Q. 10
Question
If a graph of a system of linear inequalities cannot be contained in any circle, then it is said to be ___ .
Step-by-Step Solution
Verified Answer
On completing the statement, we get,
"If a graph of a system of linear inequalities cannot be contained in any circle, then it is said to be unbounded."
1Step 1. Given information.
Consider the given statement,
"If a graph of a system of linear inequalities cannot be contained in any circle, then it is said to be ___."
On completing the statement,
"If a graph of a system of linear inequalities cannot be contained in any circle, then it is said to be unbounded."
2Step 2. Explanation for completing the statement.
Consider the given question,
A graph is unbounded if the graph of a system of linear inequalities cannot be contained in any circle.
Other exercises in this chapter
Q. 9
True or False:The graph of a system of inequalities must have an overlapping region.
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In Problems 5–24, graph each equation of the system. Then solve the system to find the points of intersection.x=2y;x=y2-2y
View solution Q. 12
In Problems 5–24, graph each equation of the system. Then solve the system to find the points of intersection.y=x-1;y=x2-6x+9
View solution