Integration Techniques and Concepts

Some integrals cannot be solved by standard techniques.

It is the only method taught in calculus.

It always results in fewer lines of work.

It simplifies all types of integrals.

It remains the same.

It becomes easier to solve.

It becomes more complex.

It becomes unsolvable.

Using only x and y coordinates.

Using parametric equations.

Using polar coordinates only.

Using Cartesian coordinates only.

Let x = Theta

Let x = 3 tan Theta

Let x = 3 sin Theta

Let x = 3 cos Theta

It is a standard practice in all integrals.

It simplifies the integral directly.

X is always the independent variable.

Theta is the independent variable after substitution.

sin^2 Theta + cos^2 Theta = 1

sin 2Theta = 2 sin Theta cos Theta

tan^2 Theta + 1 = sec^2 Theta

1 - sin^2 Theta = cos^2 Theta

It has no significance.

It ensures the result is always negative.

It ensures the result is always positive.

It complicates the integral unnecessarily.

The integral becomes unsolvable.

The integral remains unchanged.

The integral becomes easier.

The integral may yield incorrect negative values.

Because negative values are not allowed in calculus.

Because it is a requirement of all integrals.

Because it is a rule of thumb.

Because it is defined over a positive range.

Ensuring all parts of the integral are positive.

Using a calculator to verify.

Ignoring the absolute value.

Rewriting the integral in terms of x.