# The x- and y- intercepts for the equation y = 3 x + 3 and test the symmetry of the equation. Also construct the table to sketch the graph of the equation.

### Precalculus: Mathematics for Calcu...

6th Edition
Stewart + 5 others
Publisher: Cengage Learning
ISBN: 9780840068071

### Precalculus: Mathematics for Calcu...

6th Edition
Stewart + 5 others
Publisher: Cengage Learning
ISBN: 9780840068071

#### Solutions

Chapter 1.8, Problem 58E
To determine

## To calculate: The x- and y- intercepts for the equation y=3x+3 and test the symmetry of the equation. Also construct the table to sketch the graph of the equation.

Expert Solution

The x-intercept is 1 and y-intercept is 3. The equation is neither symmetric about x-axis, nor y-axis nor origin. Graph of the equation is provided below,

### Explanation of Solution

Given information:

The equation y=3x+3 .

Formula used:

The function is symmetric about the x-axis, when y is replaced by y , the equation remains unchanged.

The function is symmetric about the y-axis, when x is replaced by x , the equation remains unchanged.

The function is symmetric with respect to origin, when y is replaced by y and x is replaced by x , the equation remains unchanged.

The x-intercepts are the points on x-axis where the graph of the equation intersects the x-axis.

The y-intercepts are the points on y-axis where the graph of the equation intersects the y-axis.

Calculation:

It is provided that the equation is y=3x+3 . Construct a table to evaluate the value of y for different values of x.

Substitute the point x=0 in the equation y=3x+3 ,

y=3(0)+3=3

Substitute the point x=1 in the equation y=3x+3 ,

y=3(1)+3=6

Substitute the point x=2 in the equation y=3x+3 ,

y=3(2)+3=9

Substitute the point x=3 in the equation y=3x+3 ,

y=3(3)+3=12

Construct a table with the values obtained above,

xy(x,y)03(0,3)16(1,6)29(2,9)312(3,12)

In the coordinate plane plot the points obtained above and connect them through a line.

The graph of the equation is provided below y=3x+3 .

Recall that the x-intercepts are the points on x-axis where the graph of the equation intersects the x-axis.

Substitute y=0 in the equation y=3x+3 ,

0=3x+33x=3x=1

Therefore, x-intercept is 1 .

Recall that the y-intercepts are the points on x-axis where the graph of the equation intersects the y-axis.

Substitute x=0 in the equation y=3x+3 ,

y=3(0)+3=3

Therefore, y-intercept is 3.

Recall that the function is symmetric about the x-axis, when y is replaced by y , the equation remains unchanged.

Replace y by y in the equation y=3x+3 ,

y=3x+3

The equation is changed. Therefore, the equation y=3x+3 is not symmetricabout the x-axis.

Recall that the function is symmetric about the y-axis, when x is replaced by x , the equation remains unchanged.

Replace x by x in the equation y=3x+3 ,

y=3(x)+3y=3x+3

The equation is changed. Therefore, the equation y=3x+3 is not symmetricabout the y-axis.

Recall that the function is symmetric with respect to origin, when y is replaced by y and x is replaced by x , the equation remains unchanged.

Replace x by x and y by y in the equation y=3x+3 ,

y=3(x)+3y=3x+3

The equation is changed. Therefore, the equation y=3x+3 is not symmetricabout the origin.

Thus, the x-intercept is 1 and y-intercept is 3. The equation is neither symmetric about x-axis, nor y-axis nor origin. Graph of the equation y=3x+3 is provided below,

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