Integral Calculus Techniques and Concepts

Matching it with a known integration formula

Simplifying the entire expression

Identifying the numerator

Finding the derivative

As the square of x^2 plus 4

As the square of 16 plus x

As the square of 4 plus the square of x^2

As the square of x plus 16

16

4

2

8

xdx = 4du

xdx = 1/2 du

xdx = 2du

xdx = du

Square root of u squared minus a squared

Square root of u squared plus a squared

Square root of a squared minus u squared

Square root of a squared plus u squared

To simplify the integration process

To eliminate the variable u

To make the integral more complex

To change the integration formula

3/2 times u plus the square root of a squared plus u squared plus C

3/2 times natural log of u plus the square root of a squared plus u squared plus C

3/2 times natural log of u plus C

3/2 times natural log of a squared plus u squared plus C

x squared plus the square root of 4 plus x squared and then plus C

x squared plus the square root of 16 plus x to the fourth and then plus C

x squared plus the square root of 4 plus x to the fourth and then plus C

x squared plus the square root of 16 plus x squared and then plus C