To find the intersection points of two functions

To determine the area bounded by two functions over a specific interval

To graph the functions on a coordinate plane

To solve for x in a trigonometric equation

To avoid infinite intersection points

To make the calculations easier

To ensure the functions are continuous

To simplify the graphing process

Finding the x-coordinates of intersection points

Calculating the derivative of the functions

Graphing the functions

Determining the y-intercepts

By dividing the top function by the bottom function

By multiplying the two functions

By adding the two functions

By subtracting the bottom function from the top function

cos(x)

-cos(x)

sin(x)

-sin(x)

30°

45°

60°

90°

Third quadrant

First quadrant

Second quadrant

Fourth quadrant

√2/2

1/√2

-1/√2

-√2/2

√2 square units

2√2 square units

3√2 square units

4√2 square units

It shows the functions are equal

It confirms the functions are continuous

It represents the total bounded area

It indicates the functions do not intersect