Laplace Transforms and Exponential Functions

The function must be differentiable.

The function must be periodic.

The function's absolute value must be less than or equal to a constant times an exponential function.

The function must be continuous.

By checking if the limit of the function divided by an exponential function is finite.

By checking if the limit of the function as T approaches zero is zero.

By checking if the limit of the function is a constant.

By checking if the limit of the function as T approaches infinity is infinite.

The limit does not exist.

The limit becomes a constant.

The limit becomes zero.

The limit becomes infinite.

It exists for functions of exponential order for a certain constant C.

It exists for all functions.

It exists only for continuous functions.

It exists only for differentiable functions.

C is the upper limit of integration.

C is the lower limit of integration.

C is a constant that the Laplace transform must be greater than.

C is a constant that the Laplace transform must be less than.

To simplify the function.

To change the limits of integration.

To find the antiderivative.

To eliminate the exponential term.

It does not exist.

It becomes a constant.

It approaches infinity.

It approaches zero.

They are equal for all T.

They are not necessarily equal.

They are equal for all T less than zero.

They are equal for all T greater than zero.

Only periodic functions.

Piecewise continuous functions.

Only differentiable functions.

Only continuous functions.

Cosine function

Exponential function

Sine function

Unit step function