Key Equations

• Linear second-order differential equation
  $a_{2}(x)y^{\prime\prime}+a_{1}(x)y^{\prime}+a_{0}(x)y=r(x)$
• Second-order equation with constant coefficients
  $ay^{\prime\prime}+by^{\prime}+cy=0$

Glossary

boundary conditions

the conditions that give the state of a system at different times, such as the position of a spring-mass system at two different times

boundary-value problem

a differential equation with associated boundary conditions

characteristic equation

the equation $a\lambda^{2}+b\lambda+c=0$ for the differential equation $ay^{\prime\prime}+by^{\prime}+cy=0$

homogeneous linear equation

a second-order differential equation that can be written in the form $a_{2}(x)y^{\prime\prime}+a_{1}(x)y^{\prime}+a_{0}(x)y=r(x)$ but $r(x)=0$ for every value of $x$

linearly dependent

a set of function $f_{1}(x),f_{2}(x),\ldots f_{n}(x)$ for which there are constants $c_{1},c_{2},\ldots c_{n}$, not all zero, such that $c_{1}f_{1}(x) + c_{2}f_{2}(x) + {\cdots}+c_{n}f_{n}(x) = 0$ for all $x$ in the interval of interest

linearly independent

a set of function $f_{1}(x),f_{2}(x),\ldots f_{n}(x)$ for which there are no constants, such that $c_{1},c_{2},\ldots c_{n}$, such that $c_{1}f_{1}(x) + c_{2}f_{2}(x) + {\cdots}+c_{n}f_{n}(x) = 0$ for all $x$ in the interval of interest

nonhomogeneous linear equation

a second-order differential equation that can be written in the form $a_{2}(x)y^{\prime\prime}+a_{1}(x)y^{\prime}+a_{0}(x)y=r(x)$ but $r(x)\ne 0$ for some value of $x$