Differential Equations and Characteristic Solutions

Linear third-order with constant coefficients

Non-linear second-order with constant coefficients

Linear second-order with constant coefficients

Linear first-order with variable coefficients

To find the roots that help form the general solution

To calculate the initial conditions

To find the particular solution

To determine the type of differential equation

To solve for the initial conditions

Because the characteristic equation is factorable

To find the roots of a non-factorable characteristic equation

To determine the coefficients of the differential equation

1 ± i

2 ± i

2 and 1

2 and -2

A combination of exponential and polynomial functions

A combination of exponential and trigonometric functions

A combination of polynomial and trigonometric functions

A combination of exponential and logarithmic functions

1

i

2

0

i

2

1

0

Cosine and tangent

Sine and cosine

Sine and tangent

Sine and secant

They determine the type of differential equation

They are used to adjust the initial conditions

They are arbitrary constants that adjust the solution

They are coefficients of the characteristic equation

They only affect the initial conditions

They determine the form of the general solution

They are irrelevant to solving the differential equation

They do not affect the form of the general solution