In this video explaining second problem of second order differential equation Runge kutta numerical method. Using initial conditions solve the problem. Modeling physical systems: Runge-Kutta methods are commonly used to model physical systems that are governed by ODEs such as the motion of objects under the influence of gravity or the behavior of electrical circuits.
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LAPLACE TRANSFORM : 18MAT31
• LAPLACE TRANSFORM
Fourier Transforms,Z-transform : 18MAT31 & 17MAT31
• Fourier Transforms,Z-t...
Fourier Series: 18MAT31 & 17MAT31
• Fourier Series: 21MAT3...
Calculus of Variation & Numerical Methods 18MAT31
• Numerical Solution of ...
Numerical Methods ODE's: 18MAT31 & 17MAT41
• Numerical Solution of ...
COMPLEX NUMBER: 18MATDIP31
• COMPLEX NUMBER: 18MATD...
Differential Calculus:18MATDIP31
• Differential Calculus:...
Ordinary differential equation 18MATDIP31 & 17MATDIP31
• Ordinary differential ...
Integral Calculus 18MATDIP31 & 17MATDIP31
• Integral Calculus 18MA...
Vector differentiation 18MATDIP31 & 17MATDIP31
• Vector differentiation...
Differential Calculus & Partial Differential 18MATDIP31 & 17MATDIP31
• Differential Calculus ...
Joint Probability & Sampling Theory: 18MAT41 & 17MAT41
• Joint Probability & Sa...
Probability Distributions: 18MAT41 & 17MAT41
• Probability Distributions
Calculus of Complex Functions: 18MAT41 & 17MAT41
• Complex Analysis & Com...
Curve fitting & Statistical Method 18MAT41 17MAT31
• Statistical Method & ...
18MATDIP41 Linear Algebra
• 18MATDIP41 Linear Algebra
18MATDIP41 Numerical Methods
• 18MATDIP41 Numerical M...
18MATDIP41 Higher order ODEs
• 18MATDIP41 Higher orde...
18MATDIP41 Partial Differential Equations
• 18MATDIP41 Partial Dif...
15 сен 2024