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3: Second Order Linear Differential Equations

  • Page ID
    398
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    • 3.1: Homogeneous Equations with Constant Coefficients
      In this section we will be investigating homogeneous second order linear differential equations with constant coefficients, which can be written in the form: \[  ay'' + by' + cy  =  0 \]
    • 3.2: Complex Roots of the Characteristic Equation
      We have already addressed how to solve a second order linear homogeneous differential equation with constant coefficients where the roots of the characteristic equation are real and distinct. We will now explain how to handle these differential equations when the roots are complex.
    • 3.4: Method of Undetermined Coefficients
      Up to now, we have considered homogeneous second order differential equations. In this discussion, we will investigate second order linear differential equations.
    • 3.3: Repeated Roots and Reduction of Order
      Now that we know how to solve second order linear homogeneous differential equations with constant coefficients such that the characteristic equation has distinct roots (either real or complex), the next task will be to deal with those which have repeated roots.
    • 3.5: Variation of Parameters
      In the last section we solved nonhomogeneous differential equations using the method of undetermined coefficients. This method fails to find a solution when the functions g(t) does not generate a UC-Set and we must use another approach. The approach that we will use is similar to reduction of order. Our method will be called variation of parameters.
    • 3.6: Linear Independence and the Wronskian
      This is a system of two equations with two unknowns. The determinant of the corresponding matrix is the Wronskian. Hence, if the Wronskian is nonzero at some t0 , only the trivial solution exists. Hence they are linearly independent.
    • 3.7: Uniqueness and Existence for Second Order Differential Equations
      To solve a second order differential equation, it is not enough to state the initial position. We must also have the initial velocity. One way of convincing yourself, is that since we need to reverse two derivatives, two constants of integration will be introduced, hence two pieces of information must be found to determine the constants.

    Contributors and Attributions


    This page titled 3: Second Order Linear Differential Equations is shared under a not declared license and was authored, remixed, and/or curated by Larry Green.

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