Evaluating Improper Integrals Concepts

To solve for x

To calculate the area under the curve

To determine convergence or divergence

To find the derivative

They have no real solutions

They have complex numbers

They cannot be solved analytically

They involve limits of integration that are infinite

Use partial fractions

Differentiate the function

Replace infinity with a variable and take the limit

Integrate directly

The integral is imaginary

The integral is undefined

The integral is convergent

The integral is divergent

U = -3x

U = 3x

U = x

U = x^2

It provides an exact solution

It simplifies the calculation

It eliminates the need for substitution

It makes the limit easier to evaluate

One

Two

Zero

Three

The integral has a finite value

The integral does not have a finite value

The integral is equal to zero

The integral is negative

It decreases to zero

It oscillates

It remains constant

It increases without bound

It suggests an error in calculation

It implies a need for further analysis

It confirms convergence

It indicates divergence