Eigenvalues and Boundary Value Problems

A problem with infinite solutions.

A problem with no specified solution points.

A problem where the solution is specified at two different points.

A problem where the solution is specified at a single point.

Logarithmic functions

Polynomial functions

Trigonometric functions

Exponential functions

x = a ln(t) + b

x = a e^t + b e^-t

x = a cos(t) + b sin(t)

x = a t^2 + b t

Because the differential equation is not homogeneous.

Because the boundary conditions are not satisfied.

Because the boundary conditions do not provide additional information.

Because the general solution has no arbitrary constants.

The differential equation is non-homogeneous.

The boundary conditions provide additional information.

The characteristic equation has real roots.

The general solution has no arbitrary constants.

r^2 - 2 = 0

r^2 + 2 = 0

r^2 + 1 = 0

r^2 - 1 = 0

It indicates the problem is unsolvable.

It helps in determining the uniqueness of solutions.

It is analogous to finding eigenvalues and eigenvectors.

It shows the problem has no boundary conditions.

They are similar to solving quadratic equations.

They are analogous to finding eigenvalues and eigenvectors.

They are equivalent to finding roots of polynomials.

They are like solving linear equations.

Values that make the differential equation homogeneous.

Values that allow non-zero solutions.

Values that make the solution unique.

Values that eliminate arbitrary constants.

Understanding linear equations.

Exploring eigenvalues and eigenvectors.

Finding roots of polynomials.

Solving quadratic equations.