![\"\"](\"/userfiles/image/steps_images/step1.JPG\")
The relation is, ![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=7024f88c3509563847db9f801ebf7cbf.png\")
\
| \
x \ | \
\
y =3 x + 4 \ | \
\
y \ | \
\
(x, y) \ | \
| \
0 \ | \
\
Y = 3(0) + 4 = 4 \ | \
\
4 \ | \
\
(0, 4) \ | \
| \
5 \ | \
\
Y = 3(5) + 4 = 19 \ | \
\
19 \ | \
\
(5, 19) \ | \
| \
7 \ | \
\
Y = 3(7) + 4 = 25 \ | \
\
25 \ | \
\
(7, 25) \ | \
| \
10 \ | \
\
Y = 3(10) + 4 = 34 \ | \
\
34 \ | \
\
(10, 35) \ | \
Express the relation as ordered pairs. ![\"\"](\"/test/fckeditor/editor/plugins/fckeditor_wiris/integration/showimage.php?formula=c5a3a7b94850eb62e2d8cdeeb033da55.png\")
![\"\"](\"/userfiles/image/steps_images/step2.JPG\")
Create a coordinate system and plot the ordered pairs.
\Draw a line through the points.
\Since x can be any real number, there are an infinite number of ordered pairs that
\can be graphed. All of them lie on the line shown![\"\"](\"/userfiles/image/steps_images/step3.JPG\")
Every real number is the x-coordinate of some point on the line.
\So, the domain (x-coordinates on the line) is set of all real numbers.
\Every real number is the y-coordinate of some point on the line.
\So, the range (y-coordinates on the line) is also set of all real numbers.
\The relation is Continuous.
\![\"\"](\"/userfiles/image/steps_images/step4.JPG\")
Draw the vertical lines through the points. Observe that there is no vertical line
\contains more than one of the points.
\This graph passes the vertical line test. For each x-value, there is exactly
\one y-value, so the equation y =3x +4 represents a function
\![\"\"](\"/userfiles/image/Library/Algebra1/the_range_function_y=3x+4.gif\")
![\"\"](\"/userfiles/image/steps_images/solution.JPG\")
The domain (x-coordinates on the line) is set of all real numbers.
\The range (y-coordinates on the line) is also set of all real numbers.
\The relation is Continuous.
\The equation y = 3x + 4 represents a function.