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B09 Example problem with a linear equation
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Differential Equations
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- 1 A1 Introduction
- 2 B01 An introduction to separable variables
- 3 B02 Example problem with separable variables
- 4 B03 Example problem with separable variables
- 5 B04 Example problem with separable variables
- 6 B05 Example problem with separable variables
- 7 B06 Example problem with separable variables
- 8 B07 Example problem with separable variables
- 9 B08 Introduction to linear equations
- 10 B09 Example problem with a linear equation
- 11 B10 Example problem with a linear equation
- 12 B11 Example problem with a linear equation
- 13 B12 Example problem with a linear equation
- 14 B13 Example problem with a linear equation
- 15 B15 Example problem with a linear equation using the error function
- 16 2_2_8 Example problem with a linear equation modeling a real world situation
- 17 B16 Introduction to exact equations
- 18 B17 Example problem solving an exact DE
- 19 B18 Example problem solving an exact equation
- 20 B19 Example problem solving for an exact equation
- 21 B20 Creating an exact equation by using an integrating factor
- 22 B21 Example problem where an exact DE has to be created
- 23 B22 Introduction to Substitutions
- 24 B23 Example problem solving for a homogeneous DE
- 25 B24 Introduction to the Bernoulli Equation
- 26 B25 Example problem solving for a Bernoulli equation
- 27 B26 U substitution
- 28 B27 Introduction to linear models
- 29 B28 An example problem of a linear model
- 30 C01 Preliminaries
- 31 C02 Reduction of order
- 32 C03 Example problem using reduction of order
- 33 C04 Example problem using reduction of order
- 34 C05 Example problem using reduction of order
- 35 C06 Example problem using reduction of order
- 36 C07 Homogeneous linear differential equations with constant coefficients
- 37 C08 Homogeneous linear differential equations with constant coefficients
- 38 C09 Example problem solving a second order LDE with constant coefficients
- 39 C10 Example problem solving a second order LDE with constant coefficients
- 40 C11 Example problem solving a second order LDE with constant coefficients
- 41 C12 Example problem solving a second order LDE with constant coefficients
- 42 C13 Third and higher order linear DE with constant coefficients
- 43 C14 Example problem with a third order linear DE with constant coefficients
- 44 C15 Initial value problem solving a homogeneous linear SOODE with constant coefficients
- 45 C16 Example of solving a homogeneous higher order linear ODE with constant coefficients
- 46 C17 Non homogeneous higher order linear ODEs with constant coefficients
- 47 C18 Example problem using the superposition approach
- 48 C19 Example problem using the superposition principle
- 49 C20 Example problem using the superposition principle
- 50 C21 The annihilator approach
- 51 C22 Simple examples finding the annihilator
- 52 C23 More about the annihilator approach
- 53 C24 Finding the differential annihilator
- 54 C25 Solving a DE with the annihilator approach
- 55 C26 Example problem finding the form of the particular solution
- 56 C27 Example problem finding the form of the particular solution
- 57 C28 Variation of parameters Part 1
- 58 C29 Variation of parameters Part 2
- 59 C30 Solving a linear DE by the annihilator approach
- 60 C31 The same problem but using variation of parameters
- 61 C32 Example problem using variation of parameters
- 62 C33 Example problem using variation of parameters
- 63 C34 Expanding this method to higher order linear differential equations
- 64 C35 The Cauchy Euler Equation
- 65 C36 Example problem solving a Cauchy Euler equation
- 66 C37 Example problem solving a Cauchy Euler equation
- 67 C38 Example problem solving a Cauchy Euler equation with initial values
- 68 C39 A Cauchy Euler equation that is nonhomogeneous
- 69 C40 Example problem solving a nonhomogeneous Cauchy Euler equation
- 70 C41 Using substitution to solve a Cauchy Euler equation
- 71 C42 Example problem solving a Cauchy Euler equation with substitution
- 72 C43 Example problem solving a Cauchy Euler equation
- 73 C44 Example problem solving a Cauchy Euler equation
- 74 C45 Example problem solving a Cauchy Euler equation
- 75 C46 Solving the previous problem by another method
- 76 C47 Example problem solving a Cauchy Euler equation
- 77 C48 Systems of linear differential equations
- 78 C49 Example problem solving a system of linear DEs Part 1
- 79 C50 Example problem solving a system of linear DEs Part 2
- 80 C51 Example problem of a system of linear DEs
- 81 C52 Introduction to nonlinear DEs
- 82 C53 Introduction to modelling
- 83 C54 Free undamped motion
- 84 C55 Example problem of free undamped motion
- 85 C56 Continuation of previous problem
- 86 C57 Alternate form of the solution
- 87 C58 Example problem using the alternate form
- 88 C59 Free damped motion
- 89 C60 Example problem involving free damped motion
- 90 C61 Another problem involving free undamped motion
- 91 C62 Driven motion with damping
- 92 C63 Example problem involving driven motion with damping
- 93 C64 Transient and steady state terms
- 94 C65 Exampe problem illustrating transient and steady state terms
- 95 C66 Resonance
- 96 C67 The physics of simple harmonic motion
- 97 C68 The physics of damped motion
- 98 C69 Introduction to power series
- 99 C70 The ratio test for power series
- 100 C71 Adding to power series in sigma notation
- 101 C72 What to do about the singular point
- 102 C73 Introducing the theorem of Frobenius
- 103 C74 Example problem
- 104 C75 Introduction to the Laplace Transform
- 105 C76 A first example problem calculating the Laplace transform
- 106 C77 Another example problem calculating the Laplace transform
- 107 C78 Another example problem calculating the Laplace transform
- 108 C79 Linear properties of the Laplace transform
- 109 C80 Solving a linear DE with Laplace transformations
- 110 C81 More complex Laplace tranformations
- 111 C82 Example problem using inverse Laplace transforms Part 1
- 112 C83 Example problem using inverse Laplace transforms Part 2
- 113 C84 Example problem using inverse Laplace transforms Part 3
