$\"\"$

The equation is $\"\"$ .

Make a table form:

\ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \ \

The ordered pairs are $\"\"$ .

$\"\"$

Graph:

Graph of the equation is $\"\"$ .

Plot the points are $\"\"$ .

$\"graph$

Observe the graph:

Every real number is the $\"\"$ -coordinate of some point on the line.

So, the domain ( $\"\"$ -coordinates on the line) is set of all real numbers.

Every positive real number is the $\"\"$ -coordinate of some point on the line.

So, the range ( $\"\"$ -coordinates on the line) is also set of all real numbers.

$\"\"$ \ \

Vertical line test:

Draw the vertical lines through the points. \ \

$\"graph$

Observe the graph:

There is no vertical line that contains more than one point.

The equation passes the vertical line test.

The equation represents a function.

$\"\"$ \ \

Find the function is one-to-one, onto and continuous or discrete.

Each $\"\"$ -value is paired by exactly one $\"\"$ -value and each $\"\"$ -value is paired by exactly one $\"\"$ -value.

Hence the equation is one-to-one and onto function. \ \

As the graph is a solid line without breaks, the function is Continuous. \ \

$\"\"$

The domain ( $\"\"$ -coordinates on the line) is set of all real numbers.

The range ( $\"\"$ -coordinates on the line) is also set of all real numbers.

The equation $\"\"$ represents a function.

The equation is one-to-one and onto function.

The function is Continuous.