Solved Example Problems | Ordinary Differential Equations
Subject and UNIT: Probability and complex function: Unit V: Ordinary Differential Equations
Probability and complex function: Unit V: Differential equations : Case (a): Straight case Case (b): Sum case (c) : Modified Case : Example
Ordinary Differential Equations
Subject and UNIT: Probability and complex function: Unit V: Ordinary Differential Equations
In the given equation f (D) y = X, to find the P.I, we assume a trial solution containing unknown constants which are determined by substitution in the equation.
Problems with Answer | Ordinary Differential Equations
Subject and UNIT: Probability and complex function: Unit V: Ordinary Differential Equations
Probability and complex function: Unit V: Differential equations : Exercise 5.4
Solved Example Problems
Subject and UNIT: Probability and complex function: Unit V: Ordinary Differential Equations
Probability and complex function: Unit V: Differential equations : Problems based on system of simultaneous linear differential equations with constant co-efficients. : Type I, Type II , Type III.
Subject and UNIT: Probability and complex function: Unit V: Ordinary Differential Equations
Linear differential equations in which there are two or more dependent variables and a single independent variable. Such equations are known as simultaneous linear equations.
Problems with Answer | Ordinary Differential Equations
Subject and UNIT: Probability and complex function: Unit V: Ordinary Differential Equations
Probability and complex function: Unit V: Differential equations : Exercise 5.3. (b)
Problems with Answer | Ordinary Differential Equations
Subject and UNIT: Probability and complex function: Unit V: Ordinary Differential Equations
Probability and complex function: Unit V: Differential equations : Exercise 5.3. (a)
Solved Example Problems | Ordinary Differential Equations
Subject and UNIT: Probability and complex function: Unit V: Ordinary Differential Equations
where k's are constants and Q is a function of x is called Legendre's linear differential equations. Such equations can be reduced to linear equations with constant coefficients by putting
Solved Example Problems | Ordinary Differential Equations
Subject and UNIT: Probability and complex function: Unit V: Ordinary Differential Equations
Probability and complex function: Unit V: Differential equations : Example
Ordinary Differential Equations
Subject and UNIT: Probability and complex function: Unit V: Ordinary Differential Equations
The general form of "linear equation of second order" is given by d2y/dx2 + P dy/dx + Qy = R
Problems with Answer | Ordinary Differential Equations
Subject and UNIT: Probability and complex function: Unit V: Ordinary Differential Equations
Probability and complex function: Unit V: Differential equations : Exercise 5.2
Solved Example Problems | Ordinary Differential Equations
Subject and UNIT: Probability and complex function: Unit V: Ordinary Differential Equations
Probability and complex function: Unit V: Differential equations : Problems based on method of variation of parameters