212,552 views
38 votes
38 votes
Analytically determine what type(s) of symmetry, if any, the graph of the equation would possess. Show your work.

Analytically determine what type(s) of symmetry, if any, the graph of the equation-example-1
User Athan Clark
by
2.7k points

1 Answer

8 votes
8 votes

We heva the following:

Two figures can be symmetric with respect to a point (central symmetry) or with respect to a line (axial symmetry).

In central symmetry, it is true that the distance of the symmetric points to the center of the symmetry is the same, and both are aligned with this center.

In axial symmetry, the distances of the symmetric points to the axis of symmetry is the same, and both are in the same perpendicular to said axis.


x^2+y^2=3|x|

grahp

Therefore, it has both symmetries.

Analytically determine what type(s) of symmetry, if any, the graph of the equation-example-1
User LemonMan
by
2.8k points