To find:The graph of the equation
The graph of the given equation is drawn.
The conic section is an ellipse. The ellipse is a horizontal ellipse and it is centered at origin. It has two lines of symmetries which are
Given information:The equation
Explanation:
Find the value of
Since square of any real number cannot be negative, the above equation has no solution.
In the same manner, find the value of
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Plot the points:
Draw the graph by connecting the points.
The conic section is an ellipse.
The ellipse is a horizontal ellipse, it is centered at origin. It has two lines of symmetries which are
Domain is the set of all
From the graph it is clear that the domain is the set of all
Conclusion: The graph of the given equation is drawn.
The conic section is an ellipse. The ellipse is a horizontal ellipse and it is centered at origin. It has two lines of symmetries which are
Chapter 10 Solutions
High School Math 2015 Common Core Algebra 2 Student Edition Grades 10/11
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