the behavior of quantum systems.

#lagrandesequation #partialdifferential

18MAT21 MODULE 1:Vector Calculus

18MAT21 MODULE 2:Differential Equation higher order

18MAT21 MODULE 3: Partial differential equations

18MAT21 MODULE 4: Infiinite series & Power series solution

18MAT21 MODULE 5: Numerical methods

18MAT11 Module1: Differential Calculus1

18MAT11 Module2: differential Calculus2

18MAT11 Module4: Ordinary differential equations

Linear Algebra: 18MAT11 MODULE 5

LAPLACE TRANSFORM : 18MAT31

Fourier Transforms Z-transform : 18MAT31 & 17MAT31

Fourier Series: 18MAT31 & 17MAT31

Calculus of Variation & Numerical Methods 18MAT31

Numerical Methods ODE's: 18MAT31 & 17MAT41

Joint Probability & Sampling Theory: 18MAT41 & 17MAT41

Probability Distributions: 18MAT41 & 17MAT41

Calculus of Complex Functions: 18MAT41 & 17MAT41

Curve fitting & Statistical Method 18MAT41 17MAT31