In the previous lesson, you learned about graph of equations which is points on a Cartesian plane. The graph of equation has some other interesting characteristics. You will learn about two such properties in this lesson – Intercepts and Symmetry of Graph.
Intercepts
The intercepts are the points where graph touches the x-axis or y-axis. There are only two types of intercepts in a Cartesian plane.
- x-intercept is given be a point
- y-intercept is given by a point
A graph can have no intercept, one intercept and many intercepts.
Example:
Find the intercepts of equation 
Solution:
Given that
You know that x-intercept the value of 
\begin{aligned}
&0 = x - 1\\ \\
&-x = -1\\ \\
&x = 1
\end{aligned}Therefore,
The x-intercept of graph is point 
Similarly,
For y-intercept the value of 
\begin{aligned}
&y = 0 - 1 \\ \\
&y = -1
\end{aligned}Therefore,
The y-intercept is the point 
Plotting the graph
To plot the graph of equation, you need to find other points on the equation.
 |  |  |
| -1 | -2 | (-1, -2) |
| 0 | -1 | (0, -1) |
| 1 | 0 | (1, 0) |
| 2 | 1 | (2, 1) |
Let’s plot the graph of equation 
Symmetry of Graph
The second property of graph is symmetry. The axis of Cartesian plane divides the graph in perfect halves is what we call as the symmetry of graph.
There are 3 rules regarding the symmetry of graph.
- A graph is symmetric with respect to x-axis, whenever
- A graph is symmetric with respect to y-axis, whenever
- A graph is symmetric with respect to origin, whenever
Example:
Plot graph 
Solution:
Example:
Plot graph of equation 
Solution:
Example:
Plot graph of equation 
Solution:
